prove that equation sec^2x = 4ab/(a+b)^2 is only possible when a=b
Answers
Answered by
4
Step-by-step explanation:
AS we know
sec^2 x > = 1
if sec^2 x = 4ab/(a+b)^2.. then 4ab/(a+b)^2 >= 1
as (a+b)^2 > 0 so 4ab >= (a+b)^2 or 0 >= (a+b)^2 - 4ab or 0 >= (a-b)^2
as 0 <= (a-b)^2 so above is true if 0 = (a-b)^2 or a = b
so above is true only if a= b
Similar questions