Textbook Question
37–56. Integrals Evaluate each integral.
∫ cosh 2x dx
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11. Integrals of Inverse, Exponential, & Logarithmic Functions
Integrals Involving Inverse Trigonometric Functions
2:37 minutesProblem 7.3.44
Textbook Question
37–56. Integrals Evaluate each integral.
∫₀⁴ sech²√x / √x dx
Verified step by step guidance1
Recognize that the integral is \( \int_0^4 \frac{\text{sech}^2(\sqrt{x})}{\sqrt{x}} \, dx \). The integrand involves \( \sqrt{x} \) both inside the hyperbolic secant squared function and in the denominator, suggesting a substitution involving \( \sqrt{x} \).
Make the substitution \( t = \sqrt{x} \), which implies \( x = t^2 \). Then, differentiate to find \( dx \) in terms of \( dt \): \( dx = 2t \, dt \).
Rewrite the integral in terms of \( t \): replace \( \sqrt{x} \) with \( t \), and \( dx \) with \( 2t \, dt \). The integral becomes \( \int_{t=0}^{t=2} \frac{\text{sech}^2(t)}{t} \cdot 2t \, dt \). Notice that the \( t \) in the denominator and numerator will cancel out.
Simplify the integral to \( \int_0^2 2 \text{sech}^2(t) \, dt \). This is now a standard integral involving \( \text{sech}^2(t) \), which is the derivative of \( \tanh(t) \).
Integrate \( 2 \text{sech}^2(t) \) with respect to \( t \) to get \( 2 \tanh(t) + C \), then apply the limits from 0 to 2 to express the definite integral.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Integration by Substitution
Integration by substitution is a technique used to simplify integrals by changing variables. It involves substituting a part of the integral with a new variable to transform the integral into a more manageable form. This method is especially useful when the integral contains composite functions, such as √x inside another function.
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Hyperbolic Secant Function (sech)
The hyperbolic secant function, sech(x), is defined as 1/cosh(x), where cosh(x) is the hyperbolic cosine. Its square, sech²(x), often appears in integrals related to hyperbolic functions. Understanding its properties and derivatives helps in recognizing integrals that can be simplified using known formulas.
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Definite Integrals and Limits of Integration
Definite integrals calculate the net area under a curve between two specific points, called limits of integration. Evaluating a definite integral involves finding the antiderivative and then applying the Fundamental Theorem of Calculus to compute the difference at the upper and lower limits.
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