If `b=3,c=4,a n dB=pi/3,` then find the number of triangles that can be constructed.

If b=3,c=4, and B=(pi)/(3), then find the number of triangles that can be constructed.

If A=30^(0),a=7, and b=8 in o+ABC, then find the number of triangles that can be constructed.

Three vertices of a convex n sided polygon are selected.If the number of triangles that can be constructed such that none of the sides of the triangle is also the side of the polygon is 30, then the polygon is a

In triangle A B C , if b=3,\ c=4\ a n d\ /_B=pi/3, then number of such triangle is 1 (b) 2 (c) 0 (d) infinite

If n(A)=6 and n(B)=3, then find the number of subsets of A xx B .

The sides AB, BC, CA of a triangle ABC have 3, 4 and 5 points. Triangles that can be constructed by using these points as vertices, is

If (sin A)/(2)=(sin B)/(3)=(sin C)/(7), then number of triangles can be formed (1) zero (2) One (4) Infinite (3) Two