Question #57b11

2 Answers
Nghi N
Feb 28, 2017

Use these trig identities:
tan t = (2tan (t/2))/(1 - tan^2 (t/2))
sec t = 1/(cos t) = (1 + tan^2 (t/2))/(1 - tan^2 (t/2))
Develop the Right Side of the equation:
RS = (2tan (t/2) + 1 + tan^2 (t/2))/(1 - tan^2 (t/2)) =
RS = ((1 + tan(t/2))^2)/(1 - tan^2 (t/2))

Divide both numerator and denominator by (1 + tan (t/2)), we get
RS = (1 + tan(t/2))/(1 - tan (t/2)) = LS

P dilip_k
Feb 28, 2017

LHS= (1 + tan(theta/2))/(1 - tan (theta/2))

= (cos(theta/2)(1 + tan(theta/2)))/(cos(theta/2)(1 - tan (theta/2)) )

= (cos(theta/2) + sin(theta/2))/(cos(theta/2) - sin (theta/2))

Multiplying numerator and denominator by (cos(theta/2) + sin(theta/2)) we get

LHS= (cos(theta/2) + sin(theta/2))^2/(cos^2(theta/2) - sin ^2(theta/2))

= (cos^2(theta/2) + sin^2(theta/2)+2sin(theta/2)(costheta/2))/(cos^2(theta/2) - sin ^2(theta/2))

= (1+sin(theta))/cos(2xxtheta/2)

=1/costheta+sintheta/costheta

=tantheta+sectheta=RHS

Proved

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