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Question
If x2 + `x^(1/2)`= 7 and x ≠ 0; find the value of :
7x3 + 8x - `7/x^3 - 8/x`
Solution
Given that `x^2 + 1/x^2 = 7`
We need to find the value of 7x3 + 8x - `7/x^3 - 8/x`
Consider the given equation :
x2 + `1/x^2` - 2 = 7 - 2 [ subtract 2 from both the sides ]
⇒ `( x - 1/x)^2 = 5`
⇒ `( x - 1/x ) = +- sqrt5` ....(1)
∴ `7x^3 + 8x - 7/x^3 - 8/x = 7x^3 - 7/x^3 + 8x - 8/x`
= `7( x^3 - 1/x^3 ) + 8( x - 1/x )` .....(2)
Now consider the expansion of `( x - 1/x )^3` :
`( x - 1/x )^3 = x^3 - 1/x^3 - 3( x - 1/x )`
⇒ `x^3 - 1/x^3 = ( x - 1/x )^3 + 3( x - 1/x)`
⇒ `x^3 - 1/x^3 = (sqrt5)^3 + 3(sqrt5)` ....(3)
Now substitute the value of `x^3 - 1/x^3` in equation (2), we have
`7x^3 + 8x - 7/x^3 - 8/x = 7( x^3 - 1/x^3) + 8( x - 1/x )`
⇒ `7x^3 + 8x - 7/x^3 - 8/x = 7[(sqrt5)^3 + 3(sqrt5)] + 8[sqrt5]` [From(3)]
⇒ `7x^3 + 8x - 7/x^3 - 8/x = 7[5(sqrt5) + 3(sqrt5)] + 8[sqrt5]]`
⇒ `7x^3 + 8x - 7/x^3 - 8/x = 64[sqrt5]`
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