Question

How do you prove `Sin^2x-sin^2y=sin(x+y)sin(x-y)`?

Answer 1

Please see below.

Explanation:

`sin(x+y)sin(x-y)`

= `(sinxcosy+cosxsiny)(sinxcosy-cosxsiny)`

= `sin^2xcos^2y-cos^2xsin^2y`

= `sin^2x(1-sin^2y)-(1-sin^2x)sin^2y`

= `sin^2x-sin^2xsin^2y-sin^2y+sin^2xsin^2y`

= `sin^2x-cancel(sin^2xsin^2y)-sin^2y+cancel(sin^2xsin^2y)`

= `sin^2x-sin^2y`