1 Answer

Mrsus · Answer 1 · 2022-07-27T05:05:02+0000

Answer:

g(x) = 4x² - x

General Formulas and Concepts:

Algebra II

Functions

Calculus

Integration

Integration Rule [Reverse Power Rule]:
$\displaystyle \int {x^n} \, dx = (x^(n + 1))/(n + 1) + C$

Integration Property [Multiplied Constant]:
$\displaystyle \int {cf(x)} \, dx = c \int {f(x)} \, dx$

Integration Property [Addition/Subtraction]:
$\displaystyle \int {[f(x) \pm g(x)]} \, dx = \int {f(x)} \, dx \pm \int {g(x)} \, dx$

Explanation:

*Note:

Integrating a piecewise function requires you to integrate both parts.

Step 1: Define

Identify.

$\displaystyle f(x) = \left \{ {{8x - 1 ,\ x \leq 4} \atop {31 ,\ x \geq 4}} \right.$

$\displaystyle \int {f(x)} \, dx = \left \{ {{g(x) + C ,\ x \leq 4} \atop {31x + C ,\ x \geq 4}} \right.$

Step 2: Find function g(x)

We can see that the 2nd part of the piecewise function already has been integrated:

[Integral] Set up:
$\displaystyle \int {f(x)} \, dx ,\ x \geq 4 = \int {31} \, dx ,\ x \geq 4$
[Integral] Rewrite [Integration Property - Multiplied Constant]:
$\displaystyle \int {f(x)} \, dx ,\ x \geq 4 = 31 \int {} \, dx ,\ x \geq 4$
[Integral] Integrate [Integration Rule - Reverse Power Rule]:
$\displaystyle \int {f(x)} \, dx ,\ x \geq 4 = 31x + C ,\ x \geq 4$

To find function g(x), we simply have the same setup:

[Integral] Set up:
$\displaystyle \int {f(x)} \, dx ,\ x \leq 4 = \int {8x - 1} \, dx ,\ x \leq 4$
[Integral] Rewrite [Integration Rule - Addition/Subtraction]:
$\displaystyle \int {f(x)} \, dx ,\ x \leq 4 = \int {8x} \, dx - \int {1} \, dx ,\ x \leq 4$
[Integrals] Rewrite [Integration Property - Multiplied Constant]:
$\displaystyle \int {f(x)} \, dx ,\ x \leq 4 = 8 \int {x} \, dx - \int {} \, dx ,\ x \leq 4$
[Integrals] Integrate [Integration Rule - Reverse Power Rule]:
$\displaystyle \int {f(x)} \, dx ,\ x \leq 4 = 8 \bigg( (x^2)/(2) \bigg) - x + C ,\ x \leq 4$
Simplify:
$\displaystyle \int {f(x)} \, dx ,\ x \leq 4 = 4x^2 - x + C ,\ x \leq 4$
Redefine:
$\displaystyle g(x) = 4x^2 - x + C ,\ x \leq 4$

The integration constant C is already included in the answer, so our answer is g(x) = 4x² - x.

Topic: AP Calculus AB/BC (Calculus I/I + II)

Unit: Integration (Applications)

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