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How do you prove that #(secx + tanx)/(cosx + cotx) = sinxsec^2x#?

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Mar 10, 2017

#(1/cosx + sinx/cosx)/(cosx + cosx/sinx) = sinx(1/cos^2x)#

#((1 + sinx)/cosx)/((cosxsinx + cosx)/sinx) = sinx(1/cos^2x)#

#(1 + sinx)/cosx * sinx/(cosxsinx + cosx) = sinx(1/cos^2x)#

#(1 + sinx)/cosx * sinx/(cosx(sinx + 1)) = sinx(1/cos^2x)#

#sinx/cos^2x = sinx/cos^2x#

Hopefully this helps!

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