Use the Differentiation Formulas and Rules of Derivatives to find the derivatives of the following functions. h(y)=2y^{-4}-7y^{-3}+4y^{-2}+\frac{11}{y} h'(y)=

Caelan

Caelan

Answered question

2021-05-17

Use the Differentiation Formulas and Rules of Derivatives to find the derivatives of the following functions.
h(y)=2y47y3+4y2+11y
h(y)=

Answer & Explanation

Sadie Eaton

Sadie Eaton

Skilled2021-05-18Added 104 answers

Step 1: Consider the following
Function, h(y)=2y47y3+4y2+11y
Step 2: The objective
is to determine the given function's derivative.
Step 3: Calculation
We will use the rule, d dx (xn)=nxn1 to find the derivative as follows,
h(y)=2d dy (y4)7d dy (y3)+4d dy (y2)+11d dy (y1)
=2(4)y417(3)y31+4(2)y21+11(1)y11
=8y5+21y48y311y2
=8y5+21y48y311y2
Step 4: Conclusion
Consequently, we can say that  h(y)=8y5+21y48y311y2.

Jeffrey Jordon

Jeffrey Jordon

Expert2021-11-20Added 2605 answers

Answer is given below (on video)

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