prove that `tan^(2)A-sin^(2)A=tan^(2)A*sin^(2)A`

Prove that : (i) tan^(2)A-sin^(2)A=tan^(2)A*sin^(2)A (ii) cot^(2)theta-cos^(2)theta=cot^(2)theta*cos^(2)theta .

If A+B = 90^(@) , then prove that sin^(2)A+sin^(2) B=1 tan^(2)A+cot^(2) B=0 .

Prove that sin^(2) A+ sin^(2) A tan^(2) A = tan^(2) A .

Prove that (sin^(2)A)/(cos^(2)A)+1=(tan^(2)A)/(sin^(2)A)

Prove that : tan^(2)theta-sin^(2)theta=tan^(2)thetasin^(2)theta

Prove that (i) (sin^(2)A cos^(2)B - cos^(2)A sin^(2) B )=(sin^(2)A- sin^(2)B) (ii) (tan^(2)A sec^(2)B - sec^(2)A tan^(2)B)=(tan^(2)A- tan^(2)B)

If sin^(4)A+sin^(2)A=1 then prove that (1)/(tan^(4)A)+(1)/(tan^(2)A)=1

If 2tan^(2)alpha tan^(2)beta tan^(2)gamma+tan^(2)alpha tan^(2)beta+tan^(2)beta tan^(2)gamma+tan^(2)gamma tan^(2)alpha=1 prove that sin^(2)alpha+sin^(2)beta+sin^(2)gamma=1

if tan^(alpha)=cos^(2)phi-sin^(2)phi then prove that cos^(alpha)-sin^(2)alpha=tan^(2)phi

Prove: sec^(4)A(1-sin^(4)A)-2tan^(2)A=1