How do you verify #(cosX+sinX)/(cscX+secX) = (cosX)(sinX)#?

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Answer 1 · 2016-02-22T00:54:19

Using the definitions of secant and cosecant

We have

#(cos(x)+sin(x))/(csc(x)+sec(x)) = (cos(x)+sin(x))/(1/sin(x)+1/cos(x))#

#=(cos(x)sin(x))/(cos(x)sin(x))*(cos(x)+sin(x))/(1/sin(x)+1/cos(x))#

#=cos(x)sin(x)*(cos(x)+sin(x))/((cos(x)sin(x))/sin(x)+(cos(x)sin(x))/cos(x))#

#=cos(x)sin(x)*(cos(x)+sin(x))/(cos(x)+sin(x))#

#=cos(x)sin(x)#

(Note that this identity is only true where secant and cosecant are defined, that is, where #sin(x)!=0# and #cos(x)!=0#)