Question

If sec 0 = x+ 1 /4x,
then prove that
sec 0 + tan 0 = 2x or = 1/ 2x​

Answer 1

Step-by-step explanation:

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Answer 2

Answer:

Step-by-step explanation:

Given that secθ = x+1/4x

1+tan²θ = sec²θ

or tan²θ = sec²θ – 1

on expanding

tan²θ = ( x+1/4x)² -1

or tan²θ = ( x²+1/16x² + 1/2 -1 )

or tan²θ = (x² +1/16x² -1/2 )

or tan²θ =  x² +1/16x²-1/2

or tan²θ = (x-1/4x)^2

or tan²θ = +(x-1/4x) or – (x-1/4x)

when tanθ = (x-1/4x) we get

secθ+tanθ = x+1/4x + x-1/4x = 2x

when tanθ = -(x-1/4x)

secθ+tanθ = (x+1/4x) – (x-1/4x) = 1/2x

secθ+tanθ = (x+1/4x) – (x-1/4x) = 1/2x

and secθ+tanθ = x+1/4x + x-1/4x = 2x