Calculate the derivative of the following functions.
y =...

Question

Calculate the derivative of the following functions.

y = (e^x / x+1)⁸

Accepted Answer

Welcome back, everyone. In this problem, we want to find the derivative of the function Y equals E X divided by X + 3 all raised to the 10th. A says it's 10e raised to the pore of 10X multiplied by X + 2 all divided by X + 3 to 11th. B says it's 10E to the 10X multiplied by X + 2 divided by X + 310. C says it's 10 E to the pore of 9 X multiplied by X + 2 divided by X + 3 to 11th and the D says it's 10 E to the pore of 9 X multiplied by X + 2 divided by X + 3 to 10th. Now, when we look at our function, we can tell that it's a composite function. So to differentiate a composite function, we can use the chain rule. Recall that the chain rule tells us that if we have a function Y, composite function that's written as U to the power of N, OK, then the derivative of Y with respect to X, OK, is going to be equal to DIDU. The derivative of y with respect to you multiplied by DUD X, the derivative of you with respect to X. Of course, where you is a function of X, OK. Now, Here, we know that if we let you be equal to E X divided by X + 3, OK. Then Y is going to be equal to you to 10th so we can differentiatey with respect to you, then differentiate you with respect to X and thus use that to solve for the derivative of y with respect to X. So let's go ahead and do that first, let's start with D I D U, OK. Now in this case, then we know that DUIDU. By the poor rule is going to be equal to 10 multiplied by you to the poor of 9. And again, we know that U is EX multiplied by divided by X + 3. So that's 10 multiplied by E X divided by X + 3 raised to the power of 9. So we have DYDU. Next, let's differentiate you with respect to X. Now notice that you is a cautioned, OK? And as I cautioned. Given you Equal to e x divided by X + 3. Then to differentiate the quotient we can differentiate the numerator and differentiate the denominator and then use it in the quotient rule of differentiation, OK, meaning. That if we have a function, of course, let's just ignore the values of you for no uh because we're talking about um a general rule. So if we have a function Y that's equal to you divided by V, then the derivative of Y with respect to X according to the quotient rule is gonna be equal to VDUDX minus UDVDX. Divided by the squared, OK. So now, if we use this rule, OK, to differentiate uh E to the X divided by X + 3, then this would imply that the, well, first, We know Now this would mean DUD X would be equal to first the denominator X + 3 multiplied by the derivative of the numerator that's e X minus the numerator that's e X multiplied by the derivative of the denominator, which would be 1, OK? And now all of that is being divided by the denominator squared, so that's X + 3 all squared. We can simplify this a bit further, OK. Then I rewrite this as EX multiplied by X plus 3 multiplied by E X minus E X, OK. Still being divided by X + 3 are squad. And then 3 E X minus E X is going to be equal to 2 X. So EX multiplied by X plus 2 E X is, sorry, divided by X + 3 squared is the derivative of U with respect to X. Now that we have that we can apply the chain rule. So by the chain rule then do you ID X. Is going to be equal to 10 multiplied by e to the X. Divided by X + 3. Rais to the power of 9, multiplied by E X, multiplied by X + 2 E X, OK, divided by X + 3 squared. And now when we expand here. E X rays to the power of 9 E equals E 9X. So that's 10 E 9X multiplied by EX multiplied by X plus 2 E X. OK. And now, we're gonna have X + 3 raised to the 9th, multiplied by X + 3 squared, which is going to leave us with X + 3 raised to the 11th power. We can even simplify this some more because we can factor out E to the X in our numerator, OK? And no. When we do that, OK, then we're gonna have 10 E 9 X multiplied by E X, which is gonna be equal to, which is gonna raise or E 9 X multiplied by E X equals e to the pore of 10 X and that is being multiplied by X + 2 all divided by X + 3 raised to the 11th po. Thus, this is going to be the derivative of Y with respect to X. When we look back on our answer choices, that means A is the correct answer. Thanks a lot for watching everyone. I hope this video helped.

Calculate the derivative of the following functions.
y = (e^x / x+1)⁸

Key Concepts

Derivative

Chain Rule

Quotient Rule

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