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Homework: Week 7 Section 10.5 Score: 0 of10.5.23Use Implicit differentiation t0 find z' . Then evaluate z' at (5, 1).x-5=0Enter your answer in the answer ...

Question

Homework: Week 7 Section 10.5 Score: 0 of10.5.23Use Implicit differentiation t0 find z' . Then evaluate z' at (5, 1).x-5=0Enter your answer in the answer box = and then click Check Answer: part

Homework: Week 7 Section 10.5 Score: 0 of 10.5.23 Use Implicit differentiation t0 find z' . Then evaluate z' at (5, 1). x-5=0 Enter your answer in the answer box = and then click Check Answer: part



Answers

Find the first partial derivatives with respect to $x$ and with respect to $y .$ $$ z=3 x+5 y-1 $$

In the question we have to build with the partial derivative Act B zero comma one and find Dell said by de legs at zero comma one for that equals to eat with the power minus X cause off right now moving towards the solution Getting the derivative firstly del set by the legs will be Puerto del by the legs into e to the power minus X caused by which will be called toe cause Why Dell, by dialects into e to the power minus X, that is cause why into each to the power minus X minus one that will be quarto minus in minus E to the power minus X caused. Why now? Substituting by an X equals to zero and why it pulls to one toe Find the derivative at the mentioned point we will get is that except zero comma one is equals to e to the power minus off zero cause one which will be equal to minus off course at one on This will be the final answer for the given question. Thank you

In this exercise were given that f of X comma Waikoloa Z equals X cubed. Why's he squared? So we want to find this. Ah, partial. And we won't find the powerful of Z at 111 And this part of the it actually isn't just a partial taken once. We're taking it twice years. So we're taking two partials first with respect. Why then, with respect, X, we have a double partial derivative. So let's do our double purpose partial first, and I'm gonna do it. And I think there we go. So we have first just find it with respect to why, If we do this, we treat, uh, everything. Except for why I as a constant. So we're gonna keep our X cubed. You keep our Z squared And then for why? Taking that orbited We just get down to one. So we have SUV square, that's it. Now we want to take the, uh, differential. Effective X. So we take of X Cubed Z squared. Doing this we treat Z squared is a constant and under friendship with respect to X. So doing that, we are going to get Z squared just left right there and then multiplied by three x square. So we get three x squared Z squared. So like that over here three x squared C square. Now let's find that partial with respect to Z for full effort, Respect to partial of Z. If we do that, we have to treat everything except for C as a constants. We have X cubed. Why would take that out? Taking a derivative of the square we get to Z and now we want to plug in 111 Doing that, we get one times one times too because excess status one wise one and then two times e so two times one that gives us two. So the value are partial at 111 of strict Z is just too, and those are answers.

In this exercise were given that f of x comma y comma Z equals X cubed. Why Z squared? We want to find a double partial, and we want to find the value of the partial respect. Izzie at 111 So let's do that Double partial first try and take the double partial of F in the order that we're going to take is we're going to take with respect, toe. Why first? So this is gonna equal taking a partial with respect to X after you've taken the partial with respect to why and that's gonna be off X cubed Y z square. So what's inside of here? She just do that in a different color with red. What's inside of here is going to be that we're going to treat everything, except for why, as a constant. So we'll take that X cubed will take that. C Square didn't Constance than taking a dirt of why. We're just gonna get one. So we have excuse He squared is our partial with respect to why now we're gonna take the partial of this with respect. Two ex doing that. We're going to treat everything except for the extra mes as constant. So here we have Z squared and this is just going to be ticked as he spread out and differentiate three exits cubes. We get three x squared and we can say that our little partial equals three x squared Z squared. So that's our first answer. Now we want to also find the value of our partial respect. Izzie at 111 So let's do that. So French eight in some district disease so that we treat everything except for Z as a constant. So we'll take that x cubed and wine and then take the derivative of Z squared so that we get to Z. Now if we plug in 12 this 111 we're going to get one times 11 cubes. One Why just one times two times e, which is one and altogether that is going to give us too. So the value of our partial with respect to Z at 111 is just too in the value are our double partial end up being is three x squared z squared Unless I do it

I think even function is X Square. Plus. Is that off saying exercise it. It was a little So we need to find those that bag legs for you Express saying Off explains that big toe. Does it burn Dylex Bliss? Their dinner explains that in Do Explain does it but dialects because zero does it, but it'll x equals minus through its liver, but minus two works minus two whips OK minus two ELEX plus ways. It's clapped course off picks. Place it her but say explicit plus a place that course. So next venue to find. Be part slowly news to find no bagel like No, was that brutal baby get like no Beida lef picture Square place, they saying off X rays that because little by little elf, I feel just like saying exploits that into bulls at Bay Bill. By Plus, is there denial calls? Picks, buys it? I couldn't do it's there. Bless. Thankfully, Bill, is it? But no. By which is a serial for every urine. I really didn't like saying enough. Excellent. Is it because they explains that goes off exquisite into bulls? That but Bill what Because mine ethics left square cause off. Excellent. That from Boozer? No, like because my nothing is it square into both off excising do it every day saying off. Hey, Fraser, bless ex flies that Indu cools off explains it.


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