Asked by Cam

Simplify:[(cscx-cotx)(cscx+cotx)]/cscx prove:(cscx-cotx)^4 x (cscx+cotx)^4 = 1 Simplify #1: cscx(sin^2x+cos^2xtanx)/sinx+cosx = cscx((1)tanx)/sinx+cosx = cscxtanx/sinx+cosx... prove (cscx-secx/cscx+secx)=(cotx-1/cotx+1) Prove (cscx+cotx)(cscx-cotx)=1 cscx+1/cscx cosx = secx+tanx Sinx/Cscx -1+sinx/Cscx +1= 2tan^2x If 0<x<1 is such that cscx - secx = (13^1/2)/6, then cotx - tanx equals Find ∫cscx(cotx+cscx)dx .