The area of a triangle `A B C` is equal to `(a^2+b^2-c^2)`, where `a, b` and `c` are the sides of the triangle. The value of `tan C` equals

IF tan A and tan B are the roots of abx^2 - c^2 +ab =0 where a,b,c are the sides of the triangle ABC then the value of sin ^2 + sin ^2 B + sin ^2 C is

If sinthetaa n d-costheta are the roots of the equation a x^2-b x-c=0 , where a , ba n dc are the sides of a triangle ABC, then cosB is equal to 1-c/(2a) (b) 1-c/a 1+c/(c a) (d) 1+c/(3a)

If in a triangle a cos^2C/2+ c cos^2A/2=(3b)/2, then find the relation between the sides of the triangle.

If in triangle A B C ,Delta =a^2-(b-c)^2 , then find the value of tan(A/2).

Let a,b,c be the sides of a triangle ABC, a=2c,cos(A-C)+cos B=1. then the value of C is

In any triangle ABC, if 2Delta a-b^(2)c=c^(3) , (where Delta is the area of triangle), then which of the following is possible ?

If angle C of triangle ABC is 90^0, then prove that tanA+tanB=(c^2)/(a b) (where, a , b , c , are sides opposite to angles A , B , C , respectively).

The area of the triangle with vertices at the points (a, b + c), (b, c + a) and (c, a + b) is

The sides of triangle ABC satisfy the relations a + b - c= 2 and 2ab -c^(2) =4 , then the square of the area of triangle is ______

If Delta = a^2 - ( b-c)^2 where Delta is the area of triangle ABC then tan A is equal to