Question

If `y=1/2 sec^2x` how we can prove that `(d^2y)/dx^2=4y(3y-1)` ?

Answer 1

See below

Explanation:

`y = 1/2sec^2x`

Use the chain rule to find `dy/dx`

`d/dx[f(x)]^n=n[f(x)]^(n-1)f'(x)`

`d/dx(1/2sec^2x)=1/2 *2secx*secxtanx=sec^2xtanx`

Now use the chain and product rules to find `(d^2y)/dx^2`

`d/dxf(x)g(x)=g(x)f'(x)+f(x)g'(x)`

`d/dxsec^2xtanx=(d^2y)/dx^2 1/2sec^2x=2sec^2xtanxtanx+sec^2xsec^2x=2sec^2xtan^2x+sec^4x=sec^2x(2tan^2x+sec^2x)`

Now use `tan^2x=sec^2x-1` to yield the required result

`sec^2x(2tan^2x+sec^2x)=sec^2x(2(sec^2x-1)+sec^2x)=sec^2x(2sec^2x-2+sec^2x)=sec^2x(3sec^2x-2)`

Now substitute `sec^2x=2y`

`sec^2x(3sec^2x-2)=2y(6y-2)`
`=4y(3y-1)`, as required. `square`