Given sinx + cosx = 54. If 1 + 2sinxcosx = a, find the value of 32 a.
We want to find 1+2sinxcosx and sinx + cosx is given. By doing some operations we should get 1+2sinxcosx. We get 2sinxcosx as one term in the expansion of (sinx+cosx)2. This is one of the motivations to consider (sinx+cosx)2. If not this, by seeing, 1 and 2 sinx cosx, we should be able to guess 1 can be expressed as
sin2x+cos2x
Either way, we have to consider
(sinx+cosx)2
(sinx+cosx)2 = (54)2 = 2516
⇒ sin2x+cos2x + 2sinx cosx = 2516 sin2x+cos2x = 1
⇒ 1 + 2sinx cosx = 2516 = a
⇒ 32a = 32 × 2516 = 50