Question 1056313
(i) Using sum and difference identities, we can write sin(A-B)/cos(A+B) as:
(sinAcosB - cosAsinB)/(cosAcosB - sinAsinB)
If we divide top and bottom by cosAcosB we are left with:
(tanA - tanB)/(1 - tanAtanB)
And we are told this expression is equal to 1/3[tan(A-B)]
Using a difference identity for tan(A-B), and equating both sides we have:
(tanA - tanB)/(1 - tanAtanB) = (tanA - tanB)/(1-tanAtanB) = (1/3)[(tanA - tanB)/(1 + tanAtanB)]
Solve for tanAtanB:
3(1+tanAtanB) =  1 - tanAtanB
tanAtanB = -1/2
To solve (ii), we use the information already given
From (i) we know that tanAtanB = -1/2 -> tanB = -1/(2tanA)
since tanAtanB = sinAsinB/cosAcosB = -1/2, and we are given sinA = 1/2
[I'm stuck on this one at the moment...]