10th Edition

ISBN: 9781305860919

Textbook Problem

Applying the General Power Rule In Exercises 9-34, find the indefinite integral. Check your result by differentiating. See Examples 1, 2, 3, and 5.

∫ ( 7 - 2 x ) 2 ( - 2 ) d x

To determine

To calculate: The value of the provided indefinite integral ∫(7−2x)2(−2)dx.

Given Information:

The provided indefinite integral is ∫(7−2x)2(−2)dx.

Formula Used:

According to the general power rule for integration,

If u is a differentiable function of x, then

∫undu=un+1n+1+C,

Calculation:

Consider the indefinite integral say I,

I=∫(7−2x)2(−2)dx

7−2x=u … (1)

Differentiate the above equation with respect to x;

ddx(7−2x)=dudxddx(7)−ddx(2x)=dudx(−2)=dudx

(−2)dx=du … (2)

Substitute the values of 7−2x and (−2)dx from equations (1) and (2) respectively in the provided integral;

Check out a sample textbook solution.

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MathCalculusCalculus: An Applied Approach (MindTap Course List)10th Edition

Calculus: An Applied Approach (Min...

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Calculus: An Applied Approach (Min...

Applying the General Power Rule In Exercises 9-34, find the indefinite integral. Check your result by differentiating. See Examples 1, 2, 3, and 5. ∫ ( 7 - 2 x ) 2 ( - 2 ) d x

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Math
Calculus Calculus: An Applied Approach (MindTap Course List)10th Edition

Applying the General Power Rule In Exercises 9-34, find the indefinite integral. Check your result by differentiating. See Examples 1, 2, 3, and 5.

∫ ( 7 - 2 x ) 2 ( - 2 ) d x