Question

What is the limit of `(sin^2(9x))/(3x^2)` as x approaches 0?

Answer 1

`=27`

Explanation:

the trick will be to steer this into it being in terms of well known limit `lim_(x to 0) (sin x)/x = 1`

So
`lim_(x to 0) (sin^2(9x))/(3x^2)`

`= lim_(x to 0) 1/3 (sin (9x))/(x) * (sin(9x))/(x)`

`= lim_(x to 0) (9 times 9)/3 (sin (9x))/(9x) * (sin(9x))/(9x)`

let `u = 3x` and lift the constant out

`implies 27 lim_(u to 0) (sin (u))/(u) * (sin(u))/(u)`

and as the limit of the products is the product of the limits

`= 27 lim_(u to 0) (sin (u))/(u) * lim_(u to 0) (sin(u))/(u)`

`=27`