How do you show that #csctheta = (1+ sec theta)/(tan theta + sintheta)#?

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Answer 1 · 2017-02-19T02:09:39

I like to convert everything to sine and cosine and go from there. Use the following identities to do so:

•#csctheta = 1/sintheta#
•#sectheta = 1/costheta#
•#tantheta = sintheta/costheta#

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#1/sintheta = (1+ 1/costheta)/(sintheta/costheta + sin theta)#

#1/sintheta = ((costheta + 1)/costheta)/((sin theta + sinthetacostheta)/costheta)#

#1/sintheta = (costheta + 1)/costheta * costheta/(sin theta + sinthetacostheta)#

#1/sintheta = (costheta+ 1)/costheta * costheta/(sintheta(1 + costheta))#

#1/sintheta = 1/sintheta#

#LHS = RHS#

This identity has been proved.

Hopefully this helps!

Answer 2 · 2017-02-19T02:09:42

#RHS= (1+sec theta )/ (tanx + sinx)#

#= (1+sec theta )/ (sinx/cosx + sinx)#

#= (1+sec theta )/ (sinxsecx + sinx)#

#= (1+sec theta )/ (sinx(secx + 1))#

#=1/sinx=cscx=LHS#

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