Question

If 2Cosθ = x+1/x So, Prove That ? Cos2θ = 1/2(x²+1/x²)

Answer 1

`LHS=cos2theta`

`=2cos^2theta-1`

`=2(1/2(x+1/x))^2-1`

`=1/2(x^2+1/x^2+2*x*1/x)-1`

`=1/2(x^2+1/x^2)+1/2*2-1`

`=1/2(x^2+1/x^2)=RHS`

Answer 2

Sqaring the given equation we get
`cos(theta)=1/4*(x^2+1/x^2+2)` then by multiplying by `2` we get
`2cos^2(theta)=1/2*(x^2+1/x^2)+1` from here we get
`2cos^2(theta)-1=1/2(x^2+1/x^2)`

Explanation:

we used `(x+1/x)^2=x^2+1/x^2+2`
`cos(2x)=2cos^2(x)-1`