If tan A = n tan B and sin A = m sin B, prove that 
.
Given: tan A = n tan B
Therefore, tan B = tan A/n
Thus, cot B = n/tan A
⇒ cot2 B = n2/tan2 A ……(1)
Also, sin A = m sin B
Therefore, sin B = sin A/m
Thus, cosec B = m/sin A
⇒ cosec2 B = m2/sin2 A ……(2)
Now, subtract equation (2) from (1):
cosec2 B – cot2 B = 
⇒ 1 = 
⇒ 1 = 
⇒ m2 – n2 cos2 A = sin2 A
⇒ m2 – n2 cos2 A = 1 – cos2 A
⇒ m2 – 1 = n2 cos2 A – cos2 A
⇒ (n2 – 1)cos2 A = m2 – 1
⇒ cos2 A = (m2 – 1)/(n2 – 1)
Hence, proved.
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