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23 Aug 2010, 08:51
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
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Question Stats:
48% (01:33) correct
52%
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based on 485
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If b, c, and d are constants and x^2 + bx + c = (x + d)^2 for all values of x, what is the value of c?
(1) d = 3
(2) b = 6
(1) d = 3
(2) b = 6
23 Aug 2010, 09:14
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udaymathapati
If b, c, and d are constants and x^2 + bx + c = (x + d)^2 for all values of x, what is the value of c?
\(x^2 + bx + c = (x + d)^2\) --> \(x^2+bx+c=x^2+2dx+d^2\) --> \(bx+c=2dx+d^2\).
Now, as above expression is true "for ALL values of \(x\)" then it must hold true for \(x=0\) too --> \(c=d^2\).
Next, substitute \(c=d^2\) --> \(bx+d^2=2dx+d^2\) --> \(bx=2dx\) --> again it must be true for \(x=1\) too --> \(b=2d\).
So we have: \(c=d^2\) and \(b=2d\). Question: \(c=?\)
(1) \(d=3\) --> as \(c=d^2\), then \(c=9\). Sufficient
(2) \(b=6\) --> as \(b=2d\) then \(d=3\) --> as \(c=d^2\), then \(c=9\). Sufficient.
Answer: D.
18 Oct 2010, 12:59
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This question is based on special algebraic equations, particularly on (x + y)^2 = x^2 + 2xy + y^2.
So (x + d)^2 = x^2 + 2xd + d^2 = x^2 + bx + c
Equating the co-efficients of x, 2d = b
and equating the constant terms, d^2 = c
If I have d = 3, I get b = 6 and c = 9. (Statement I alone is sufficient.)
If I have b = 6, I get d = 3 and then c = 9 (Statement II alone is sufficient.)
So (x + d)^2 = x^2 + 2xd + d^2 = x^2 + bx + c
Equating the co-efficients of x, 2d = b
and equating the constant terms, d^2 = c
If I have d = 3, I get b = 6 and c = 9. (Statement I alone is sufficient.)
If I have b = 6, I get d = 3 and then c = 9 (Statement II alone is sufficient.)
