How do you find the instantaneous rate of change of

Lymnmeatlypamgfm

Lymnmeatlypamgfm

Answered question

2022-04-22

How do you find the instantaneous rate of change of y=x24x at x=1 by using the limit method?

Answer & Explanation

Ronnie Porter

Ronnie Porter

Beginner2022-04-23Added 12 answers

Explanation:
The instantaneous rate of change of y=f(x)=x24x at x=1 is the derivative f'(1).
Using the definition of the derivative in terms of limits, we have:
f(1)=limh0f(1+h)f(1)h
=limh0(1+h)24(1+h)(14)h
=limh01+2h+h244h+3h
=limh0h(h2)h=limh0(h2)=02=2
obettyQuokeperg6

obettyQuokeperg6

Beginner2022-04-24Added 14 answers

This means that we need to find the derivative of x24x and evaluate it at x=1.
So, find the derivative of the function: ddx(x24x)=2(x2)
Evaluate the derivative at x=1.
(ddx(x24x))|{(x=1)}=(2(x2))|(x=1)=2
Therefore, the instantaneous rate of change of f(x)=x24x at x=1 is -2.

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