A triangle ABC is inscirbed in a circle. If half the sum of the square of its three sides is equal to twice the square of the diameter of the circle, then the value of `sin^(2)A + sin^(2)B + sin^(2)C` will be-

ABC is a right angled triangle, then the value of sin^(2)A + sin^(2)B + sin^(2)C will be-

If twice the square of the diameter of a circle is equal to half the sum of the square of the sides of inscribed Delta ABC, then sin^2A+sin^2B++sin^2C is equal to:

If for a triangle ABC, |(1,a,b),(1,c,a),(1,b,c)|=0 then the value of sin^(2)A+sin^(2)B+sin^(2)C is -

In any triangle ABC, the value of (b^(2)sin 2C + c^(2) sin 2B) is-

In triangle ABC, if a^(2) + b^(2) +c^(2) -bc -ca -ab=0, then the value of sin ^(2)A+ sin ^(2)B+sin ^(2)C is -

If A,B,C are the angles of a triangle, find the maximum values of : sin A sin B sin C

If the incircle of the triangle ABC passes through its circumcenter, then find the value of 4 sin.(A)/(2) sin.(B)/(2) sin.(C)/(2)

If the diameter of a circle and the side of a square are equal, then find the ratio of their perimeters.

A perpendicular AD is drawn on BC from the vertex A of the acute Delta ABC . Prove that AC^(2) = AB^(2) +BC^(2) -2BC.BD OR Prove that the square drawn on the opposite side of theacute angle of an acute triangle is equal to the areas of the sum of the squares drawn on its other two sides being subtracted by twice the area of the rectangle formed by one of its sides and the projection of the other side to this side.