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How do you prove #(1+tanx)/(1+cotx)= secx/cscx#?

1 Answer

Shwetank Mauria

May 12, 2016

Please see below.

Explanation:

#(1+tanx)/(1+cotx)=(1+sinx/cosx)/(1+cosx/sinx)#

= #((cosx+sinx)/cosx)/((sinx+cosx)/sinx#

= #(cosx+sinx)/cosx xxsinx/(sinx+cosx)#

= #sinx/cosx#

= #(1/cosx)/(1/sinx)#

= #secx/cscx#

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