SOLUTION: Prove that tant=sin2t÷(1+cos2t)
Algebra.Com
Question 978525: Prove that tant=sin2t÷(1+cos2t)
Answer by Cromlix(4381) (Show Source): You can put this solution on YOUR website!
Hi there,
Prove that tant=sin2t÷(1+cos2t)
tant = 2sintcost/1 + (2cos^2t -1)
Convert sin2t - 2sintcost
Convert cos2t - 2cos^2t - 1
tant = 2sintcost/1+(2cos^2t - 1)
Sort out brackets
tant = 2sintcost/2cos^2t
Cancel out 2 top and bottom
Cancel out cost top and one of cost at bottom
tant = sint/cost
Hope this helps:-)
RELATED QUESTIONS
please a need help with this
QUESTION
(a)prove that the equation mx(x^2+2x+3) =... (answered by KMST)
PROVE THAT:
sinx.cosx=-1
(answered by Edwin McCravy,Alan3354)
prove that... (answered by ikleyn)
Prove that... (answered by Edwin McCravy)
sqrt6 sin2t- sqrt3 tan2t=0
I know I can make tan 2t into sin2t/cos2t so I am using... (answered by Alan3354)
Prove that (1/∞) =... (answered by HEY654321)
prove that... (answered by math_helper)
prove that... (answered by robertb)
prove that Cr + Cr+1=Cr+1 (answered by ikleyn)