Let p, q and r be the sides opposite to the angles P, Q and R, respectively in a PQR. If r2sin(P)sin(Q) = pq, then the triangle is
equilateral
acute angled but not equilateral
obtuse angled
right angled
Let p, q and r be the side4s opposite to the angles P, Q and R, respectively in a PQR. Then, 2pr equals
p2 + q2 + r2
p2 + r2 - q2
q2 + r2 - p2
p2 + q2 - r2
Let P (2,-3) , Q -2 1) be the vertices of the PQR. If the centroid of PQR lies on the line 2x + 3y = 1, then the locus of R is
2x + 3y = 9
2x - 3y = 7
3x + 2y = 5
3x - 2y = 5
If cos(A) + cos(B) + cos(C) = 0, prove that
cos(3A) + cos(3B) + cos(3C) = 12 cos(A) cos(B)cos(C)
If is equal to
1
2
5/2
1/3
B.
2