| 00:00 | this conference will now be recorded. have a habit of sometimes forgetting. |
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| 00:08 | if you guys use the recordings do help me remember. All right. |
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| 00:13 | were looking at this log and we showing how, when I had a |
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| 00:17 | wide washout and probably this is a log here. And probably the washout |
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| 00:25 | even bigger than that. The caliper measured with an arm that sticks out |
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| 00:30 | measures a distance. Well, if bore hole is bigger than the than |
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| 00:35 | length of the arm, uh then uh it flat lines like that. |
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| 00:42 | here, you know, the scale the caliper is 6-16". This was |
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| 00:47 | bit size. So if it was perfectly competent rock and perfect drilling, |
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| 00:53 | would be at the bit size. in fact it's washed out from the |
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| 00:58 | size and in this case it's washed so far that the caliper log has |
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| 01:06 | clipped. As a matter of let me turn on the pointer |
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| 01:11 | Okay, the caliper log has So actually the whole is much |
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| 01:16 | And you see the density law goes in there And in fact it goes |
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| 01:21 | abnormally low density. Now it goes a scale of 2-3, it goes |
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| 01:29 | And then it wraps around. So has another scale 1-2. So, |
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| 01:34 | is reading about 1.6 or so, suggests that the logging tool was seen |
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| 01:41 | drilling fluid at that point. So density here is not indicative of the |
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| 01:47 | mation density. And here you can it's very low again. And we |
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| 01:52 | talking about the delta rho, this the degree to which the density log |
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| 01:58 | compensated for the borehole. Now, delta role is can be an accurate |
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| 02:05 | if the errors are very small. when the errors get large, delta |
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| 02:11 | is not accurate at all. And the units of density of grams per |
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| 02:18 | . Uh delta rho is in units grams per CC also. So this |
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| 02:25 | a swing of 0.5 g per CC minus 0.25 plus 0.25. So that |
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| 02:32 | be an enormous porosity change. And you're seeing here where the hole is |
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| 02:39 | and washed out like this. The Rho correction is large on the order |
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| 02:45 | .15. In my experience, any rho bigger than 0.5 is usually an |
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| 02:54 | that the density law reading is I wouldn't, you know, the |
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| 02:59 | route correction is ineffectual when it has be that large. A small death |
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| 03:05 | less than .05. And uh there's good chance, it's good, especially |
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| 03:10 | you have a smooth bore hole. that's what's happening here. Even though |
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| 03:14 | borehole is washed out, it's smooth enough of an interval that the density |
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| 03:20 | could be pressed against the borehole wall make a good density reading. So |
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| 03:27 | see that density laws are problematical. You know, they're designed to give |
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| 03:32 | porosity in the formation. They're not to give you an accurate density up |
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| 03:37 | down the bore hole every place. but geophysicists often mistakenly just take the |
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| 03:44 | log and use that to compute impudence use that to create this synthetic seismic |
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| 03:50 | . And that's a big mistake. density log has to be corrected. |
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| 03:56 | you know, we'll talk about how might correct the density log, but |
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| 04:00 | first order of business is to recognize the density log is bad. So |
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| 04:05 | look for rough boreholes, wide bore and you look for large density log |
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| 04:11 | . All of these are indications of bad density log. Okay, so |
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| 04:19 | does the correction work with the density as we were showing, there are |
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| 04:25 | detectors. So you have a source emits gamma rays into the formation and |
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| 04:31 | you have counts at each detector like Geiger counter. And the further away |
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| 04:38 | get, the more absorption you the more material the gamma rays pass |
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| 04:45 | , the more of them are And as we mentioned, they are |
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| 04:50 | by electrons when the gamma ray hits electron that tends to absorb the |
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| 04:56 | So the long space detective would have accounts than the short space detector. |
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| 05:04 | if you make a plot of the of counts on the short space detector |
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| 05:11 | on the long space detector, um should follow a linear relationship between the |
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| 05:21 | and where you are on that linear and exactly the slope of that line |
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| 05:28 | depend on the logging tool. And a lot of calibration which is done |
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| 05:34 | decide what that line should be. you fall on the line, you |
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| 05:40 | a small delta rho. That's probably good reading. So measurement A. |
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| 05:45 | on the line. So that was acceptable reading measurement B however was well |
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| 05:53 | the line. And if I just straight back to the line, drop |
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| 05:59 | perpendicular to the line, it would reading too low density here. We |
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| 06:04 | high densities here. We have low , right? So it would be |
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| 06:08 | too low. And chances are that's of some kind of washout effect. |
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| 06:15 | so what is done. And this is another logging tool dependent |
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| 06:21 | It also depends on the formation and fluids in the formation. But what |
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| 06:28 | done is there's some black magic that the orientation of what is called a |
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| 06:35 | correction. So that point B is along that slope to intersect the |
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| 06:46 | So point B. Has been moved point C. And that is the |
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| 06:53 | density. And like I said, B is not far off the |
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| 06:59 | that point C could be pretty And and how the further you are |
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| 07:07 | the line, the larger this Dia's So if I go horizontally back |
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| 07:12 | the line and I compare the distance that point to the corrected density |
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| 07:19 | that's distance, the the large India the more likely the correction is to |
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| 07:26 | inadequate. So everybody, everybody with here. Right, okay, So |
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| 07:37 | look at another density log. So we have a gamma ray log, |
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| 07:44 | is the it's the it's the curve a lot of variation in it. |
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| 07:52 | we have clean rocks. Gamma ray naturally natural radio activity. So here |
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| 07:57 | have high accounts suggesting more potassium uranium thorium some radioactive minerals. So that |
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| 08:06 | is indicative of play. Sometimes it be indicative of uranium, for |
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| 08:13 | sometimes in heavy oils and in black . You can increase uranium. So |
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| 08:21 | you go. So we have clean , maybe sand stones and we have |
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| 08:26 | intervals. Maybe shells You can see caliber is not varying very much. |
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| 08:32 | , a scale of 6-16". It's very in, very much oddly enough |
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| 08:39 | the sand stones, the caliber reads less than in the shells. If |
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| 08:46 | look at delta rho in this case rho is usually small. It's usually |
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| 08:51 | than 0.5. So the for the part, it's a good density law |
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| 08:58 | . And here are the density Reading itself. The dash line is |
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| 09:04 | computation which is made from the So don't worry about that off |
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| 09:09 | But the black line is the bulk and that's indicative of the ferocity. |
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| 09:14 | the dash line I believe is a ferocity if you had if you were |
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| 09:20 | limestone. So there's the scale for And really it's a 1-1 relationship, |
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| 09:27 | ? It's a single grain density, is probably not right. The grain |
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| 09:32 | is probably varying, but this is they would plot on the log. |
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| 09:37 | if you are in a sandstone, ferocity would be wrong because it's a |
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| 09:41 | ferocity. Does anybody want to guess the caliber is slightly small in the |
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| 09:49 | zones here here, here, here see the well bores is bulging in |
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| 09:58 | the clean zones that don't have much . Why might that be government having |
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| 10:06 | your older um No, I think could uh, we could uh not |
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| 10:12 | about heavy minerals at this point in example. Why would the clean |
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| 10:22 | Why would the caliber be reading a diameter then? Uh and the shells |
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| 10:33 | doesn't have to be right. I going to say just just because in |
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| 10:41 | , dry sand is maybe more rigid wet sand um or sorry, or |
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| 10:49 | in this case. So if, . So one hypothesis then is that |
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| 10:57 | wet sand is more plastic and it's deforming, it's less rigid and it |
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| 11:03 | deformed under pressure and moved into the ? Um that's a valid hypothesis. |
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| 11:11 | the other hypothesis, how about the tends to be slightly washed out. |
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| 11:17 | , the delta rho seems to be that's maybe not what's happening. Um |
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| 11:27 | , I think what's happening here is the clean zones are permissible and they |
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| 11:33 | developing a mud cake, drilling fluid entering the formation and the drilling mud |
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| 11:39 | being filtered by the poorest formation and building up on the borehole wall. |
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| 11:46 | I'm going to suggest that that's maybe mud cake that's occurring there. |
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| 11:57 | now, here we have a case where uh we have a caliber that |
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| 12:02 | perfectly engaged in the cleanest zone but in the zones that are a |
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| 12:08 | bit dirty or a lot dirty, caliber becomes very rough. And I |
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| 12:16 | what you can see here is that delta rho is zero. Where the |
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| 12:23 | is very flat, we have neutron and density plotted here at the same |
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| 12:31 | . So they should overlay if you the right density in it. And |
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| 12:35 | see the neutron porosity and what you infer the density porosity to be are |
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| 12:43 | similar in the zone with a good . But where you have a bad |
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| 12:49 | , the density log is reading much , indicating much lower porosity, then |
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| 12:55 | new tribal art is suggesting. uh that is another type of quality |
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| 13:03 | that you can apply by comparing the porosity to the density porosity. If |
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| 13:10 | density porosity is much larger than the porosity, you should be worried on |
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| 13:17 | other hand, neutrons ferocity tends to abnormally high when you have place. |
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| 13:24 | the neutron porosity itself is not a indicator of ferocity. Okay, so |
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| 13:36 | is a simple algebra equation exercise from mass balanced equation expressed the prosperity in |
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| 13:44 | of bulk density, grain density, fluid density and there's the answer right |
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| 13:50 | . So all you have to do work out the intermediate steps to get |
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| 13:56 | . But now here's a tough question you're going to have to deal |
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| 14:03 | Suppose the ferocity log is calculated to correct ferocity in a limestone. How |
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| 14:11 | this equation be corrected if you're logging a sandstone and in fact, there |
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| 14:17 | two corrections that need to be First of all, you have to |
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| 14:21 | the correct grain density. So you to correct the ferocity for the fact |
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| 14:27 | the wrong brain density was used, also you have to correct the bulk |
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| 14:33 | here because of the difference in electron between limestone and sandstone. If you |
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| 14:40 | back here, you remember that uh huh has a small bulk density |
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| 14:52 | that's needed, whereas limestone is calibrated to need the electron density correction. |
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| 15:00 | the first thing you have to do you have a log in limestone |
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| 15:05 | The first thing you have to do correct, correct the bulk density to |
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| 15:09 | correct in SAm's town and then to the ferocity, you need to use |
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| 15:17 | correct rain debt city here. So going to ask you to come up |
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| 15:24 | a correction equation. So I give limestone ferocity, you give me an |
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| 15:30 | which will convert that to sandstone Okay, again, it's an algebra |
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| 15:37 | , but it's a little bit tougher . Okay, disadvantages of the density |
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| 15:49 | . Well, we've seen is very . If you have a small mud |
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| 15:55 | , it's usually within plus or minus g per CC, But .5 g |
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| 16:02 | cc is not a negligible amount or is often not a negligible |
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| 16:10 | Uh, it's particularly susceptible to Do watch the surface tension on the |
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| 16:16 | , not the surface tension, the tension. Um and that will tell |
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| 16:21 | if the tool has been hanging If the tool is hanging up, |
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| 16:26 | can be pulled away from the Warhol , The detectors can be pulled away |
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| 16:31 | won't be in contact and so often get errors associated with that. |
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| 16:38 | we've assumed that the borehole is perfectly because if we come back to this |
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| 16:49 | , okay, this is a cylindrical in a cylindrical bore hole and it's |
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| 16:56 | , therefore the radius of the tool different from the radius of the |
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| 17:01 | So that means uh, that there um, the borehole, the detector |
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| 17:08 | be perfectly flat against the borehole there's, there's an austerity there because |
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| 17:15 | radius of curvature is tighter than the wall. Now, if you |
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| 17:20 | uh, the borehole diameter, you correct for that. Uh But at |
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| 17:27 | borehole in cross section is not perfectly . That could be a pretty tough |
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| 17:33 | and you may not know the exact of the borehole. So again when |
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| 17:39 | have a rough irregular borehole that could all kinds of problems. Sorry? |
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| 17:48 | Another major issue. The penetration of logging tool is only a couple of |
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| 17:57 | . It doesn't penetrate very far into borehole itself. I mean into the |
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| 18:04 | itself, that means if you're in permeable formation is probably seeing the invaded |
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| 18:12 | . So it's you actually have to a correction for invasion on the density |
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| 18:20 | . Um Otherwise chances are, you for example in the gas reservoir you'll |
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| 18:25 | measuring too high in density. All now, what happens uh when we |
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| 18:36 | a bad density log, what do do? Well, you could use |
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| 18:41 | relations between velocity and density and you get a ballpark correction. So here |
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| 18:46 | just an equate an example of one relation between velocity and density. There |
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| 18:53 | a wide variety of these. Here some other relations between velocity and |
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| 18:59 | Um So these were geographically restricted Each given you their own specific trend |
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| 19:08 | V. P. Or V. against density. Here's a here's a |
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| 19:13 | array of measurements uh from the literature a rough relationship there and most importantly |
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| 19:25 | these are gardeners relationships for common sedimentary and again I want to and these |
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| 19:33 | just very average values and I do to emphasize that. Uh these tend |
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| 19:38 | be for uh not entirely liquefied Samson . Uh so uh if you compare |
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| 19:48 | these fall on the Royce and boy , they're not at the higher end |
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| 19:54 | , towards the lower end for the and shales. But the nice thing |
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| 19:59 | these relationships is you have a separate for each mythology, then there is |
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| 20:05 | average of all of them, which the dash line here. And this |
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| 20:09 | the famous gardener relationship Which you would read about if you had started reading |
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| 20:16 | gardener and Gregory in 1974, that's this figure is from most geophysical software |
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| 20:25 | the understanding that density laws are often available or against the logs are unreliable |
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| 20:31 | the synthetic seismic grand package. They give you the ability to substitute density |
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| 20:38 | the garden of density. But keep mind that this can produce large |
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| 20:44 | Uh if you're not taking into account variations, I mean with ology |
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| 20:52 | So, for example, when I similar velocities here, I have a |
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| 20:58 | difference in density between sand stones and for the same velocity. Shells tend |
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| 21:07 | be higher density than sandstone and shells to be on the high side of |
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| 21:13 | relation and sand stones tend to be the low side of gardens relations. |
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| 21:18 | if the velocities happened to be the Gardner equation would predict the same |
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| 21:24 | So you would see no discrimination, impudence contrast between the sand and shell |
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| 21:30 | in those cases the density difference, would give you a very significant reflection |
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| 21:36 | . So using the gardener equation or a constant density where the shells and |
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| 21:42 | have similar velocities will lead to very miss ties. It'll lead to poor |
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| 21:49 | ties. A few general rules of , you know, carbonates tend to |
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| 21:57 | higher velocity, higher density than Uh Rock salt for the velocity has |
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| 22:05 | abnormally low density. So saul towns even though they're low density and our |
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| 22:14 | become die appears as a result may relatively high velocities and hide right. |
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| 22:23 | evaporate happens to have abnormally high So in a carbonate environment, the |
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| 22:31 | of an of evaporates could be very . Mhm. Okay, so here |
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| 22:40 | have gardeners relation and this is a challenging algebraic exercise. Usually, uh |
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| 22:48 | students get this one wrong, so see if you can get this |
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| 22:53 | But uh here we have density and per cc and velocity in feet per |
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| 23:02 | . However, if you happen to working in europe or parts of the |
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| 23:07 | that are using metric units, you have velocities in meters per second or |
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| 23:13 | per second. The scientific papers, want you to use velocities and kilometers |
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| 23:20 | second. So in that case re gardeners equation by doing the units conversion |
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| 23:29 | p wave velocity from feet per second kilometers per second and come up with |
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| 23:35 | new gardener equation there. It's surprising often students get this one wrong, |
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| 23:42 | that would be a good exercise for . In fact, why don't |
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| 23:54 | why don't I make you do that now? So go ahead and uh |
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| 24:00 | the algebra here? Uh and you use uh well you can just google |
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| 24:05 | relationship between feet per second and meters second. Right? Yeah. Mm |
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| 24:15 | I'm going to stop recording at this and give you a chance to work |
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| 24:19 | this. This conference will now be . Who mentioned in the chat. |
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| 24:25 | got it from him. Thank Okay, so um yeah, so |
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| 24:34 | we have gardeners equation and kilometers per now and all the velocity porosity transforms |
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| 24:42 | will talk about are also velocity density because for a given mythology, if |
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| 24:48 | know porosity, you know the So here's the widely equation, which |
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| 24:55 | talked about this is the time average is the heavy solid line and you |
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| 25:00 | gardens equation is lower velocity at a density or you could say at the |
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| 25:06 | velocity is a higher density. And because the gardener equation is an average |
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| 25:11 | all rock types, which includes a of shell. Um there is also |
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| 25:18 | velocity ferocity transform, we'll talk about reindeer Hunt Gardner equation and for moderate |
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| 25:28 | , rocks, it tends to give highest velocity, it's kind of an |
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| 25:33 | limit. I want velocity could you actually can't really extend the roemer |
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| 25:39 | too far down. They actually you to towards the critical ferocity and they |
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| 25:45 | change the equation. So ignore this here, but you could look for |
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| 25:52 | porosity is most of the density rocks that we're dealing with. The Bremer |
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| 25:59 | is an upper limit. And by way, these curves are drawn for |
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| 26:04 | . So they converge at the course here and again, gardeners equation is |
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| 26:12 | all rock types. So it does go through the courts point because it |
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| 26:17 | carbonates and shells etcetera. Uh some curves on here. Uh The red |
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| 26:25 | line is an equation that gardener gave sand stones in general. And in |
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| 26:34 | it veers, it goes wild at velocities, it's actually not well calibrated |
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| 26:42 | high velocity rocks. So in you can empirically just just distort this |
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| 26:49 | equation and force it to go through courts courts point. So that's the |
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| 26:55 | density equation I use for sand sounds what I call the modified Gardner |
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| 27:01 | And it's the long dash line There's one more curve here which looks |
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| 27:07 | of like a Royce bound. This called the would like equation. And |
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| 27:13 | , instead of taking the reciprocal of bulk modules average, it's the reciprocal |
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| 27:18 | the plane wave modules and we've seen , that is not exactly right. |
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| 27:25 | it has the but it has the of adding a little bit of virginity |
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| 27:31 | the rock. So rather than or the sediment. So rather than pure |
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| 27:37 | , uh these rocks have some rigidity with them and we'll see that uh |
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| 27:45 | uh low densities, roemer uses something this. Uh would like equation |
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| 27:54 | all these curves that go through the point are all designed for sandstone and |
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| 28:00 | would be those curves would be different different mythologies. So example, for |
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| 28:07 | , here we have shells and we the rain martin Gardner equation for |
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| 28:13 | we have the would like equation for . And here is the gardener equation |
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| 28:20 | a shell. And you see there's lot of scattered because shells have compositional |
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| 28:28 | and I would argue that some of are more like dirty lime stones than |
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| 28:33 | . But for the most part you see that the points are contained between |
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| 28:39 | roemer line and the wood like So the roemer line is kind of |
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| 28:44 | good trend for the most liquefied rocks have and uh the would like line |
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| 28:52 | be yeah, poorly consolidated. So closer you are to the would like |
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| 28:59 | , the less well lit defied. rock is again showing some data points |
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| 29:11 | sand stones. We see a similar . This was the modified Gardner |
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| 29:18 | So rough average, the the Remeron equation tends to be a line where |
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| 29:25 | most liquefied rocks will fall along. as the rocks get less well lit |
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| 29:31 | , they get closer to the the like equation. So if you are |
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| 29:37 | unlit defied or virtually almost unlit you would be at the would like |
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| 29:44 | it's it's slightly faster than the Royce or the wood equation. And this |
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| 29:54 | just comparing shells and sand stones. a variety of laboratory in log measurements |
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| 30:02 | for the most parts. And this the overall Gardner equation. The rough |
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| 30:07 | for all points. And you see kind of by sex. Again, |
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| 30:13 | you're ignoring calcite Samantha and the shells the most part shells are faster than |
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| 30:21 | than the gardener equation. Or I say more dance, sorry, slower |
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| 30:27 | a given density fast, uh more at a given velocity than the sand |
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| 30:33 | . And the gardener equation is kind divides the the population is there? |
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| 30:44 | , just for your reference and some the exercises you're going to do, |
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| 30:49 | are polynomial fits to the gardener So these equations correspond to these lines |
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| 31:02 | except for the sandstone line which has forced to curve through the courts |
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| 31:08 | So the sandstone line has been modified And you could uh applaud velocity versus |
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| 31:20 | . And then compare lines of constant . And again, what you can |
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| 31:28 | is that if the salmon shell have same impedance. The shell will be |
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| 31:34 | dense than the sand and the sand be slightly faster than the shell |
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| 31:46 | Now, if we look at velocity trends at different depths, what we |
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| 31:52 | that those relations can change. So are shells, this is the gardener |
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| 32:00 | which remember tends to be an upper for shells. The shales tends to |
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| 32:04 | more dense than the overall Gardner Uh And so this is where the |
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| 32:11 | points are plotting, but you can that there's a slightly different trend, |
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| 32:16 | ? There's a different slope here than . These were from two wells right |
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| 32:22 | to each other. One was a well, one was a deep well |
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| 32:26 | the differences these shells are in pressure these are normally pressure. So |
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| 32:35 | the effect of overpressure is to reduce velocity at a given density. So |
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| 32:43 | forcing the grains apart. You see the same density. You know, |
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| 32:47 | we were on the garden line or extrapolating this line straight up, we |
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| 32:53 | have higher velocity. So this is idea that by increasing the poor |
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| 32:59 | you will affect the velocity more than density by pushing the grains apart as |
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| 33:06 | poor fluid is pushing out. It force the grains apart. So here's |
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| 33:15 | , an example of a shell in ferocity uh that you can see is |
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| 33:23 | dark ferocity there's also porosity between clay , which you can see. Uh |
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| 33:30 | , I'm sorry, the black is and I'm sorry the black is |
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| 33:35 | And so all the ferocity is very , you really can't see it. |
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| 33:40 | uh you can see that the Karajan mimicking a flat of shape from the |
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| 33:47 | platelets themselves. Alright, so everything elongate here. Okay, so now |
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| 33:59 | going to do another exercise and we're to look at the effect of organic |
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| 34:07 | on the density of a shell. the first thing we want to do |
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| 34:15 | from this, these are measurements of in shales versus the total organic content |
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| 34:23 | this is weight percent uh to convert percent organic material to volume fraction. |
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| 34:33 | need to know the specific characteristics of shell, You need to know that |
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| 34:40 | shell composition, but as a rough you won't be too far wrong if |
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| 34:46 | just say the volume of fraction is the weight percent expressed as a |
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| 34:52 | So toc is 20% That would be volume fraction organic material of .4 or |
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| 35:03 | . Okay, so the first order business, I'm going to ask, |
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| 35:06 | , for this suite of shells? I had zero organic content, what |
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| 35:14 | the shale density be and what would total porosity of that shall be. |
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| 35:22 | and then I'm gonna ask you to the density of the organic matter. |
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| 35:27 | the equation you need to use here the mass balance equation And use a |
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| 35:34 | density of 2.65 g per cc. understand what I want you to |
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| 35:56 | Yeah. So use the mass balance and a grain done city of 2.65 |
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| 36:03 | per cc. And then look at data points and look at that fit |
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| 36:08 | the data. Tell me the both of a shell without any TFC. |
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| 36:17 | at zero TFC, read off that density, convert that to a total |
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| 36:23 | for the shell from from the mass equation. And then given the that |
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| 36:32 | relationship between both density and toc calculate density of the organic matter. So |
|
| 36:44 | you had 100 you know, if extrapolated That line to 100% toc Or |
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| 36:53 | volume fraction of one, what would density P And again, I'm going |
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| 37:09 | stop recording while you work on This conference will now be recorded. |
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| 37:21 | uh by definition Karajan is organic matter can't be extracted using organic solvents and |
|
| 37:37 | usually derived from algae and woody plant and the molecular weight is high compared |
|
| 37:46 | bitumen. Bitumen, which is another of organic matter and that's soluble organic |
|
| 37:55 | . There's a fine line between bitumen heavy oil. It often acts like |
|
| 38:01 | thick viscous fluid. Um you can of it as solid petroleum. So |
|
| 38:12 | bituminous rock is a sandstone that has in it. So bitumen will can |
|
| 38:20 | dissolved in organic solvents carriage and There's also a minor constituent graphene which |
|
| 38:30 | a type of single layer carbon. , So similar to graphite, except |
|
| 38:38 | a different with a different crystal Okay, so veteran I is a |
|
| 38:52 | of material found in carriage incense and these are derived from land plants. |
|
| 39:04 | the reason veteran it is important is it has a shiny appearance uh therefore |
|
| 39:12 | vitreous and how reflective it is, on how mature it is. So |
|
| 39:19 | measuring how well veteran it reflects You are in fact measuring the maturity |
|
| 39:26 | the veteran it and by analogy than the organic material around. Quick question |
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| 39:35 | is there no priests? I laurean . I've so I think the answer |
|
| 39:55 | that there wasn't much in the way land plants back then in the early |
|
| 40:05 | . Okay, so the reflections of veteran. It is a measure of |
|
| 40:10 | percentage of incident light reflected from the of it tonight particles in a sedimentary |
|
| 40:18 | And it's expressed as percent or % Uh And if you have many veteran |
|
| 40:26 | samples, they often report just the of those were many veteran it particles |
|
| 40:32 | a given rock sample, They would the mean are zero. Uh and |
|
| 40:39 | reflections of veteran it changes with And so it's a thermal indicator and |
|
| 40:46 | as a benchmark in maturation studies. this is an example of a publication |
|
| 41:05 | they were getting an organic matter density Pretty High, Right? 1.53 - |
|
| 41:13 | . Usually it's assumed to be on order of 1.1 g per cc. |
|
| 41:19 | you see, we calculated .83 g cc. Right or wrong. Uh |
|
| 41:33 | a plot of another plot of toC both density in a variety of different |
|
| 41:42 | . This is from burning and what arguing is that the very, you |
|
| 41:53 | , sometimes with the same percentage you have a lower uh both density |
|
| 42:03 | what Bernick is arguing here is that toc itself can be porous. So |
|
| 42:12 | suggesting a wide range of both densities the organic matter, depending on the |
|
| 42:21 | of the organic matter itself. well, organic rocks, that's one |
|
| 42:30 | level of complication. Let's go back inorganic rocks. So we're not going |
|
| 42:37 | worry about organic content right now. we're going to look at relationships between |
|
| 42:44 | , density and mythology. So, are equations in the free or |
|
| 42:51 | Uh, not far from here, actually, well, in Elgin |
|
| 42:57 | Uh, and we have p wave is equal to a constant, which |
|
| 43:04 | pretty close to the velocity of courts . The constant times ferocity minus the |
|
| 43:11 | times volume of clay. So what says is as you increase the |
|
| 43:17 | the p wave velocity goes down as increase the volume of clay, mostly |
|
| 43:24 | courts with clay. The p wave goes down, but the sensitivity to |
|
| 43:32 | is greater than the sensitivity to volume clay. As a matter of |
|
| 43:37 | almost four times greater. Similarly for shear wave velocity is equal to a |
|
| 43:45 | , which is similar to the shear velocity of course, minus a constant |
|
| 43:53 | the ferocity minus a constant times the of clay. Now, ideally if |
|
| 44:03 | have separate V. P and S measurements, you could extract, |
|
| 44:08 | could solve two equations, two you could solve for ferocity, you |
|
| 44:12 | solve for volume of clay and it out that that's not a very accurate |
|
| 44:20 | . These coefficients are similar enough to other at least the ratio of them |
|
| 44:25 | similar enough that it's actually not a precise a measure of ferocity or volume |
|
| 44:33 | clay. So, you really need independent measurement in order to extract ferocity |
|
| 44:42 | volume clay by the way, these in brine, saturated rocks, there's |
|
| 44:47 | water saturation in this calculation. so we could go back to our |
|
| 44:55 | balance equation. And so we could that the bulk density is the ferocity |
|
| 45:01 | the density of the water, plus volume of clay, times the density |
|
| 45:05 | clay plus the volume of course, the density of course. And now |
|
| 45:11 | have uh can combine with equation which is usually these measurements are usually |
|
| 45:17 | reliable than the shear wave velocity but we could do it with either |
|
| 45:22 | and that. So equation one in or two and three we'd have two |
|
| 45:27 | . Two unknowns. And what we is um, across plot like |
|
| 45:34 | So p wave velocity versus density we a court's point and you have a |
|
| 45:41 | point. Now, depending on the and depending on whether you're including bound |
|
| 45:48 | in with the clay volume or in the ferocity, that point can be |
|
| 45:54 | different places. So here we're saying density of the plays 2.4. Whereas |
|
| 46:01 | the previous exercise I said use 2.65 would be a dry clay. |
|
| 46:09 | would be a porous clay with some , which with some bound water or |
|
| 46:14 | ferocity associated with the clay. In case then these ferocity has become more |
|
| 46:20 | effective Torosidis. So you have a porosity line, you have a court's |
|
| 46:26 | line. This would be the velocity relationship for courts, you have a |
|
| 46:32 | water line. That would be the density relationship For 100% claret shell. |
|
| 46:41 | then you would have lines of constant here. So from a p wave |
|
| 46:47 | versus density cross block. If the are within this region, then you |
|
| 46:53 | extract the ferocity and the volume with uh buying the play would be where |
|
| 47:00 | are along any one of these lines the process he would be which line |
|
| 47:07 | on. Okay, now we mentioned the density logs are unreliable very often |
|
| 47:19 | we want to estimate the density log one pretty robust way of doing that |
|
| 47:28 | saying, well, my density is to if I have other measures of |
|
| 47:35 | ology like neutron log, like gamma log, uh huh or you |
|
| 47:42 | other log types. Um and I some idea of my volume fractions of |
|
| 47:49 | different minerals. Uh then the density equal to uh Vying fraction of each |
|
| 47:59 | times the density of that component. , these would be porous components. |
|
| 48:05 | this would be density of pure density of pure uh sandstone, density |
|
| 48:13 | pure clay shell for example. And I had divine fractions of each, |
|
| 48:19 | I could calculate the bulk density of rock. Uh huh. Now, |
|
| 48:27 | do I get this density of the mineral? Well, you could use |
|
| 48:33 | ferocity transforms. These could be like gardener equations or the widely time average |
|
| 48:40 | for each Pure mythology. So, have some transform. It doesn't have |
|
| 48:44 | be in this form, but this a typical form that choose some coefficient |
|
| 48:50 | the measure p wave velocity plus a . And these values would be different |
|
| 48:57 | each with ology. Um and uh I I can compute given the measured |
|
| 49:04 | wave velocity, I could compute what density would have been had. I |
|
| 49:09 | a purely mythology and then I could those purely mythology densities. Mix them |
|
| 49:15 | the vying fractions and get the bulk of the rock. And so this |
|
| 49:24 | an example of then a simulated density . So here's my caliper log, |
|
| 49:31 | is my volume clay log that came the gamma ray and using volume play |
|
| 49:38 | courts, just assuming two anthologies. is a plastic section. I can |
|
| 49:45 | the equation the previous equations and I compute the dash line here, which |
|
| 49:51 | the estimated density. And what you is that the estimated density where you |
|
| 50:00 | a nice borehole here, where the is good and flat, it tends |
|
| 50:05 | agree with the measure of density, where the borehole is very rough |
|
| 50:14 | you see the predicted density is larger the metro density measure density being |
|
| 50:21 | And also you're noticing that thin layer , the calipers washed out in that |
|
| 50:27 | formation. And you can see that densities measure density is too low. |
|
| 50:41 | that caliper is really bad. And the way, actually looking at this |
|
| 50:48 | , I've caught this error before, somehow an uncorrected one got through the |
|
| 50:53 | of plays backwards here, clean is to the right. So this should |
|
| 51:01 | 1-0. So this would be a formation here. So we reversed one |
|
| 51:09 | the zero there in volume clay but you get the idea if I |
|
| 51:13 | a valid measurement of length. I could correct the density log and |
|
| 51:21 | is just another example of that. cross plotting the predicted density against the |
|
| 51:27 | density. You can see that they're the original law. There's some abnormally |
|
| 51:32 | densities which if you compare the two in zones like this. And in |
|
| 51:39 | you can see a big difference between predicted density and the observed density. |
|
| 51:49 | if we have a neutron log, then that could help me handle the |
|
| 51:54 | complex mythologies. And here's a way predicting ferocity by cross plotting sonic transit |
|
| 52:03 | versus neutron ferocity. You have to corrected both measurements by the way before |
|
| 52:10 | do this. But now we can the ferocity variation in different mythologies. |
|
| 52:18 | if I have a mixture of I could then from the prosperity, |
|
| 52:23 | what the density should be. so some final thoughts on densities. |
|
| 52:34 | sure that the tool has been calibrated the types of rocks. You're in |
|
| 52:40 | for whole washouts. Beware of large corrections. Worry about oddly shaped boreholes |
|
| 52:52 | be sure to take into consideration the density correction. Okay, I think |
|
| 53:02 | is a good time to take a minute break. So I'll stop recording |
|
| 53:10 | . This conference will now be This conference will now be recorded. |
|
| 53:15 | we go. Thank you. what is the vector um uh entity |
|
| 53:28 | has a magnitude and direction. Exactly . Yeah. Who? I don't |
|
| 53:35 | the answer here. Mm. What force? The muscle one here? |
|
| 53:51 | me? Well, that that's what is equal to but what is |
|
| 54:05 | It is a vector quantity that went fly to an object. Could change |
|
| 54:11 | motion of the object. What is ? The difference? Uh distance traveled |
|
| 54:29 | time, yep. And so how's different from speed? Yeah, that's |
|
| 54:40 | right. And we usually ignore the , you know when we talk about |
|
| 54:45 | , right? When we say velocity six km/s, we don't specify in |
|
| 54:52 | direction. Right? But in an psychotropic world you should um what is |
|
| 55:03 | rate of change of velocity? Uh . What is mass? Did they |
|
| 55:11 | define mass in your physics class? . What is math? I can |
|
| 55:23 | you the definition I found is very . It's the quantity of matter. |
|
| 55:32 | find that to be very unsatisfactory. that's what masses. Uh huh. |
|
| 55:40 | are balanced forces, forces leading to ? Yeah. So leading to no |
|
| 55:54 | of motion of an object. What unbalanced forces? Well getting, |
|
| 56:03 | And then we have ethical M A is g gravitational constant? Uh is |
|
| 56:12 | acceleration due to gravity which is not same as capital T. Which is |
|
| 56:17 | gravitational constant. It's the acceleration due gravity and someplace Well, if I |
|
| 56:26 | given it to you. Oh there go. There are the answers. |
|
| 56:35 | , 32ft per second squared and you convert that to kilometers per second if |
|
| 56:42 | wish. So what is equilibrium? state of unchanged uh, balance of |
|
| 56:57 | is, yeah, yeah, now this is a physics problem that |
|
| 57:09 | asked many PhD physicists, including professors physics one, I've often had this |
|
| 57:17 | and it amazes me how many graduate , even physics majors Don't get this |
|
| 57:25 | right. So if I drop a on your head from a height, |
|
| 57:32 | ft over your head, there will little effect. Right? A pebble |
|
| 57:37 | on your head from one ft above hurt you. But if I dropped |
|
| 57:41 | same pepel pebble from the top of same mass from the top of a |
|
| 57:47 | building, it will kill you if lands on your head explain west in |
|
| 58:00 | simple course. So the same month changing that generation due to the increasing |
|
| 58:07 | , including the force that conduct except acceleration is the same in both |
|
| 58:16 | Remember the acceleration is g is the due to gravity? It doesn't matter |
|
| 58:23 | far it has fallen. The acceleration to gravity is that was essentially the |
|
| 58:29 | physical? Although the situation is we're that. Okay, but it kills |
|
| 58:39 | because the forces greater does, doesn't ? All right. So how do |
|
| 58:43 | explain the force being greater if the is the same and the acceleration is |
|
| 58:48 | same? Mhm. So, did guys uh, I used to watch |
|
| 59:10 | Gear, you know, Grand Tour Gear? Yes, very nice program |
|
| 59:19 | one of my favorite shows and this from one of the hosts. This |
|
| 59:23 | a show about um what do you them? Not just racing cars, |
|
| 59:29 | high performance vehicles, Right. High cars. Um speed has never killed |
|
| 59:37 | suddenly becoming stationary. That's what gets . Okay. The reason the pebble |
|
| 59:47 | you coming off a tall building because velocity is higher and when it hits |
|
| 59:53 | , you're stopping it, you're decelerating . Right? So because the velocity |
|
| 59:59 | higher, the deceleration is much See my point anyway, this has |
|
| 60:08 | to do with rock. Physics really it is Iraq, right? But |
|
| 60:13 | fact, it's an interesting physics I've always found how many people don't |
|
| 60:19 | that answer. Right, okay, , just reviewing a little bit of |
|
| 60:26 | , one composition of forces. If have to forces acting on an |
|
| 60:32 | it's the same as a result in . Right? And I could I |
|
| 60:40 | uh determine the vector components of that in Cartesian coordinates. If I have |
|
| 60:48 | result in force, I could have force in the X. Direction here |
|
| 60:54 | the force in the right direction. said, I could decompose any result |
|
| 60:58 | force into F of the F. X and F of Y. And |
|
| 61:04 | course, FFC in the 3rd There we go. So any force |
|
| 61:11 | resolved into components in each dimension. . Now we experience different kinds of |
|
| 61:25 | . There is a forest like which is called what what's that force |
|
| 61:32 | ? Extension. A laura tension where have a force like this which is |
|
| 61:38 | what compression good. And here we wrote possibly rotational or share forces. |
|
| 61:49 | that's called a couple. If these are not balanced, this thing will |
|
| 62:04 | . Right? So uh this is if I if I have a moving |
|
| 62:09 | stress, the volume elements of the will be trying to rotate. So |
|
| 62:14 | why shear waves are also called rotational . And of course equilibrium is when |
|
| 62:22 | the forces are balanced and if I a balanced couple again will still be |
|
| 62:30 | equilibrium by the way. What type forces? This the arrows here, |
|
| 62:45 | is called torshavn. And in fact way of uh at one point uh |
|
| 62:52 | we had lots of money to spend the oil industry, we actually had |
|
| 62:56 | anal vibrators and they they were good generating shear waves. Okay, so |
|
| 63:07 | going to be dealing with stress and of pressure as an omni directional |
|
| 63:15 | What is stress? It's force per area? So if you sit on |
|
| 63:23 | nail the forest is your way on now. And the area of that |
|
| 63:34 | nail making contact with the part of that's sitting on the nail. It's |
|
| 63:39 | very small area. So you have high all your forces concentrated in that |
|
| 63:45 | area. You have a high On the other hand, you could |
|
| 63:49 | on a bed of nails and I've that by the way, I don't |
|
| 63:54 | if you ever experienced. It's a bit weird, but if now instead |
|
| 63:59 | one nail you have many nails. the forces divided amongst all those |
|
| 64:05 | And so the stress you experience is and you can actually sleep on a |
|
| 64:10 | of nails. It doesn't hunks for . So that's stress and forces a |
|
| 64:20 | . Then stress is also a vector area is a scalar. Right? |
|
| 64:25 | stress is a vector. And it , like for us it could be |
|
| 64:29 | into components in the X, Y Z directions. So in two |
|
| 64:36 | if I have some arbitrary stress factor our arbitrary orientation and it's acting on |
|
| 64:43 | plane. I could decompose that stress to the plane. I could look |
|
| 64:49 | a component of stress in the and I could look at the component |
|
| 64:54 | stress normal to the plane. And the way, in three dimensions I |
|
| 64:58 | have to tangential components in the plane the inclined plane and one normal. |
|
| 65:07 | an arbitrary stress factor is decomposed into components often called sigma, X, |
|
| 65:14 | , Y and sigma Z. if I apply a stress to |
|
| 65:23 | I will deform the rock. And that stress is small enough and the |
|
| 65:32 | is elastic enough, that relationship between and the resulting defamation is linear. |
|
| 65:40 | we measure the resulting defamation as a change, so change, for |
|
| 65:47 | changed in length over, divided by length or change in volume divided by |
|
| 65:52 | volume. I measure this strain as ratio. So strain is actually uh |
|
| 66:01 | liss. It's a ratio of a to a distance or a volume to |
|
| 66:06 | volume. Right? So strain is liss. And if I'm in the |
|
| 66:12 | field here, I have a linear between stress and strength. That means |
|
| 66:19 | have stress is equal to a constant strength. This constant is called an |
|
| 66:27 | module list. Um If I were with a spring, that would be |
|
| 66:33 | the spring constant. Right? Um if strain is dimension liss, what |
|
| 66:42 | the units of the constant? The as the units of stress. What |
|
| 66:50 | the units of stress force per unit ? So this proportionality constant constant between |
|
| 67:00 | and strain has the same units as force per unit area. By the |
|
| 67:09 | , if I'm in this linear range , and if this relationship holds over |
|
| 67:17 | whole, which range, it doesn't whether I'm increasing the stress or decreasing |
|
| 67:22 | stress, I move up the curve I increase the stress as I increase |
|
| 67:28 | stress, the strain increases. But I decrease distress, the strange decreases |
|
| 67:36 | , that means that the strain is recoverable, that's what elastic needs. |
|
| 67:43 | why we call this elastic field. the strain is entirely recoverable. And |
|
| 67:51 | the way, this idea that stress equal to a constant time strain that's |
|
| 67:56 | Hook's law just being applied to stress of force. Now, at some |
|
| 68:04 | , if the stress is big I'll start to deform the rock in |
|
| 68:09 | way that, you know, and break pieces of the rock. I'm |
|
| 68:13 | permanently change the rock. I'm a , I'm a compact it. So |
|
| 68:19 | the stress gets big enough, the between stress and strain can become non |
|
| 68:26 | . And then when I remove the , not all the strain is |
|
| 68:32 | You can think about squeezing a Can write if you squeeze it a |
|
| 68:38 | bit or even I squeeze this I squeeze it a little bit, |
|
| 68:42 | snaps back to its original shape. if you squeeze it too much, |
|
| 68:48 | will say permanently deformed to some So, um, this field, |
|
| 68:55 | is called plastic behavior when the strain not entirely recoverable. And so that |
|
| 69:02 | called the duct outfield. Now, you'll reach a point where the rock |
|
| 69:10 | . And that could be called the point or the failure point. |
|
| 69:23 | the curve could be a little bit complicated. For example, the yield |
|
| 69:29 | here is where the slope changes the changes. That means for the same |
|
| 69:39 | of stress, I'm getting more You can think about that like |
|
| 69:47 | Just, it reaches a point where just starts to give way right? |
|
| 69:54 | so with increments, a small increment stress, you get a much bigger |
|
| 70:00 | change in strength. So this yield where you have that change in slope |
|
| 70:05 | have to be precisely at the limit Hook's law. Could actually be a |
|
| 70:10 | bit more complicated like this where you a point where you're no longer |
|
| 70:16 | So that might be the limits of law. Even though you're going non |
|
| 70:21 | , you may still find that the recoverable. You just follow the curve |
|
| 70:26 | down. That's called the elastic And the yield point is where the |
|
| 70:32 | flattens out here. Alright. To a few things. 10 south dressed |
|
| 70:43 | a pulling force away from the body stress or a compression is a pushing |
|
| 70:51 | acting into the body. A tensile elongates the body. A compressive |
|
| 70:59 | shortens the body shearing stress, exit angles to the tensile compressive stress and |
|
| 71:08 | , or shears the body. This a change of shape of the |
|
| 71:18 | As I mentioned, units of Our force per unit area. And |
|
| 71:26 | we take Dynes per centimeter squared times to the 10th, we call those |
|
| 71:32 | pascal's. And those are the units usually deal with in rock physics on |
|
| 71:38 | scientific side because if I use giga , my velocities will automatically and densities |
|
| 71:45 | grams per CC. I will automatically out with velocities and kilometers per |
|
| 71:52 | And remember I said this proportionality constant , which are the elastic module i |
|
| 72:00 | the a proportionality constant between stress and is called the elastic module lists. |
|
| 72:07 | has the same units as stress. I could use giga pascal's for elastic |
|
| 72:15 | I as well. Now in the industry, they still like to use |
|
| 72:19 | pounds per square inch. So being to convert here between different units is |
|
| 72:32 | . Okay, so a giga pascal of the 10th, nines per centimeter |
|
| 72:41 | . Okay, quick calculation. I you to make a mineral has a |
|
| 72:46 | module list of 40 giga pascal's and sheer module. List of 40 giga |
|
| 72:52 | and the density of 2.65 grand per calculate VP and Bs In km/s and |
|
| 73:02 | convert that two ft/s. Mhm. these equations here. Oh wait, |
|
| 73:19 | were in the old one. Use the equations for VPN Bs that |
|
| 73:25 | gave you before. I know for video costumes. No, no. |
|
| 74:02 | If you use giga pascal's and grams CC, the velocities will come out |
|
| 74:07 | kilometers per sec. That's just a . That's why I like to use |
|
| 74:14 | pascal's VP is 5.9, you want per second, yep. And 19,000 |
|
| 75:23 | 476 correct. The v. s 3.9. Yeah. Uh and we |
|
| 75:32 | 12746. 50%. What was Uh 12? Uh 746. And |
|
| 75:42 | those numbers are very close to those the eastward equations that we talked about |
|
| 75:48 | the last unit. Mm. Uh . Mhm. So here we have |
|
| 76:02 | arbitrary stress factor acting on a face a parallel pipe head here and this |
|
| 76:15 | a slate. I got out of Mechanics textbook and it says the stress |
|
| 76:24 | which is also called attraction, is on an infinite testicle area. Ds |
|
| 76:31 | this little black square over here because an infant intestinal area. So these |
|
| 76:41 | differentials here and that area's dx dy this terminology a stress vector acting on |
|
| 77:02 | face. The the face it's acting is the face that's normal to the |
|
| 77:12 | axis. It's in the it's parallel the XZ plane but it's normal to |
|
| 77:19 | y axis. So that's why this called sigma. Y. It's the |
|
| 77:26 | acting on the wide face, which the face normal to the y |
|
| 77:32 | So rock mechanics, you have to very close attention to this notation, |
|
| 77:38 | the terminology here. So there's an on this flight, can you see |
|
| 77:51 | ? There are always going in the , it's I said rather than what |
|
| 77:59 | go to a girl. Okay, the stress factor by by the |
|
| 78:04 | You mean this? Okay, so notation says nothing about the direction of |
|
| 78:13 | vector of the stress factor. What saying is it's acting on the y |
|
| 78:19 | . That's what sigma's that why needs the Y face is the face normal |
|
| 78:26 | the y axis. So this notation correct. I'll give you a hint |
|
| 78:36 | errors in the caption. Mhm I there is more than one ever. |
|
| 78:52 | , I don't know why the numbers like Roman and also English like 5:00 |
|
| 79:02 | . And yeah you mean italic? like Ivy and then three. |
|
| 79:14 | Oh here. Yeah. The figure . Yeah, that's just the Chapter |
|
| 79:20 | Figure 3. I mean that's a way of saying things there. No |
|
| 79:25 | a technical there's a technical error on slide and it isn't the caption mm |
|
| 79:33 | white. I'm not sure what iso to the X. Y axis. |
|
| 79:38 | , again that's just terminology. They from the origin out in the Y |
|
| 79:44 | . That's what they mean by the axis. So this would be their |
|
| 79:47 | . Y axis. Okay, these are my two observation. That's |
|
| 79:52 | not sure what Okay, so where acting on an infinite intestinal area? |
|
| 80:00 | is the area of that square? that rectangle? What is the area |
|
| 80:08 | that? That this infinite decimal That the stresses acting on what is |
|
| 80:19 | Y? That's a distance in the direction on that plane which is normal |
|
| 80:27 | the y axis, D Y is . The area. This is actually |
|
| 80:34 | DZ Yeah. So it gave me delight finding this error in Iraq mechanics |
|
| 80:42 | . Okay. okay, so reminder some. Why is that vector is |
|
| 80:55 | parallel to the Y axis? That is acting on a plane normal to |
|
| 81:02 | Y axis. Now I could then this vector and I could look I |
|
| 81:08 | do a decomposition into the force in Y direction, in the Z. |
|
| 81:14 | and to the X direction. So of forces that give me that resulted |
|
| 81:21 | . All right. So then I have a force in the in the |
|
| 81:25 | . Force in the UAE and of in the Z direction. So that |
|
| 81:30 | me three different stresses. All of stresses act on the Y plane but |
|
| 81:39 | in the X direction, the wind in the Z direction. You see |
|
| 81:45 | Y direction is the normal force when plane and the direction of the forests |
|
| 81:51 | the same designation. That's a normal . Right? That would be normal |
|
| 81:59 | that plane along the Y axis. that So sigma, why why is |
|
| 82:06 | normal sigma? Y X is on Y plane acting in the X |
|
| 82:15 | That's a sheer force and sigma, . Z. Is in the UAE |
|
| 82:20 | acting in the Z direction. That's the sheer component. So one general |
|
| 82:28 | with General Orientation has three components acting that wide plane. The two sheer |
|
| 82:35 | , X, Y. Z and normal component. Why? Why follow |
|
| 82:44 | that's just this space. But I have the X face normal to the |
|
| 82:50 | axis and I have the z face to the Z axis. So each |
|
| 82:56 | those I have sigma's X X six X. Y. Sigma X. |
|
| 83:04 | . And I have cigna, Sigma , X, Z, Y. |
|
| 83:09 | Z. Z. Right so the normal components are xx sigma, |
|
| 83:15 | X. Sigma, Y. And sigma's easy. Is everybody following |
|
| 83:21 | on this? So one so acting a parallel pipe, the pipe head |
|
| 83:28 | this distress applied to that entire body applied to all the faces then? |
|
| 83:41 | many components of stress act on that pipe? Ed. Uh huh. |
|
| 83:49 | period? Well on all the So I have three equivalent faces. |
|
| 83:55 | we're assuming a uniform stress field. the stress on the top face is |
|
| 84:01 | same as the stress on the bottom . So we only need to consider |
|
| 84:05 | stresses on three faces. The opposite have the same stresses. Yeah. |
|
| 84:12 | huh. Right. No we have acting on each face and there are |
|
| 84:19 | three faces that are independent. So . And again I've assumed the uniform |
|
| 84:25 | field that means as I move around stress hasn't changed. Okay so believe |
|
| 84:36 | or not you weren't bargaining for this we're talking about a tensor now the |
|
| 84:44 | tensor remember uh stress has magnitude and and There are nine components of stress |
|
| 84:57 | on an object on this face on face. And on that face on |
|
| 85:03 | infinite decimal volume so I can express stress as the tensor. It's just |
|
| 85:13 | matrix With all nine stress components in . That's the stress tensor. |
|
| 85:25 | by the way this object isn't we're going to require that this object |
|
| 85:30 | equilibrium. So if I have reversed they must be equal. Otherwise the |
|
| 85:37 | going to move. So sigma X. Which is on the y |
|
| 85:46 | acting in the Okay, let's get axes right, where is the white |
|
| 85:50 | ? This is the white plain. it's that plane acting in the X |
|
| 85:57 | is this guy? This guy must must equal sigma X. Y. |
|
| 86:04 | guy if it doesn't, the cuba going to start rotating. Now this |
|
| 86:18 | the more complicated situation where you have non uniform stress field so the stress |
|
| 86:24 | varying. So you have to take account the rate of change with the |
|
| 86:30 | with position along each axis. you know people engineers in rock mechanics |
|
| 86:39 | need to worry about this for our . We're going to assume a uniform |
|
| 86:45 | field so we're not going to worry this kind of situation. So what |
|
| 86:55 | defamation? Here's an under formed solid here is a deformed solid. The |
|
| 87:05 | can be expressed as the changes in of the size of an inscribed |
|
| 87:19 | Now suppose the angles angle angle. an angle be suppose these angles off |
|
| 87:26 | the same. I could have a stress where the sides become shorter but |
|
| 87:32 | angle stay the same. So I've the volume but I haven't changed the |
|
| 87:38 | . I haven't changed the shape of rock. So a volumetric strain will |
|
| 87:48 | change these angles, but a distortion I change the shape will change those |
|
| 88:02 | . So strain is the deformation caused stress stress. Dilation is a changing |
|
| 88:11 | distortion is a change in shape. , so coming back, let's define |
|
| 88:23 | terms again. This should be reviewed now. What does elastic mean? |
|
| 88:34 | strain is recoverable mostly? Yes, right. You're both right. The |
|
| 88:39 | is reversible. What is the elastic ? Uh is the yield point? |
|
| 88:50 | , okay, so in the simplest the elastic limit and the yield point |
|
| 88:56 | the same. But literally the elastic is the stress beyond which the strain |
|
| 89:03 | no longer entirely recoverable. So some all the defamation, but some of |
|
| 89:11 | deformation is irreversible. What is hooks a distress? The spiritual proportional to |
|
| 89:20 | strength. Well, both. And strain is proportional to stress. Um |
|
| 89:29 | does plastic mean? You can Right. Yeah. So it's at |
|
| 89:38 | partially reversible visco elastic is kind of tough one. Uh We use that |
|
| 89:45 | a lot in uh in geophysics and has specific uh implications about how |
|
| 89:55 | Uh how the rock continue weights, would say just very loosely. It's |
|
| 90:02 | elastic and plastic deformation rupture is where material breaks. Now here's an interesting |
|
| 90:14 | brittle. We haven't talked about what means yet. What is a brittle |
|
| 90:26 | bill across? Yeah. But what what does the term brittle mean? |
|
| 90:33 | the definition of brittle? Uh Is erupt that does not go through a |
|
| 90:42 | ? Uh It moves from elastic to to eat. Exactly. So coming |
|
| 90:49 | the way back here. That's very . Most people don't realize this if |
|
| 90:55 | is a lot of defamation before That is called plastic. If there's |
|
| 91:03 | little depth defamation before fracture. So put it this way there's very little |
|
| 91:13 | plastic deformation before fracture. That is a lasting. So if I break |
|
| 91:19 | after the U. Point here that's . If I have a lot of |
|
| 91:26 | deformation before fracturing that's called Doctor. people think brittle means it's easier to |
|
| 91:38 | . That's not what it means. it means is when it breaks it |
|
| 91:43 | right away it doesn't perform very Okay so now let's uh start to |
|
| 91:56 | some cylinders. And again we're looking this in two dimensions but I have |
|
| 92:06 | cylinder and on one end it's attached a perfectly rigid anchor there. So |
|
| 92:15 | diagonal lines means that that thing cannot . It's perfectly richard and I have |
|
| 92:24 | material here and I compress it. is a uni axial compression. It's |
|
| 92:31 | compression in one direction and it's a compression. So it's equal force at |
|
| 92:40 | point along here. What will happen when you squeeze that rock with a |
|
| 92:47 | axial compression, you will shorten it you have a change in length. |
|
| 92:55 | you will also it will also bulge because the material that you're pushing into |
|
| 93:02 | shorter distance to conserve the volume, has to bulge app. So you'll |
|
| 93:10 | a change in length and a change with. So this uni axial |
|
| 93:19 | So compression in one direction has strained two directions. It's got a longitudinal |
|
| 93:26 | delta L. Over L. In trans verse strain. Delta with over |
|
| 93:37 | in a perfectly elastic rock or situation whether Iraq behaves elastically depends on the |
|
| 93:47 | of the stress and the time over that stress is applied. So let's |
|
| 93:52 | an instantaneous stress. And it's small small enough magnitude that I'm still obeying |
|
| 93:59 | law. Then it doesn't matter if compressing or I'm pulling pulling will give |
|
| 94:06 | the same situation. It will uh L. Over L. Or delta |
|
| 94:13 | . Over W. So as I on, it gets thinner. |
|
| 94:17 | if I'm applying a sheer force for most part I keep the volume the |
|
| 94:24 | . And what changes is the angle . So I have a change of |
|
| 94:30 | . So a sheer force involves only change in shape. In the case |
|
| 94:35 | solids. When I have a unique compression, I'll have a change in |
|
| 94:40 | and a change in volume in a , I won't be able to change |
|
| 94:45 | volume, I'll maintain the volume constant that's what we mean by being in |
|
| 94:52 | . This is an unconfined experiment. it if it were confined, I |
|
| 94:57 | change the volume of that fluid by it. But unconfined like this um |
|
| 95:03 | can't change the volume of the A solid will change its volume |
|
| 95:15 | I thought this was an interesting quote Nigel Anstey. Um if you ever |
|
| 95:20 | um very clear, concise introduction to , his course notes are fantastic. |
|
| 95:29 | , they're expensive to get usually um h R D C International Human |
|
| 95:40 | I think Development Corporation sells his notes they're quite expensive, but if you |
|
| 95:47 | get your hands on them, they're . And this is a quote from |
|
| 95:53 | . Yet, despite all the problems velocity, we are reluctant to give |
|
| 95:57 | the hope that somewhere, if only could find it, there must be |
|
| 96:01 | master variable connecting velocity and geology, master variable meaningful to a geologist and |
|
| 96:09 | leading directly to the physical property of and uh to the state, we |
|
| 96:16 | have a master variable really. Um same factors that affect elastic module I |
|
| 96:24 | velocities. So, you know, the entire science of rock. Physics |
|
| 96:29 | , connects geology to velocity. Uh a few words on tensors and if |
|
| 96:40 | course we're being taught by dr you would be doing a lot of |
|
| 96:46 | mathematics and we're not going to in class, but you need to be |
|
| 96:52 | of what they are. So, zero order tensor is a scalar and |
|
| 96:58 | can think of that as a a first order tensor is a |
|
| 97:03 | so you can think of that in computer as an array, And the |
|
| 97:08 | order tensor is a two dimensional Now there's a strain tensor and a |
|
| 97:20 | tensor. So, I have a , remember the designations of stress on |
|
| 97:28 | face? A law indicate direction. . So along the K access on |
|
| 97:37 | I face. Right. And we we have nine of these guys. |
|
| 97:45 | . Xx xy xz y x. ? Why? Why is the uh |
|
| 97:52 | x z, y, z Right, so we have nine of |
|
| 97:57 | and each one of these produces strains all nine directions. So, I |
|
| 98:05 | um I have a strange tents are again epsilon for strain, same nine |
|
| 98:17 | , So I. K stresses resulting LM strength, is that clear? |
|
| 98:26 | , each stress has a proportionality constant with each strain. So there are |
|
| 98:35 | of these And there are nine of . Right, So the like a |
|
| 98:41 | produces the LM strength. So how proportionality constants do I have here? |
|
| 98:55 | yep, I have nine of these to nine of these. Each one |
|
| 99:02 | these has nine of these and there nine of them. So 81. |
|
| 99:08 | is called the stiffness tensor. So one of these is the elastic module |
|
| 99:14 | connecting a stress component with a strained . Got it. Now I could |
|
| 99:26 | this differently, I could talk about compliance tensor where I have strained is |
|
| 99:33 | to the compliance tensor times the Just that I'm just offering that for |
|
| 99:44 | . We're not going to talk about sensors any further. We're going to |
|
| 99:49 | entirely with stiffness tenses. Now, , They're these 81 module. I |
|
| 100:01 | not independent of each other. If have an icy tropic rock, There |
|
| 100:12 | only two module. I buck module sincere modules. I don't have 81 |
|
| 100:19 | I. So depending on the symmetry the anti Satrapi, you have a |
|
| 100:31 | number of independent components. And the complicated case is try clinic symmetry where |
|
| 100:38 | have 21 independent components. That would a layered medium with fractures crossing the |
|
| 100:48 | . That would be a kind of clinic symmetry. The ones that are |
|
| 100:53 | important to us, Our idea tropic two independent stiffness coefficients and hexagonal |
|
| 101:01 | which is the same as trans I Satrapi. This is a layered |
|
| 101:07 | or it could be a set of fractures in a homogeneous medium. This |
|
| 101:12 | trans verse and ice octopi And that five independent components. Now there's further |
|
| 101:26 | to worry about. Uh this I is cumbersome to carry. So there |
|
| 101:34 | a short hands where Ikea is represented M. And L. M. |
|
| 101:43 | represented by N. And so I . Of 11 gets an M. |
|
| 101:52 | of 22 gets an M. Up 33. So these are the normal |
|
| 101:57 | And instead of six trans verse Now you only have to worry about |
|
| 102:03 | because remember that if I alternate the those have to be equal. So |
|
| 102:12 | becomes four etcetera. So now I write the stiffness tense tenser in this |
|
| 102:21 | convenient fashion And many of these values going to be zero along the |
|
| 102:35 | I have the normal components here and off diagonal terms. In some cases |
|
| 102:43 | are new values, but in other they can be expressed in terms of |
|
| 102:49 | other ones, so they're not So uh this is hexagonal symmetry, |
|
| 102:57 | have 1234, five independent components. huh. Now, this was a |
|
| 103:15 | of a confusing statement from Sean. So let's see, let's see if |
|
| 103:22 | can understand what he means by He says to observations are important for |
|
| 103:27 | description of the stress strain behavior. number one, the elastic module I |
|
| 103:34 | on stress. Therefore the stress strain are non linear. Wow, that's |
|
| 103:44 | a little bit something to chew Let me say that we don't worry |
|
| 103:53 | this, we don't worry about the module, I being stressed dependent, |
|
| 104:00 | look at one curve. Iraq. , We have one stress strain |
|
| 104:09 | Let's say that one. Let's make simple as I increase the stress. |
|
| 104:15 | stays linear. We have not changed stress strain relationship. And that's because |
|
| 104:27 | wave propagation we have very small stresses applied. So we're not thinking about |
|
| 104:35 | linear, nonlinear charity over the strange change and stresses. In |
|
| 104:43 | uh over geologic time in the earth I bury Iraq, we know the |
|
| 104:49 | becomes harder. And so the elastic list is going to get larger and |
|
| 104:54 | . Right? This slope is going increase. You're going to have less |
|
| 104:58 | less as the rock gets buried deeper deeper is under more confining pressure. |
|
| 105:05 | really under higher stress. Uh You'll less. Strange. So in |
|
| 105:12 | if we're talking about the ambient the stress under which the rock exists |
|
| 105:19 | the subsurface. That is a non relationship between ambient stress and how much |
|
| 105:26 | rock has strained over geologic time to where it is. Right. That's |
|
| 105:32 | non linear relationship. But we deal the Viet oric stress. We bury |
|
| 105:38 | stress by passing away through the rock we very distress in the laboratory. |
|
| 105:46 | stress strain relationship will be more And we think about that as a |
|
| 105:54 | . V. A. Taurus a deviation from the ambiance stress. |
|
| 106:01 | let's clear up that confusion. But uh he goes further. He says |
|
| 106:11 | are not ideally elastic materials. Their to stress depends also on the velocity |
|
| 106:18 | defamation and the history of defamation. deviations from hook floor result in one |
|
| 106:27 | phenomenon of energy absorption. And that's that's why I said, you know |
|
| 106:35 | we talk about visco elastic, absorption can be described mathematically, would |
|
| 106:42 | visco elastic model and that involves uh plastic deformation. And he also talks |
|
| 106:51 | the discrepancy between statically and dynamically determined . I A static module is you |
|
| 106:59 | the rock, you measure its length its volume, you put it on |
|
| 107:05 | , er pressure, hold that pressure and then re measure its dimensions, |
|
| 107:13 | a static measurement. Those are very stresses which are applied. A dynamic |
|
| 107:21 | is you pass away through the you measure the velocities and you back |
|
| 107:25 | the elastic module knowing the density, are dynamic module. So, dynamic |
|
| 107:33 | I number one are dealing with much , much more other stresses. Devia |
|
| 107:42 | stresses as opposed to large ambience Right? So smaller strain amplitudes for |
|
| 107:50 | dynamic measurement, also a dynamic measurement a frequency of oscillation. It could |
|
| 108:00 | uh kilohertz or megahertz. And what find is that if Iraq is |
|
| 108:12 | it's also going to be disperse That means the velocity varies with |
|
| 108:16 | That means the elastic modules varies with . So dynamic measurements have dispersion and |
|
| 108:26 | have a small strain amplitude relative to measurements which are essentially a zero frequency |
|
| 108:40 | . So now the minerals we deal our anti psychotropic, certainly think about |
|
| 108:46 | , they're going to be an icy . But even quartz calcite, |
|
| 108:51 | these are the stiffness coefficients. And see there are different, in |
|
| 108:58 | Uh We're beyond uh huh. Uh beyond hexagonal symmetry, even though that's |
|
| 109:10 | we up in the soup. Um how can we talk about rocks being |
|
| 109:20 | tropic If the minerals composing the our anti psychotropic, uh it's a |
|
| 109:34 | of skill. It is a matter scale. Right? And so and |
|
| 109:40 | the tropic minerals, if they're randomly , can produce a nice the tropic |
|
| 109:54 | . Okay, so let's get to elastic module I that are important to |
|
| 109:59 | . Number one is the bulk module also called the in compressibility and that's |
|
| 110:06 | resistance to volumetric compression. It's the stress divided by the volumetric strain. |
|
| 110:16 | sheer module is also called the rigidity the resistance to share deformation and that's |
|
| 110:23 | to the shear stress divided by the strength. The shear strain measured by |
|
| 110:28 | change in angle of Iraq, by way, both of these cannot be |
|
| 110:36 | . These particular elastic module, I be zero or greater. Where would |
|
| 110:43 | have zero share module list? Some . No, well uh the the |
|
| 111:02 | modular says, if I have stress is how much strain I'm going to |
|
| 111:07 | . Right. Um So the sheer is is what it is for the |
|
| 111:14 | under the conditions it has. So the stress doesn't change the share |
|
| 111:20 | So if I I have a rock a certain share modules, I can |
|
| 111:23 | it under zero stress and it would zero strain, but it has some |
|
| 111:31 | share modules. What would have zero modules? Exactly. Right. So |
|
| 111:47 | and liquids have zero shear modules. again, remembering the stress is equal |
|
| 111:59 | a constant time. Strange if I a shear stress, the shear stress |
|
| 112:13 | is equal to some constant times the strength which is measured by a change |
|
| 112:24 | the angle, right relative to the angle. So if it was originally |
|
| 112:31 | , these were right angles and then share the rock, I produce a |
|
| 112:38 | angle there. And so uh shear is related to the change in the |
|
| 112:47 | . Uh if I apply a hydrostatic , so the same stress in all |
|
| 112:55 | , I will shrink the volume of and the ratio of the stress is |
|
| 113:01 | to the bulb module is times the strain here. Now, engineers like |
|
| 113:08 | deal with a concept called Young's we don't use it very much in |
|
| 113:15 | , but the engineers like it and go back to our cylinder. And |
|
| 113:20 | we uni actually compress this, this an unconfined cylinder. So I can |
|
| 113:28 | it or I lengthen it, it matter if I compress it, I |
|
| 113:33 | it better if I lengthen it. make it a slimmer. But the |
|
| 113:38 | in length divided by the original length is called Young's modules. Now if |
|
| 113:49 | take this cylinder it's unconfined, I a uni axial stress to it. |
|
| 113:59 | will strain longitudinal li it will also trans firstly. And the ratio of |
|
| 114:07 | verse strain to longitudinal strain is called . The ratio of verticals or uh |
|
| 114:24 | stress to or longitudinal stress to longitudinal . These young's modules. So we |
|
| 114:42 | say that the Parsons ratio here, using sigma for persons ratio. That's |
|
| 114:49 | because we've been using sigma for uh . But oddly enough in geophysics we |
|
| 114:56 | to use sigma group with songs So it's the fractional change in with |
|
| 115:03 | by the fractional change of length and depending on how you choose your |
|
| 115:10 | You might have you might see this with the minus sign in front of |
|
| 115:14 | . I tend to ignore the minus . Is this this author did. |
|
| 115:19 | the practical limits of lessons ratio are zero and .5. In fact zero |
|
| 115:29 | not the theoretical limit. You could have a negative plaisance ratio. That |
|
| 115:35 | as I squeeze the rock, it thinner and they say that good french |
|
| 115:42 | Kirk corks have negative response ratio. never seen a rock with a negative |
|
| 115:49 | ratio. So for for all practical the smallest lessons ratio can be zero |
|
| 115:58 | the way. What does persons .5 correspond to? Uh huh. |
|
| 116:14 | uh fluids. Yes, that's And he could derive that actually if |
|
| 116:23 | take a fluid cylinder and you change length, keep the volume the same |
|
| 116:33 | see how much it's with its with . So I'm not going to give |
|
| 116:39 | to you as an exercise. But very doable. And what you'll find |
|
| 116:47 | that you'll approach a maximum value of . So that would be a |
|
| 116:58 | So by the way, uh in book they said persons ratio is usually |
|
| 117:03 | .25 for most rock materials. Well doesn't include the fluids but these are |
|
| 117:11 | minerals. And you can see that a variation but there is one very |
|
| 117:18 | significant anomalous mineral here. Oh, you see it? Yeah. |
|
| 117:33 | courts of all the minerals we tend encounter court says the lowest Hassan's |
|
| 117:42 | And so it's perhaps not surprising that rich rocks tend to have low Hassan's |
|
| 117:59 | . Okay, now we're going to a little bit different experiments. Instead |
|
| 118:09 | having an unconfined cylinder, we're going put a rigid constraints around it in |
|
| 118:15 | laboratory that might be a thick aluminum or something. Um So it at |
|
| 118:24 | theoretically. Now we're not going to it strange trans firstly. Right, |
|
| 118:29 | it can't change its with and we're to longitude only compress that rock. |
|
| 118:36 | the transfer strain is zero. Now measure uh the stress divided by the |
|
| 118:45 | strain and that is called the plane module is hem also called the constraint |
|
| 118:53 | . Us this guy is very, important to us because when I pass |
|
| 119:01 | plane compression all way through the any volumetric infant intestinal volumetric elements, |
|
| 119:13 | may want to strain trans firstly, remember I have a plane wave. |
|
| 119:19 | if I have an infinite intestinal element , that wants to strain trans |
|
| 119:25 | right next to it. I have international tell element which also wants to |
|
| 119:31 | trans firstly. And those lateral stresses cancel each other out. You see |
|
| 119:41 | So passing a plane wave through Iraq I'm in the middle of the plane |
|
| 119:47 | , it's like I have a rigid . So compression all waves involved. |
|
| 119:58 | plane wave module is this constrained modules by the way, happens to be |
|
| 120:05 | Plus 4/3 view. That's why that's module lists in the equation for p |
|
| 120:11 | philosophy. Is this also the youngest for young mothers do not have the |
|
| 120:20 | is unconstrained. That will that if unconstrained, that will give you a |
|
| 120:28 | larger change in length because it's freer change length by fattening. But now |
|
| 120:35 | can can fatten. So it's going resist your change in length more. |
|
| 120:43 | the plane wave modules should be bigger young's module. Now it turns out |
|
| 121:00 | if I'm in an icy tropic I can express all of the |
|
| 121:06 | all this stiffness coefficients or all the module. I I could think of |
|
| 121:12 | any kind of stress in any kind strength. I could express any of |
|
| 121:17 | elastic module i in terms of any other elastic module. So in this |
|
| 121:26 | lama is constant and the rigidity rigidity is uh uh an overturned, |
|
| 121:33 | there, I forget what that's Um but lambda and sometimes we use |
|
| 121:40 | in geophysics because velocity is K plus that's two lambda. Um here it's |
|
| 121:50 | in terms of Hassan's ratio and Young's . E often e issues for Young's |
|
| 121:58 | . Um but I can express any elastic module. Is the land that |
|
| 122:04 | be expressed in terms of K and for example. Um Any modules can |
|
| 122:10 | expressed in terms of the other, terms of two other elastic module. |
|
| 122:20 | this is one thing I'm not gonna you to memorize for the test. |
|
| 122:28 | These are equations expressing the different elastic . I and here the V |
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| 122:36 | I forget what that's called in Uh The V this is Poseidon's ratio |
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| 122:42 | . So, new rigidity am plane module lists. Hassan's ratio here, |
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| 122:52 | . Young's module is bulk module So you can express any one of |
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| 122:58 | in terms of two of the And here they are using you and |
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| 123:02 | if you express some of the Yeah, I've seen, I don't |
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| 123:11 | you uh, in terms of VPs well, which makes sense, we'll |
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| 123:16 | talking about that. But, so, uh, that's as far |
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| 123:22 | I want to go today. We'll it up Bright and early 8:30 AM |
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| 123:26 | morning and we'll continue talking about elastic . I I'll stop |
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