Question

How do you find the value of tan (A - B) if cos A = 3/5 and sin B = 5/13, and A and B are in Quadrant I?

Answer 1

`33/16`

Explanation:

First, find tan A and tan B.
`cos A = 3/5` --> `sin^2 A = 1 - 9/25 = 16/25` --> `cos A = +- 4/5`
`cos A = 4/5` because A is in Quadrant I
`tan A = sin A/(cos A) = (4/5)(5/3) = 4/3.`

`sin B = 5/13` --> `cos^2 B = 1 - 25/169 = 144/169` --> `sin B = +- 12/13.`
`sin B = 12/13` because B is in Quadrant I
`tan B = sin B/(cos B) = (5/13)(13/12) = 5/12`
Apply the trig identity:
`tan (A - B) = (tan A - tan B)/(1 - tan A.tan B)`
`tan A - tan B = 4/3 - 5/12 = 11/12`
`(1 - tan A.tan B) = 1 - 20/36 = 16/36 = 4/9`
`tan (A - B) = (11/12)(9/4) = 33/16`