In a `Delta ABC` with vertices A(1,2), B(2,3) and C(3, 1) and `angle A = angle B = cos^(-1)((1)/(sqrt(10))), angle C = cos^(-1)((4)/(5))`, then find the circumentre of `Delta ABC`.

Find the angles of /_\ABC whose vertices are A((-1,3,2), B(2,3,5) and C(3,5,-2) .

The vertices of a triangle are A(1, 3, 2), B(2, -1, 3) and C(-1, 4, 2). Find the angle A.

In a triangle ABC,a/b=2+sqrt(3) and /_C=60^(@) then angle A and B is

In Delta ABC , if angle B = sec^(-1)((5)/(4))+cosec^(-1) sqrt(5) , angle C = cosec^(-1)((25)/(7)) + cot^(-1)((9)/(13)) and c = 3 The distance between orthocentre and centroid of triangle with sides a^(2) , b^(4/3) and c is equal to

In a Delta ABC b= sqrt(3)+1, c=sqrt(3)-1 , angle A = 60 ^@ then the value of tan (B-C)/(2) is :-

If in a Delta ABC, b =sqrt3, c=1 and B-C =90^(@), then angle A is

In Delta ABC , if angle B = sec^(-1)((5)/(4))+cosec^(-1) sqrt(5) , angle C = cosec^(-1)((25)/(7)) + cot^(-1)((9)/(13)) and c = 3 tan A , tan B, tan C are in

In a triangles ABC , angle A = x^(@) , angle B = (3x - 2) ^(@) and angle C = y^(@) , " Also " ,angle C - angle B = 9^(@) Find all the three angles of the Delta ABC .

In a triangle ABC, angle A = 60^(@) and b : c = (sqrt3 + 1) : 2 , then find the value of (angle B - angle C)

The vertices of a triangle ABC are A(0, 0), B(2, -1) and C(9, 2) , find cos B .