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01 Jun 2020, 04:08
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[GMAT math practice question]
The intersections of the graph \(y = x^2 + ax + 4\) and \(y = 3x + b\) are two points \(P\) and \(Q\). The length of \(PQ\) is \(4\sqrt{10}.\) What is the maximum of \(b\)?
A. \(5\)
B. \(6\)
C. \(7\)
D. \(8 \)
E. \(9\)
The intersections of the graph \(y = x^2 + ax + 4\) and \(y = 3x + b\) are two points \(P\) and \(Q\). The length of \(PQ\) is \(4\sqrt{10}.\) What is the maximum of \(b\)?
A. \(5\)
B. \(6\)
C. \(7\)
D. \(8 \)
E. \(9\)
01 Jun 2020, 19:38
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Suppose the difference in the x coordinates of P and that of Q = c
Now since the slope of the line \(y = 3x + b\) is 3, the difference in the y coordinates of P and that of Q = 3c
\(c^2 +(3c)^2 \)= \([4\sqrt{10}]^2\)
\(c^2= 16\)
c= +4 or -4
Hence the roots of the equation \(x^2 + ax + 4 = 3x+b\) are t and t+4
\(x^2+(a-3)x+4-b = 0\)
\(t+t+4 = 3-a\)
\(a= -2t-1\)
\(t^2+(-2t-1-3)t+4-b = 0\)
\(t^2+4t+b-4 = 0\)
Since t is a real number, D≥0
\(16-4(b-4)≥0\)
\(32≥ 4b\)
\(8≥ b\)
Now since the slope of the line \(y = 3x + b\) is 3, the difference in the y coordinates of P and that of Q = 3c
\(c^2 +(3c)^2 \)= \([4\sqrt{10}]^2\)
\(c^2= 16\)
c= +4 or -4
Hence the roots of the equation \(x^2 + ax + 4 = 3x+b\) are t and t+4
\(x^2+(a-3)x+4-b = 0\)
\(t+t+4 = 3-a\)
\(a= -2t-1\)
\(t^2+(-2t-1-3)t+4-b = 0\)
\(t^2+4t+b-4 = 0\)
Since t is a real number, D≥0
\(16-4(b-4)≥0\)
\(32≥ 4b\)
\(8≥ b\)
MathRevolution
yashikaaggarwal
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01 Jun 2020, 19:57
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nick1816
Sir can you elaborate this? If C value is±4 why we took roots as t and t+4.
Then what did you substitute in highlighted part. And why?
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