The sides a, b, c of a triangle satisfy the relations `c^2=2ab` and `a^2+c^2=3b^2`. Then the measure of `angleBAC` , in degrees, 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 ______

The sides of DeltaABC satisfy the equation 2a^(2) + 4b^(2) + c^(2) = 4ab + 2ac . Then

In a triangle ABC, ab and c are the sides of the triangle satisfying the relation r_(1)+r_(2) = r_(3)-r then the perimeter of the triangle

If the sines of the angle A and B of a triangle ABC satisfy the equation c^(2) x^(2) - c (a + b) x + ab = 0 , then the triangle

()123 $1. In a triangle ABC, a, b and c are the sides of the triangle satisfying the relation r1 + r2 = r3-r then the perimeter of the triangle 2ab a +b-c ab a +c-b ab a-b-c bc b+c-a 62. In ?ABC, which is not right angled, if p = sinA sinB sinc and q = cosA cosB cosc. Then the equation having roots tanA, tanB and tanC is (1) qxs_px® + (1+4)x-p=0 (2) qx3 + 2px" + qx-p=0 (3) qxs_ px2 + (2 + q)x + pq = 0 (4) qxs_px2 + qx + p = 0

The sides of ABC satisfy the equation 2a^(2)+4b^(2)+c^(2)=4ab+2a* Then the triangle is isosceles the triangle is obtuse B=cos^(-1)((7)/(8))A=cos^(-1)((1)/(4))