   Chapter 11.4, Problem 60E Finite Mathematics and Applied Cal...

7th Edition
Stefan Waner + 1 other
ISBN: 9781337274203

Solutions

Chapter
Section Finite Mathematics and Applied Cal...

7th Edition
Stefan Waner + 1 other
ISBN: 9781337274203
Textbook Problem

In Exercises 51-66, compute the indicated derivative using the chain rule. [HINT: See Quick Example 3, 6, and 7.] x = 1 − t / 2 , y = 4 t − 1 ; d y d x

To determine

To calculate: The derivative dydx of x=1t2,y=4t1 using chain rule.

Explanation

Given Information:

The provided functions are x=1t2,y=4t1.

Formula used:

Derivative of function x and y using chain rule in differential notation is dydx=dydududx where y is the differentiable function of u and u is the differentiable function of x.

Calculation:

Consider the functions, x=1t2 and y=4t1

Apply the chain rule,

dydx=dydt

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