Let p,q,r be roots of cubic equation x3+2x2+3x+3=0, then
A
pp+1+qq+1+rr+1=5
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B
(pp+1)3+(qq+1)3+(rr+1)3=44
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C
pp+1+qq+1+rr+1=6
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D
(pp+1)3+(qq+1)3+(rr+1)3=38
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Solution
The correct options are App+1+qq+1+rr+1=5 B(pp+1)3+(qq+1)3+(rr+1)3=44 Using transformation Let pp+1=y⇒p=y1−y p is a root of the given cubic equation. So p3+2p2+3p+3=0 ⇒(y1−y)3+2(y1−y)2+3(y1−y)+3=0 ⇒y3−5y2+6y−3=0 So y1,y2,y3 are root of above equation, so pp+1+qq+1+rr+1=5 ∑y1=5,∑y1y2=6,∑y1y2y3=3 y31+y32+y33−3y1y2y3=(∑y1)[(∑y1)2−3∑y1y2] ⇒y31+y32+y33−3(3)=5(52−3(6)) ⇒y31+y32+y33=44