Chapter 6: Problem 81
Find the area of the region bounded by \(y=\operatorname{sech} x, x=1,\) and the unit circle.
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A diving pool that is 4 m deep and full of water has a viewing window on one of its vertical walls. Find the force on the following windows. The window is a circle, with a radius of \(0.5 \mathrm{m}\), tangent to the bottom of the pool.
Explain why or why not Determine whether the following statements are true and give an explanation or counterexample. Assume \(x>0\) and \(y>0\) a. \(\ln x y=\ln x+\ln y\) b. \(\ln 0=1\) c. \(\ln (x+y)=\ln x+\ln y\) d. \(2^{x}=e^{2 \ln x}\) e. The area under the curve \(y=1 / x\) and the \(x\) -axis on the interval \([1, e]\) is 1
Evaluate the following integrals. \(\int \frac{\cos \theta}{9-\sin ^{2} \theta} d \theta\)
There are several ways to express the indefinite integral of sech \(x\). a. Show that \(\int \operatorname{sech} x d x=\tan ^{-1}(\sinh x)+C\) (Theorem 9 ). (Hint: Write sech \(x=\frac{1}{\cosh x}=\frac{\cosh x}{\cosh ^{2} x}=\frac{\cosh x}{1+\sinh ^{2} x},\) and then make a change of variables.) b. Show that \(\int \operatorname{sech} x d x=\sin ^{-1}(\tanh x)+C .\) (Hint: Show that sech \(x=\frac{\operatorname{sech}^{2} x}{\sqrt{1-\tanh ^{2} x}}\) and then make a change of variables.) c. Verify that \(\int \operatorname{sech} x d x=2 \tan ^{-1}\left(e^{x}\right)+C\) by proving \(\frac{d}{d x}\left(2 \tan ^{-1}\left(e^{x}\right)\right)=\operatorname{sech} x\).
Properties of \(e^{x}\) Use the inverse relations between \(\ln x\) and \(e^{x}\) and the properties of \(\ln x\) to prove the following properties. a. \(e^{x-y}=\frac{e^{x}}{e^{y}}\) b. \(\left(e^{x}\right)^{y}=e^{x y}\)
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