5.6 Integrals involving exponential and logarithmic functions

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Integrate functions involving exponential functions.
Integrate functions involving logarithmic functions.

Exponential and logarithmic functions are used to model population growth, cell growth, and financial growth, as well as depreciation, radioactive decay, and resource consumption, to name only a few applications. In this section, we explore integration involving exponential and logarithmic functions.

Integrals of exponential functions

The exponential function is perhaps the most efficient function in terms of the operations of calculus. The exponential function, $y = e^{x},$ is its own derivative and its own integral.

Rule: integrals of exponential functions

Exponential functions can be integrated using the following formulas.

\begin{matrix} \int e^{x} d x & = & e^{x} + C \\ \int a^{x} d x & = & \frac{a^{x}}{ln a} + C \end{matrix}

Finding an antiderivative of an exponential function

Find the antiderivative of the exponential function e ^−
x .

Use substitution, setting $u = − x,$ and then $d u = −1 d x .$ Multiply the du equation by −1, so you now have $− d u = d x .$ Then,

\begin{matrix} \int e^{− x} d x & = − \int e^{u} d u \\ = − e^{u} + C \\ = − e^{− x} + C . \end{matrix}

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Find the antiderivative of the function using substitution: $x^{2} e^{−2 x^{3}} .$

$\int x^{2} e^{−2 x^{3}} d x = - \frac{1}{6} e^{−2 x^{3}} + C$

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A common mistake when dealing with exponential expressions is treating the exponent on e the same way we treat exponents in polynomial expressions. We cannot use the power rule for the exponent on e . This can be especially confusing when we have both exponentials and polynomials in the same expression, as in the previous checkpoint. In these cases, we should always double-check to make sure we’re using the right rules for the functions we’re integrating.

Square root of an exponential function

Find the antiderivative of the exponential function $e^{x} \sqrt{1 + e^{x}} .$

First rewrite the problem using a rational exponent:

\int e^{x} \sqrt{1 + e^{x}} d x = \int e^{x} {(1 + e^{x})}^{1 / 2} d x .

Using substitution, choose $u = 1 + e^{x} . u = 1 + e^{x} .$ Then, $d u = e^{x} d x .$ We have ( [link] )

\int e^{x} {(1 + e^{x})}^{1 / 2} d x = \int u^{1 / 2} d u .

Then

\int u^{1 / 2} d u = \frac{u^{3 / 2}}{3 / 2} + C = \frac{2}{3} u^{3 / 2} + C = \frac{2}{3} {(1 + e^{x})}^{3 / 2} + C .

A graph of the function f(x) = e^x * sqrt(1 + e^x), which is an increasing concave up curve, over [-3, 1]. It begins close to the x axis in quadrant two, crosses the y axis at (0, sqrt(2)), and continues to increase rapidly. — The graph shows an exponential function times the square root of an exponential function.

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Find the antiderivative of $e^{x} {(3 e^{x} - 2)}^{2} .$

$\int e^{x} {(3 e^{x} - 2)}^{2} d x = \frac{1}{9} {(3 e^{x} - 2)}^{3}$

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Using substitution with an exponential function

Use substitution to evaluate the indefinite integral $\int 3 x^{2} e^{2 x^{3}} d x .$

Here we choose to let u equal the expression in the exponent on e . Let $u = 2 x^{3}$ and $d u = 6 x^{2} d x . .$ Again, du is off by a constant multiplier; the original function contains a factor of 3 x ² , not 6 x ² . Multiply both sides of the equation by $\frac{1}{2}$ so that the integrand in u equals the integrand in x . Thus,

\int 3 x^{2} e^{2 x^{3}} d x = \frac{1}{2} \int e^{u} d u .

Integrate the expression in u and then substitute the original expression in x back into the u integral:

\frac{1}{2} \int e^{u} d u = \frac{1}{2} e^{u} + C = \frac{1}{2} e^{2 x^{3}} + C .

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Evaluate the indefinite integral $\int 2 x^{3} e^{x^{4}} d x .$

$\int 2 x^{3} e^{x^{4}} d x = \frac{1}{2} e^{x^{4}}$

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As mentioned at the beginning of this section, exponential functions are used in many real-life applications. The number e is often associated with compounded or accelerating growth, as we have seen in earlier sections about the derivative. Although the derivative represents a rate of change or a growth rate, the integral represents the total change or the total growth. Let’s look at an example in which integration of an exponential function solves a common business application.

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Source: OpenStax, Calculus volume 1. OpenStax CNX. Feb 05, 2016 Download for free at http://cnx.org/content/col11964/1.2

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