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:

Prove that, a^(3)sin(B-C)+b^(3)sin(C-A)+c^(3)sin(A-B)=0

If the line x=y=z intersect the line xsinA+ysinB+zsinC-2d^(2)=0=xsin(2A)+ysin(2B)+zsin(2C)-d^(2), where A, B, C are the internal angles of a triangle and "sin"(A)/(2)"sin"(B)/(2)"sin"(C)/(2)=k then the value of 64k is equal to

Three numbers a,b, c are between 2 and 18 such that a + b+ c= 25 . If 2,a,b are in A.P and b,c 18 are in G.P then these numbers are…….

In a A B C , if tan(A/2),tan(B/2),tan(C/2) are in AP, then show that cosA ,cosB ,cosC are in AdotPdot

For any triangle ABC, prove that : (sin(B-C))/(sin(B+C))=(b^(2)-c^(2))/(a^(2))

If the points A(-1, -4) , B(b,c) and C(5,-1) are collinear and 2b + c = 4 , find the values of b and c.

For any triangle ABC, prove that : sin""(B-C)/(2)=(b-c)/(a)cos((A)/(2))

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.

For any triangle ABC, prove that : a(bcosC-c cosB)=b^(2)-c^(2)

If A + B + C = 180^@ , then prove that sin 2 A+ sin 2B + sin 2C = 4 sin A sin B sin C