If the sides `a,b,c` are in A.P., prove that `tan(A/2)+ tan (C/2)=2/3 cot (B/2).`

Prove that tan^(-1) 2 + tan^(-1) 3 = (3pi)/4

If a,b,c are in HP, then prove that (a+b)/(2a-b)+(c+b)/(2c-b)gt4 .

Prove that, tan((A)/(2)+B)=(c+b)/(c-b)tan((A)/(2))

If tan A= cot B, prove that A+ B = 90^(@)

If A+B+C=pi , prove that : cot (A/2)+ cot(B/2) + cot(C/2) = cot(A/2) cot (B/2) cot (C/2)

Prove that tan 70^(@)=cot70^(@)+2cot40^(@)

If A , B and C are interior angles of a triangle ABC, then show that tan ((A+B) /(2)) =cot (C/2)

If a , b , c , are in A P ,a^2,b^2,c^2 are in HP, then prove that either a=b=c or a , b ,-c/2 from a GP (2003, 4M)

If a^(2) + 2bc, b^(2) + 2ac, c^(2) + 2ab are in A.P then prove that (1)/(b-c), (1)/(c-a) and (1)/(a-b) are in A.P.

If sin2A= lambda sin 2B prove that (tan(A+B)/tan(A-B))=(lambda+1)/(lambda-1)