Question

Verify that (secx/sinx)*(cotx/cscx)=cscx is an identity. (x=theta BTW) cosx/1-tanx + sinx/1-cotx = sinx =cosx prove that (cotx+tanx)(cotx-tanx) = 1/(sin^2 x) - 1/(cos^x) secx/sinx-sinx/cosx=cotx Prove: (cotx sinx)(secx-cosx)=sin^2(X) Rewrite cotx/(1+sinx) as an expression that does not involve a fraction. Prove cotx-1/cotx+1=1-sin2x/cos2x Prove cotx-1/cotx+1 = sec2x - tan2x I prove till cotx-1/cotx+1 =1/1+tanx - tanx/1+tanx show that sinx/(1-cotx)+cosx/(1-sinx)=sinx+cosx thanks If sinx = cotx, then value of (cos^2(x)+2cos^3(x)+cos^4(x)-3) A) 0 B) -1 C) -2 D)-3