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Question
If α=log34 is one of the roots of equation x3+ax2+bx+1=0, a,b∈R, then equation which always have a root β=log248, is
If α=log34 is one of the roots of equation x3+ax2+bx+1=0, a,b∈R, then equation which always have a root β=log248, is
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Solution
The correct option is C x3+2(b−6)x2+4(a−4b+12)x+8(4b−2a−7)=0
α=log34=1log43=112log23=2log23
β=log248=log2(24×3)=4+log23=4+2α
⟹2α=β−4⟹α=2β−4
Since α is a root of equation x3+ax2+bx+1=0⟹α3+aα2+bα+1=0
⟹8(β−4)3+4a(β−4)2+2bβ−4+1=0
⟹8+4a(β−4)+2b(β−4)2+(β−4)3=0
⟹8+4a(β−4)+2b(β2−8β+16)+(β3−12β2+48β−64)=0
⟹β3+β2(2b−12)+β(4a−16b+48)+(32b−16a−56)=0
⟹β3+2β2(b−6)+4β(a−4b+12)+8(4b−2a−7)=0
putting β=x, we get-
x3+2(b−6)x2+4(a−4b+12)x+8(4b−2a−7)=0
Hence,answer is (A).
α=log34=1log43=112log23=2log23
β=log248=log2(24×3)=4+log23=4+2α
⟹2α=β−4
⟹α=2β−4
Since α is a root of equation x3+ax2+bx+1=0
⟹α3+aα2+bα+1=0
⟹8(β−4)3+4a(β−4)2+2bβ−4+1=0
⟹8+4a(β−4)+2b(β−4)2+(β−4)3=0
⟹8+4a(β−4)+2b(β2−8β+16)+(β3−12β2+48β−64)=0
⟹β3+β2(2b−12)+β(4a−16b+48)+(32b−16a−56)=0
⟹β3+2β2(b−6)+4β(a−4b+12)+8(4b−2a−7)=0
putting β=x, we get-
x3+2(b−6)x2+4(a−4b+12)x+8(4b−2a−7)=0
Hence,answer is (A).
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