Q16 of 90 Page 7

Prove that:

LHS

We know that sin(A –B) = sinA cosB – cosA sinB

= tanA – tanB + tanB – tan C + tan C – tanA

= 0 = RHS

Hence proved.

prove that:

sin²(n + 1)A – sin²nA = sin(2n + 1)A sinA

Prove that:

sin²B = sin²A + sin²(A-B) – 2sinA cosB sin(A-B)

Questions · 90

7. Values of Trigonometric Functions at Sum of Difference of Angles

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