In a triangle `ABC, a^3 + b^3 + c^3 = c^2 (a + b + c)` (All symbol used have usual meaning in a triangle.) Statement-1: The value of `/_C=60^@`. Statement-2: `Delta ABC` must be equilateral.

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

In a triangle ABC, if angle A = 30^@, b = 10 and a = x, then the values of x for which there are 2 possible triangles is given by(All symbols used have usual meaning in a triangle.)

If the length of tangents from A, B, C to the incircle of Delta ABC are 4,6,8 then which of the following is(are) correct? (All symbols used have usual meaning in a triangle.

The vertices of a triangle an A(1,2), B(-1,3) and C(3, 4). Let D, E, F divide BC, CA, AB respectively in the same ratio. Statement I : The centroid of triangle DEF is (1, 3). Statement II : The triangle ABC and DEF have the same centroid.

In triangle ABC, right angled at B, if tanA=1/(sqrt3) . Find the value of cos A cos C - sin A sin C

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

Let O, O' and G be the circumcentre, orthocentre and centroid of a Delta ABC and S be any point in the plane of the triangle. Statement -1: vec(O'A) + vec(O'B) + vec(O'C)=2vec(O'O) Statement -2: vec(SA) + vec(SB) + vec(SC) = 3 vec(SG)

If in a triangle ABC, /_C=60^@ , then prove that 1/(a+c)+1/(b+c)=3/(a+b+c)