How do you find the average rate of change of the function $y= 4x^2$ over the interval [1, 5]?

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How do you find the average rate of change of the function $y= 4x^2$ over the interval [1, 5]?

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Answer 1 · 2016-08-23T21:04:42

24

Explanation:

the $color(blue)"average rate of change"$ of y = f(x)over an interval between 2 points (a ,f(a)) and (b ,f(b)) is the slope of the $color(blue)"secant line"$ connecting the 2 points.

To calculate the average rate of change between the 2 points.

$color(red)(|bar(ul(color(white)(a/a)color(black)((f(b)-f(a))/(b-a))color(white)(a/a)|)))$

$f(5)=4(5)^2=100" and " f(1)=4(1)^2=4$

The average rate of change between (1 ,4) and (5 ,100) is

$(100-4)/(5-1)=96/4=24$

This means that the average of the slopes of lines tangent to the graph of f(x) between (1 ,4) and (5 ,100) is 24.

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How do you find the average rate of change of the function $y= 4x^2$ over the interval [1, 5]?

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How do you find the average rate of change of the function y= 4x^2y= 4x^2 over the interval [1, 5]?

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Explanation:

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How do you find the average rate of change of the function $y= 4x^2$ over the interval [1, 5]?