Indefinite Integral of Sine Function

Interactive Video

•

Mathematics

•

11th Grade - University

•

Practice Problem

•

Hard

•

CCSS

HSF.TF.C.9, HSF.TF.C.8

Standards-aligned

Lucas Foster

FREE Resource

Standards-aligned

CCSS.HSF.TF.C.9

CCSS.HSF.TF.C.8

The video tutorial demonstrates how to solve the indefinite integral of sine of x to the fourth power. It begins by discussing techniques for odd exponents using u-substitution and the Pythagorean Identity. For even exponents, the Double Angle Identity is applied. The tutorial walks through the algebraic manipulation and integration process, ultimately solving the integral and emphasizing the satisfaction of completing the problem.

10 questions

Show all answers

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is the first step when dealing with an odd exponent in trigonometric integrals?

Separate one of the trigonometric functions

Apply integration by parts

Use the Double Angle Identity

Directly integrate the function

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

Which identity is used to handle even exponents in trigonometric integrals?

Sum-to-Product Identity

Half Angle Identity

Double Angle Identity

Pythagorean Identity

What is the Double Angle Identity for sine squared of x?

1/2 times (1 + cosine of 2x)

1/2 times (1 - cosine of 2x)

1 - sine squared of x

cosine squared of x

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

After applying the Double Angle Identity for sine, what is the next step in transforming the integral?

Directly integrate the expression

Use integration by parts

Square the expression

Apply the Pythagorean Identity

What is the Double Angle Identity for cosine squared of 2x?

1/2 times (1 + cosine of 4x)

1/2 times (1 - cosine of 4x)

1 - cosine squared of 2x

sine squared of 2x

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

How is the integral simplified after applying the Double Angle Identity for cosine?

By using the Pythagorean Identity

By distributing the constants

By applying integration by parts

By directly integrating the expression

What is the purpose of rewriting 1/2 as four over eight in the integration process?

To use integration by parts

To prepare for u-substitution

To apply the Pythagorean Identity

To simplify the expression

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Indefinite Integral of Sine Function

10 questions

What is the first step when dealing with an odd exponent in trigonometric integrals?

Which identity is used to handle even exponents in trigonometric integrals?

What is the Double Angle Identity for sine squared of x?

After applying the Double Angle Identity for sine, what is the next step in transforming the integral?

What is the Double Angle Identity for cosine squared of 2x?

How is the integral simplified after applying the Double Angle Identity for cosine?

What is the purpose of rewriting 1/2 as four over eight in the integration process?

What is the final step in solving the indefinite integral?

What is added to the final result of an indefinite integral?

What is the overall feeling after solving the integral problem?

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