Question

asked Apr 18, 2021 154k views

1 Answer

Vega · Answer 1 · 2021-04-21T16:20:54+0000

Answer: See below

Explanation:

A.

Let's split the integral into two parts, by the Sum Rule.

$\int\limits {x-4x^3} \, dx$ [split into 2 integrals]

$\int\limits {x} \, dx -\int\limits {4x^3} \, dx$ [solve integral for each part]

(1)/(2) x^2-x^4+C [Remember, we need to add C for constant]

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B.

$\int\limits {(1+x)/(√(x) ) } \, dx$ [expand into 2 integrals]

$\int\limits {(1)/(√(x) ) } \, dx +\int\limits {(x)/(√(x) ) } \, dx$ [simplify second integral]

$\int\limits {(1)/(√(x) ) } \, dx +\int\limits {√(x) } \, dx$ [solve integral for each part]

2√(x) +(2)/(3)x^3^/^2+C

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C.

$\int\limits^4_0 {z(z^1^/^2-z^-^1^/^2)} \, dz$ [distribute]

$\int\limits^4_0 {z^3^/^2-z^1^/^2} \, dz$ [split into 2 integrals]

$\int\limits^4_0 {z^3^/^2} \, dz -\int\limits^4_0 {z^1^/^2} \, dxz$ [solve integral for each part]

(64)/(5) -(16)/(3) [solve]

(112)/(15)

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D. *Note: I can't put -1 for the interval, but know that the 1 on the bottom is supposed to be -1.

$\int\limits^1_1 {(1+u)(1-u)} \, du$ [expand]

$\int\limits^1_1 {1-u^2} \, du$ [split into 2 integrals]

$\int\limits^1_1 {1} \, du-\int\limits^1_1 {u^2} \, du$ [solve integral for each part]

2-(2)/(3) [solve]

(4)/(3)

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