Integrals Involving sin(x) and cos(x) with Odd Power
Tutorial to find integrals involving the product of powers of sin(x) and cos(x) with one of the two having an odd power. Exercises with answers are at the bottom of the page.
Examples with Detailed solutionsIn what follows, C is the constant of integration.
Example 1Evaluate the integral![]() Solution to Example 1: The main idea is to rewrite the integral writing the term with the odd power as the product of a term with power 1 and a term with an even power. Example: sin3(x) = sin2(x) sin(x). Hence the given integral may be written as follows: ![]() ![]() We now use the identity sin2(x) = 1 - cos2(x) and rewrite the given integral as follows: ![]() ![]() We now let u = cos(x), hence du/dx = -sin(x) or -du = sin(x)dx and substitute in the given integral to obtain ![]() ![]() Expand and calculate the integral on the right ![]() ![]() = (1/5)u5 - (1/3)u3 + C Substitute u by cos(x) to obtain ![]()
Example 2Evaluate the integral![]() Solution to Example 2: Rewrite cos5(x) as follows cos5(x) = cos4(x) cos(x). Hence the given integral may be written as follows: ![]() ![]() We now use the identity cos2(x) = 1 - sin2(x) to rewrite cos4(x) in terms of power of sin(x) and rewrite the given integral as follows: ![]() ![]() We now let u = sin(x), hence du/dx = cos(x) or du = cos(x)dx and substitute in the given integral to obtain ![]() ![]() Expand and calculate the integral on the right ![]() ![]() = ![]() = (1/17)u17 - (2/15)u15 + (1/13)u13 + C Substitute u by sin(x) to obtain ![]()
ExercisesEvaluate the following integrals.1. ![]() 2. ![]() Answers to Above Exercises1. - (1/5)sin5(x) + (1/3)sin3(x)2. (1/17)cos17(x) - (1/15)cos15(x) More references and Linksintegrals and their applications in calculus. |