Question

If given the values of cos 2 and cos 3, sin 2 and sin 3, which of the following can be found arithmetically?

Answer 1

All of them

Explanation:

First

`cos(1) = cos(3-2)`, and

`cos(a-b) = sin(a) sin(b) + cos(a) cos(b)`

which are all known.

Second

`cos(5) = cos(3+2)`, and

`cos(a+b) = cos(a) cos(b) - sin(a) sin(b)`

which are all known.

Third

`sin(-1)=sin(2-3)`, and

`sin(a-b) = sin(a) cos(b) - cos(a) sin(b)`

which are all known.

Fourth

This is the same as point `2`, with `a=pi` and `b=2`.

Fifth one: yes

`tan(4) = \frac{sin(4)}{cos(4)} = \frac{sin(2+2)}{cos(2+2)}`

And find `sin(4)` and `cos(4)` using again the formulas for `sin(a+b)` and `cos(a+b)` plugging `a=b=2`.