Tutorial to find integrals involving the product of sin(x) or cos(x) with exponential functions. Exercises with answers are at the bottom of the page.
In what follows, C is the constant of integration.
\int \sin(x)e^x dx
Let u = sin(x) and dv/dx = ex and then use the integration by parts as follows
\int \sin(x)e^x dx = \sin(x) e^x - \int \cos(x)e^x dx
We apply the integration by parts to the term ∫ cos(x)ex dx in the expression above, hence
\int sin(x) e^x dx = \sin(x) e^x - ( \cos(x)e^x - \int - \sin(x) e^x dx )
Simplify the above and rewrite as
\int sin(x) e^x dx = \sin(x) e^x - \cos(x)e^x - \int \sin(x) e^x dx
Note that the term on the right is the integral we are trying to evaluate, hence the above may be written as follows
2 \int sin(x) e^x dx = \sin(x) e^x - \cos(x)e^x
Hence the integral is given by
\int sin(x) e^x dx = \dfrac{1}{2} e^x ( \sin(x) - \cos(x))
Solution to Example 2: Substitution: Let u = cos(2x) and dv/dx = ex and apply the integration by parts. ∫cos(2x)ex dx = cos(2x)ex -∫-2sin(2x)ex dx = cos(2x)ex +∫2sin(2x)ex dx Apply integration by parts to the term on the right = cos(2x)ex + 2{sin(2x)ex - 2∫cos(2x)ex dx } = cos(2x)ex + 2sin(2x)ex - 4∫cos(2x)ex dx Note that the term on the right is related to the integral we are trying to evaluate, we can write that 5∫cos(2x)ex dx = cos(2x)ex + 2sin(2x)ex The given integral is ∫cos(2x)ex dx = (1/5)ex {cos(2x) + 2sin(2x)} + C
Example 3: Evaluate the integral
Solution to Example 3: Substitution: Let u = sin(3x + 2) and dv/dx = e3x and apply the integration by parts twice. ∫sin(3x + 2) e3x dx = sin(3x + 2) (1/3)e3x -∫cos(3x + 2)e3x dx = (1/3) sin(3x + 2)e3x - {cos(3x + 2)(1/3)e3x + ∫sin(3x + 2) e3xdx} Note that the term on the right is the integral to be evaluated, hence ∫sin(3x + 2) e3x dx = (1/6) e3x { sin(3x + 2) - cos(3x + 2) } + C
Example 4: Evaluate the integral
Solution to Example 4: Substitution: Let u = cos(4x) and dv/dx = e2x + 5 and apply the integration by parts twice. ∫cos(4x) e2x + 5 dx = cos(4x) (1/2) e2x + 5 + 2∫ sin(4x) e2x + 5 dx = cos(4x) (1/2) e2x + 5 + 2{ sin(4x) (1/2)e2x + 5 - 2∫cos(4x)e2x + 5 dx } The term on the right is the integral to be evaluated, hence ∫cos(4x) e2x + 5 dx = (1/10)e2x + 5 {cos(4x) + 2 sin(4x)} + C
Exercises: Evaluate the following integrals.
|
