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Question

If one root of the equation ax2+bx+c=0 the square of the other, then a(c−b)3=cX, where X is


A

(ab)3

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B

a3+b3

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C

None of these

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D

a3b3

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Solution

The correct option is A

(ab)3


If one root is square of other of the equation ax2+bx+c=0, then product of roots =ca and
sum of roots =ba.
If we assume the root of the equation as α and α2 then α3=ca and
α + α2=ba
On simultaneously solving these equations and cubing we will get,
b3+ac2+a2c=3abc

Which can be written in the form a(cb)3=c(ab)3

Alternate solution
Trick: Let roots be 2 and 4, then the equation is x2 – 6x + 8 = 0. Here obviously

X=a(cb)2c=1(14)38=142×142×142=73

Which is given by (ab)3=73


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