Integrate <mrow> 5 x 3 </mrow> </

tuehanhyd8ml

tuehanhyd8ml

Answered question

2022-05-11

Integrate 5 x 3 2 1 2 x 2 + 3 x 2 + cos ( 2 x ) 2 cos ( 3 x ) with respect to x.

Answer & Explanation

pomastitxz27r

pomastitxz27r

Beginner2022-05-12Added 16 answers

Split the single integral into multiple integrals.

5x32dx+-12x2dx+3x2dx+cos(2x)dx+-2cos(3x)dx

Since 52 is constant with respect to x, move 52 out of the integral.

52x3dx+-12x2dx+3x2dx+cos(2x)dx+-2cos(3x)dx

By the Power Rule, the integral of x3 with respect to x is 14x4.

52(14x4+C)+-12x2dx+3x2dx+cos(2x)dx+-2cos(3x)dx

Since -1 is constant with respect to x, move -1 out of the integral.

52(14x4+C)-12x2dx+3x2dx+cos(2x)dx+-2cos(3x)dx

Since 12 is constant with respect to x, move 12 out of the integral.

52(14x4+C)-(121x2dx)+3x2dx+cos(2x)dx+-2cos(3x)dx

Apply basic rules of exponents.

52(14x4+C)-12x-2dx+3x2dx+cos(2x)dx+-2cos(3x)dx

By the Power Rule, the integral of x-2 with respect to x is -x-1.

52(14x4+C)-12(-x-1+C)+3x2dx+cos(2x)dx+-2cos(3x)dx

Since 32 is constant with respect to x, move 32 out of the integral.

52(14x4+C)-12(-x-1+C)+32xdx+cos(2x)dx+-2cos(3x)dx

By the Power Rule, the integral of x with respect to x is 12x2.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+cos(2x)dx+-2cos(3x)dx

Let u1=2x. Then du1=2dx, so 12du1=dx. Rewrite using u1 and du1.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+cos(u1)12du1+-2cos(3x)dx

Combine cos(u1) and 12.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+cos(u1)2du1+-2cos(3x)dx

Since 12 is constant with respect to u1, move 12 out of the integral.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12cos(u1)du1+-2cos(3x)dx

The integral of cos(u1) with respect to u1 is sin(u1).

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12(sin(u1)+C)+-2cos(3x)dx

Since -2 is constant with respect to x, move -2 out of the integral.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12(sin(u1)+C)-2cos(3x)dx

Let u2=3x. Then du2=3dx, so 13du2=dx. Rewrite using u2 and du2.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12(sin(u1)+C)-2cos(u2)13du2

Combine cos(u2) and 13.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12(sin(u1)+C)-2cos(u2)3du2

Since 13 is constant with respect to u2, move 13 out of the integral.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12(sin(u1)+C)-2(13cos(u2)du2)

Simplify.

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12(sin(u1)+C)-23cos(u2)du2

The integral of cos(u2) with respect to u2 is sin(u2).

52(14x4+C)-12(-x-1+C)+32(12x2+C)+12(sin(u1)+C)-23(sin(u2)+C)

Simplify.

5x48+12x+3x24+sin(u1)2-23sin(u2)+C

Substitute back in for each integration substitution variable.

5x48+12x+3x24+sin(2x)2-23sin(3x)+C

Reorder terms.

58x4+12x+143x2+12sin(2x)-23sin(3x)+C

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