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Question

If α,β and γ are the roots of the equation x3+3x+2=0 , Find the equation whose roots are αβ)(αβ),(βγ)(βα),(γα)(γβ.


A

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B

- 9 - 216 = 0 \)

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C

- 11 - 100 = 0 \)

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D

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Solution

The correct option is B

- 9 - 216 = 0 \)


α,β and γ are the roots of the equation x3+3x+2=0 ________(1)

Sum of the roots α+β+γ=ba=0β+γ=α

Sum of the roots taking two at a time αβ+βγ+γα=ca=3

Product of the roots αγβ=da=2βγ=2α

Let y=(αβ)(αγ)

y=(αβ)(αγ)=α2αβα+β

= α2α(β+γ)+βγβ+γ=α,βγ=2α

=α2α(α)+2α

y=2α22α

yα=2α32 ___________(2)

2α3yα2=0

To generalize this equation

Replace α=x

2x3 -yx - 2 = 0 ____________(3)

To get the relation between x and y

Subtracting equation 3 from twice of equation 1

2x3 -xy - 2 - 2x3 - 6x - 4 = 0

-xy - 6x - 6 = 0

x(6 + y) = - 6

Now replace

x = 66+y in equation 1

-216(6+y)3 - 186+y + 2 = 0

(y+6)39(y+6)2108=0

y3+9y2216=0

Replace y by x x3+9x3216=0

x3+9x2216=0 has roots

(αβ)(αγ),(βγ)(βα),(γα)(γβ)


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