FAC1004 Tutorial 10 — Integration of Hyperbolic Functions
Practice problems on integration involving hyperbolic and inverse hyperbolic functions.
Topics Covered
- Integration using substitution
- Integrals leading to inverse hyperbolic functions
- Definite integrals with inverse hyperbolic functions
- Mixed integration techniques
Problem Set
1. Substitution Method
Find the following integrals using suitable substitution:
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$\int \frac{\sinh\left(\frac{1}{\sqrt{x}}\right)}{\sqrt{x}} , dx$
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$\int \frac{1}{x\sqrt{(\ln 2x)^2 + 9}} , dx$
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$\int \frac{e^x}{\sqrt{e^{2x} + 1}} , dx$
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$\int \frac{-\cosh x}{e^x \sqrt{2\tan^{-1}(e^x) - \ln(\sinh x)^2}} , dx$
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$\int \frac{x^2}{x^2 + 4} , dx$
2. Definite Integrals
Evaluate:
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$\int_4^6 \frac{dx}{\sqrt{x^2 - 9}}$
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$\int_3^6 \frac{dx}{\sqrt{x^2 + 9}}$
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$\int_0^{1/2} \frac{\sin^{-1}(2x)}{\sqrt{1-4x^2}} , dx$
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$\int_0^{1/3} \frac{\sinh^{-1}(3x)}{\sqrt{9x^2+1}} , dx$
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$\int_0^{1/2} \frac{\cosh^{-1}(2x)}{\sqrt{4x^2-1}} , dx$
Related
- FAC1004 - Advanced Mathematics II (Computing) — main course page
- Hyperbolic Functions — concept page
- FAC1004 L21-L22 — Integrals Involving Hyperbolic Functions — related lecture
Source File
TUTORIALS_SET_2526/FAC1004 Tutorial 10 25-26.pdf