In a `triangle ABC`, if `b^2 + c^2 = 3a^2`, then `cotB + cotC-cotA` is equal to

In DeltaABC, a^2+c^2=2002b^2 then (cotA+cotC)/(cotB) is equal to

In a triangle ABC, sin A- cos B = Cos C , then angle B is

In a triangle ABC, cos 3A + cos 3B + cos 3C = 1 , then then one angle must be exactly equal to

For any "Delta"A B C the value of determinant |sin^2\ \ A cot A1sin^2B cot B1sin^2\ \ C cot C1| is equal to- s in A s in B s in C b. 1 c. 0 d. s in A+s in B+s in C

In triangle A B C , if cotA ,cotB ,cotC are in AdotPdot, then a^2,b^2,c^2 are in ____________ progression.

Construct a triangle similar to the given Delta ABC , with its sides equal to (5)/(3) of the corresponding sides of the triangle ABC.

Prove that the triangle ABC is equilateral if cotA+cotB+cotC=sqrt3

In a triangle ABC, prove that (cot(A/2)+cot(B/2)+cot(C/2))/(cotA+cotB+cot(C))=((a+b+c)^2)/(a^2+b^2+c^2)

For any triangle ABC, prove that : a(bcosC-c cosB)=b^(2)-c^(2)

In the triangle ABC with vertices A(2,3), B(4,1) and C(1,2) , find the equation and length of altitude from the vertex A.