Question

Question #e3313

Answer 1

The value is obtained using the formula for the sine of a difference; it equals `{-\sqrt{3}}/2`, about `-0.866`.

Explanation:

You have the following identities for the sines and cosines of sums and differences:

`\sin(x+y)=\sin(x)\cos(y)+\cos(x)\sin(y)`

`\sin(x-y)=\sin(x)\cos(y)-\cos(x)\sin(y)`

`\cos(x+y)=\cos(x)\cos(y)-\sin(x)\sin(y)`

`\cos(x-y)=\cos(x)\cos(y)+\sin(x)\sin(y)`

Here you have the combination corresponding to the second equation, thus:

`\sin(255°-15°)=\sin(255°)\cos(15°)-\cos(255°)\sin(15°)`

So then we have:

`\sin(255°-15°)=\sin(240°)`
`=\sin(180°+60°)=-\sin(60°)={-\sqrt{3}}/2`