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Chapter 4: Problem 87
Let \(x>0\) and \(b>0 .\) Show that \(\int_{-b}^{b} e^{x t} d t=\frac{2 \sinh b x}{x}\).
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Use the Second Fundamental Theorem of Calculus to find \(F^{\prime}(x)\). $$ F(x)=\int_{-1}^{x} \sqrt{t^{4}+1} d t $$
Find the integral. \(\int \frac{2}{x \sqrt{1+4 x^{2}}} d x\)
Consider the integral \(\int \frac{1}{\sqrt{6 x-x^{2}}} d x\). (a) Find the integral by completing the square of the radicand. (b) Find the integral by making the substitution \(u=\sqrt{x}\). (c) The antiderivatives in parts (a) and (b) appear to be significantly different. Use a graphing utility to graph each antiderivative in the same viewing window and determine the relationship between them. Find the domain of each.
Solve the differential equation. \(\frac{d y}{d x}=\frac{x^{3}-21 x}{5+4 x-x^{2}}\)
Show that if \(f\) is continuous on the entire real number line, then \(\int_{a}^{b} f(x+h) d x=\int_{a+h}^{b+h} f(x) d x\)
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