Chapter 1: Problem 40
change each repeating decimal to a ratio of two integers. $$ \text { 3.929292... } $$
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Solve for \(x .\) Hint: \(\log _{a} b=c \Leftrightarrow a^{c}=b\). $$ \log _{5} x=2 $$
Starting at noon, airplane A flies due north at 400 miles per hour. Starting 1
hour later, airplane \(\mathrm{B}\) flies due east at 300 miles per hour.
Neglecting the curvature of the Earth and assuming that they fly at the same
altitude, find a formula for \(D(t)\), the distance between the two airplanes
\(t\) hours after noon. Hint:
There will be two formulas for \(D(t)\), one if \(0
Use this result to find the distance from the given point to the given line. (4,-1) ; 2 x-2 y+4=0
The magnitude \(M\) of an earthquake on the Richter scale is $$ M=0.67 \log _{10}(0.37 E)+1.46 $$ where \(E\) is the energy of the earthquake in kilowatt-hours. Find the energy of an earthquake of magnitude \(7 .\) Of magnitude 8 .
In Problems \(31-44\), find a formula for \(f^{-1}(x)\) and then verify that \(f^{-1}(f(x))=x\) and \(f\left(f^{-1}(x)\right)=x\) $$ f(x)=x+1 $$
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