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Question 6 (5 points) Match Iha SnRNP (snurp) wilh it8 function In the spllcing ol tna oukaryouic primary transcnpt (nnRNN) An answor cn only bo used onca: (5 polnt...

Question

Question 6 (5 points) Match Iha SnRNP (snurp) wilh it8 function In the spllcing ol tna oukaryouic primary transcnpt (nnRNN) An answor cn only bo used onca: (5 polnts; Polnt oach)Binds t0 and aoquoalors UB until pplicing hao commoncedUiBugo palrg wIlh soquoncod nround Iho branch polntU2Tha frat #nRNP to bina Iha D" spllca eil0U4Baao puira wiln Iho laet Dano 0t uon and Iha rat basa ol ozonUSU6Tha ducond AnRNP t0 bind o ppllco ala

Question 6 (5 points) Match Iha SnRNP (snurp) wilh it8 function In the spllcing ol tna oukaryouic primary transcnpt (nnRNN) An answor cn only bo used onca: (5 polnts; Polnt oach) Binds t0 and aoquoalors UB until pplicing hao commonced Ui Bugo palrg wIlh soquoncod nround Iho branch polnt U2 Tha frat #nRNP to bina Iha D" spllca eil0 U4 Baao puira wiln Iho laet Dano 0t uon and Iha rat basa ol ozon US U6 Tha ducond AnRNP t0 bind o ppllco ala



Answers

Solve each problem using the idea of labeling. Determining Chords How many distinct chords (line segments with endpoints on the circle) are determined by three points lying on a circle? By four points? By five points? By $n$ points?

What is something accurate that we can say about the T B X five gene? Yeah, something that is accurate, we can say is T B x five T B x four an anti TB x 45 have very similar coding regions.

We need to match the variables A. B c D E F with the names of one through seven. So we have arc Q. Oops, arc Q two, R two S. So that goes from one side of the circle, through the other side of the circle, and Qs passes through the center soak us is our diameter. So that Q two R two S. That's an art and that's half a circle. So that is our semicircle segment Q. S. So Q. S. Goes from here through the center to the other side of the circle and that's a segment that's our diameter are to Q two S. Ark our Q two S. That goes past half a circle, So it's bigger than 180. So this is a major arc. R R. S. Just goes from R. Two S. So that's less than 1 80. So that's a minor arc segment. R. S. Goes from one side of the circle to the other side of the circle but does not pass to the origin or through the center. Sorry, that's a cord. Then we have angle P. R. P. Q. So R p. Q. So it goes to the center of the circle, which is P. So that's a central angle. And then we have, okay, segment PS. Soapy starts at the center, goes to the side of the circle, that's our radius.

The Harakah theory, Um, looks a bit like a horse. And for good reason. It was an evolutionary ancestor of the modern horse going back a long time deep into fossil history. So right off, we can guess, Oh, fossil history. That probably means paleontology. Hey, Leo. Old paleontology is the study of old bones, tracks, traces and other things. So that's a good, good guess right there. Let's be more systematic about it. Uh huh. This is what a modern horse's hoof might look like if you drew drew it with the skill that I lack. Uh, Horak. Ethereum also had two additional toe bones that were up near what would essentially be the horses wrist that are the remnants of what used to be functioning toes and are in the process of evolutionarily disappeared. So it's true that natural selection is occurring over time and that these bones are disappearing, probably due to selection. But on the exam, every answer, every question has won best answer. Even though natural selection is kind of occurring somewhere in this process, it's nowhere near the best answer because the question doesn't talk anywhere about how the selection is occurring or why or what's going on? Just that at some point in evolutionary history, it must have happened. Comparative anatomy. Another. Okay, it's not a bad answer, but we're sort of, I guess, comparing the Iraqi theory into a horse but not comparing how the bones worked or lie. And it's just not a very appealing answer choice, because that's not what the question is really getting at. It's talking about the history showing Barack Ethereum is worth comparing to the horse, and that's a paleontology aspect of it. Bio geography, where there's no geographic or a location based aspect, so that really doesn't make much sense as an answer. So even though several of these answers could start being made to work, there is one that is really right on target and doesn't have any extraneous information. Include

Okay, so now what we're gonna do is we need to use the chain rule here for our functions E which are function this is a function of X. And Y. And X and Y are both function of T. We want to use the chain rule to find how quickly Z changes with respect to time as time changes, how much this dizzy change. And in order to do this we have to use the chain rule. And why is that? The case was a reminder. Z is both a function of X and Y. But X and Y are both functions of T. So we can't just take the partial dividend X and partial different Hawaiian is at and together we have to have to also have to consider that X and T. Are both, you know um importance there. Um And so in order to do this, we then have to write our partial eventually our chain rule formula. And how do we do that? Well, we see that Z is a function of X. We have to compute the partial derivative of Z with respect to X, but then X is a function of T. And so because of that, we have to multiply it by dx DT. And as a kind of as a reminder to make sure that you're doing this correctly. These should somewhat cancel each other out. You see the partial derivative of X and the D a kind of cancel each other out and we get DZ DT in a certain way. So that's how this kind of works. And similarly we now add the partial derivative of Z. With respect to why times the party of why just the derivative of Y. With respect to T. As a reminder we use D. When we only have a function of one variable. Use the partial derivative. Scientists know when we have functions of more than two variables. And so because of this, we just now completely partial interests of all of this and we go from there. So the partial different Z with respect to X is going to be the river of co sign of this function is going to sign of dysfunction. Multiply by the derivative of the inside, which is going to be just one, right? Because the derivative co sign of X plus four Y. It's going to be one outside um negative negative sign, sorry, negative sign. Right? And we multiply this by dx DT and this is a polynomial. This just comes out to be 20 T. To the third. And then we add this to DZ Dy And this this function now is negative sign X plus four Y. But we have to multiply it by using the actual chain rule bag in Calcutta one chain rule because the derivative of the inside now is four, right? Because it's sign negative sine of X plus four Y. Multiply by the derivative of four wine, which is going to just before in this case. And then we multiply this by Dy DT, which is just one over T. So the derivative of that is negative one over T square. And so because of this, we see that we can symbolize maybe a little bit by factoring out a negative sign X plus four Y. And we see we have a negative sine of X plus four Y. Multiplied by 20 T. To the third minus one over T squared if you wanted to as well, you could just make this a plus sign but it's not really necessary. You can make this a plus sign is a minus sign. This could be your answer if if you don't really care about what X and Y are in terms of teeth, but we usually do. And so what we'll do is to kind of simplify our answer fully. We let X be equal to five T. To the fourth as is up here and we'll let y be equal to one over T. This is really signed of five T to the 4th Plus four, divided by T. Multiplied by one over T squared minus 20 T. To the third. And so this is the derivative of our function Z. With respect to time. By using the chain rule


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