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Chapter 1: Problem 43
\text { Does }(3,9) \text { lie above or below the line } y=3 x-1 ?
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The center of the circumscribed circle of a triangle lies on the perpendicular bisectors of the sides. Use this fact to find the center of the circle that circumscribes the triangle with vertices \((0,4),(2,0)\), and \((4,6)\)
What relationship between \(a, b\), and \(c\) must hold if \(x^{2}+a x+y^{2}+b y+c=0\) is the equation of a circle?
Consider a circle \(C\) and a point \(P\) exterior to the circle. Let line segment \(P T\) be tangent to \(C\) at \(T\), and let the line through \(P\) and the center of \(C\) intersect \(C\) at \(M\) and \(N\). Show that \((P M)(P N)=(P T)^{2} .\)
In Problems 45-48, find the coordinates of the point of intersection. Then write an equation for the line through that point perpendicular to the line given first. \(3 x-4 y=5\) \(2 x+3 y=9\)
In the equally tempered scale to which keyed instruments have been tuned since the days of J.S. Bach \((1685-1750)\), the frequencies of successive notes \(\mathrm{C}, \mathrm{C} \\#, \mathrm{D}, \mathrm{D} \\#, \mathrm{E}, \mathrm{F}, \mathrm{F} \\#, \mathrm{G}, \mathrm{G}\|, \mathrm{A}, \mathrm{A}\|, \mathrm{B}\) C form a geometric sequence (progression), with \(\bar{C}\) having twice the frequency of \(\mathrm{C}\) (C# is read \(\mathrm{C}\) sharp and \(\overline{\mathrm{C}}\) indicates one octave above \(\mathrm{C}\) ). What is the ratio \(r\) between the frequencies of successive notes? If the frequency of \(A\) is 440 , find the frequency of \(\bar{C}\).
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