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

If the equation of the base of an equilateral triangle is x+y=2 and the vertex is (2,-1) , then find the length of the side of the triangle.

Construct a triangle of sides 4 cm, 5 cm and 6 cm and then a triangle similar to it whose sides are 2/3 of the corresponding sides of the first triangle.

In a Delta ABC, c cos ^(2)""(A)/(2) + a cos ^(2) ""(C ) /(2)=(3b)/(2), then a,b,c are in

Area of the triangle is calculated by the formula A=(1)/(2)ab sin C . If C = (pi)/(6) and error in the measure of C is x%, find the approximate change in the area of the triangle. Where a and b are constant.

The mid-point of the sides of a triangle are (1, 5, -1), (0, 4, -2) and (2, 3, 4). Find its vertices. Also find the centriod of the triangle.

The vertices of a triangle are A(1,1,2), B (4,3,1) and C (2,3,5). The vector representing internal bisector of the angle A is

Two sides of a triangle are given by the roots of the equation x^(2) -2sqrt3 x+2 =0. The angle between the sides is (pi)/(3). Find the perimeter of Delta.

A point on the hypotenuse of a triangle is at distance a and b from the side of the triangle. Show that the minimum length of the hypotenuse is (a^((2)/(3))+b^((2)/(3)))^((3)/(2)) .

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 .

ABC is a triangle such that sin(2A+B)=sin(C-A)=-sin(B+2C)=1/2 . If A,B, and C are in AP. then the value of A,B and C are: