Respuesta :
Answer:
The work is in the explanation.
Step-by-step explanation:
The sine addition identity is:
[tex]\sin(a+b)=\sin(a)\cos(b)+\cos(a)\sin(b)[/tex].
The sine difference identity is:
[tex]\sin(a-b)=\sin(a)\cos(b)-\cos(a)\sin(a)[/tex].
The cosine addition identity is:
[tex]\cos(a+b)=\cos(a)\cos(b)-\sin(a)\sin(b)[/tex].
The cosine difference identity is:
[tex]\cos(a-b)=\cos(a)\cos(b)+\sin(a)\sin(b)[/tex].
We need to find a way to put some or all of these together to get:
[tex]\sin(a)\cos(b)=\frac{\sin(a+b)+\sin(a-b)}{2}[/tex].
So I do notice on the right hand side the [tex]\sin(a+b)[/tex] and the [tex]\sin(a-b)[/tex].
Let's start there then.
There is a plus sign in between them so let's add those together:
[tex]\sin(a+b)+\sin(a-b)[/tex]
[tex]=[\sin(a+b)]+[\sin(a-b)][/tex]
[tex]=[\sin(a)\cos(b)+\cos(a)\sin(b)]+[\sin(a)\cos(b)-\cos(a)\sin(b)][/tex]
There are two pairs of like terms. I will gather them together so you can see it more clearly:
[tex]=[\sin(a)\cos(b)+\sin(a)\cos(b)]+[\cos(a)\sin(b)-\cos(a)\sin(b)][/tex]
[tex]=2\sin(a)\cos(b)+0[/tex]
[tex]=2\sin(a)\cos(b)[/tex]
So this implies:
[tex]\sin(a+b)+\sin(a-b)=2\sin(a)\cos(b)[/tex]
Divide both sides by 2:
[tex]\frac{\sin(a+b)+\sin(a-b)}{2}=\sin(a)\cos(b)[/tex]
By the symmetric property we can write:
[tex]\sin(a)\cos(b)=\frac{\sin(a+b)+\sin(a-b)}{2}[/tex]
