Question

What is the correct option from the given question? ps - I got 98 as an answer but it's not correct(? idk maybe the given answer at the back is wrong, u can also see and recheck my solution, I've attached the solution below the question)

Answer 1

`98` is the correct answer.

Explanation:

Given:

`4x^3-7x^2+1 = 0`

Dividing by `4` we find:

`x^3-7/4x^2+0x+1/4`

`= (x-alpha)(x-beta)(x-gamma)`

`= x^3-(alpha+beta+gamma)x^2+(alphabeta+betagamma+gammaalpha)x-alphabetagamma`

So:

`{ (alpha+beta+gamma = 7/4), (alphabeta+betagamma+gammaalpha = 0), (alphabetagamma = -1/4) :}`

So:

`49/16 = (7/4)^2-2(0)`

`color(white)(49/16) = (alpha+beta+gamma)^2-2(alphabeta+betagamma+gammaalpha)`

`color(white)(49/16) = alpha^2+beta^2+gamma^2`

and:

`7/8 = 0 - 2(-1/4)(7/4)`

`color(white)(7/8) = (alphabeta+betagamma+gammaalpha)^2-2alphabetagamma(alpha+beta+gamma)`

`color(white)(7/8) = alpha^2beta^2+beta^2gamma^2+gamma^2alpha^2`

So:

`49/128 = (7/8)^2-2(-1/4)^2(49/16)`

`color(white)(49/128) = (alpha^2beta^2+beta^2gamma^2+gamma^2alpha^2)^2-2(alphabetagamma)^2(alpha^2+beta^2+gamma^2)`

`color(white)(49/128) = alpha^4beta^4+beta^4gamma^4+gamma^4alpha^4`

So:

`alpha^(-4)+beta^(-4)+gamma^(-4) = (alpha^4beta^4+beta^4gamma^4+gamma^4alpha^4)/(alphabetagamma)^4`

`color(white)(alpha^(-4)+beta^(-4)+gamma^(-4)) = (49/128)/(-1/4)^4`

`color(white)(alpha^(-4)+beta^(-4)+gamma^(-4)) = (49/128)/(1/256)`

`color(white)(alpha^(-4)+beta^(-4)+gamma^(-4)) = 98`

Answer 2

`98`

Explanation:

Alternatively, as an extra check, note that the roots of:

`4x^3-7x^2+1 = 0`

are the reciprocals of the roots of:

`x^3-7x+4 = 0`

So we can find `alpha^4+beta^4+gamma^4` for the roots of this cubic in order to calculate `alpha^(-4)+beta^(-4)+gamma^(-4)` for the roots of the original cubic.

Given:

`x^3+0x^2-7x+4`

`= (x-alpha)(x-beta)(x-gamma)`

`= x^3-(alpha+beta+gamma)x^2+(alphabeta+betagamma+gammaalpha)x-alphabetagamma`

We find:

`{ (alpha+beta+gamma=0), (alphabeta+betagamma+gammaalpha = -7), (alphabetagamma = 4) :}`

So:

`alpha^2+beta^2+gamma^2`

`= (alpha+beta+gamma)^2-2(alphabeta+betagamma+gammaalpha)= 0-2(-7) = 14`

`alpha^2beta^2+beta^2gamma^2+gamma^2alpha^2`

`=(alphabeta+betagamma+gammaalpha)^2-2alphabetagamma(alpha+beta+gamma) = (-7)^2-2(4)(0) = 49`

`alpha^4+beta^4+gamma^4`

`=(alpha^2+beta^2+gamma^2)^2-2(alpha^2beta^2+beta^2gamma^2+gamma^2alpha^2) = 14^2-2(49) = 196-98 = 98`