A class has fifteen boys and five girls.Suppose three students are selected at random from the class. The probability that there are two boys and one girl is
6
36
B.
6
Let a, b and c be three non-coplanar vectors and let p, q and r be the vectors defined by
0
1
2
3
Let a = i + 2j + k, b = i - j + k, c = i + j - k.
A vector in the plane of a and b has projection on c. Then, one such vector is
4i + j - 4k
4i - j + 4k
2i + j + 2k
The point if intersection of the lines
l1 : r(t) = (i - 6j + 2k) + t(i + 2j + k)
l2 : R(u) = (4j + k) + u(2i + j + 2k) is
(10, 12, 11)
(4, 4, 5)
(6, 4, 7)
(8, 8, 9)
The vectors AB = 3i - 2j + 2k and BC = i - 2k are the adjacent sides of a parallelogram. The angle between its diagonals is
None of these
The points whose position vectors are 2i + 3j + 4k, 3i + 4j + 2k and 4i + 2j + 3k are the vertices of
an isosceles triangle
Right angled triangle
Equilateral triangle
Right angled isosceles triangle
P, Q, R and S are four pots with the position vectors 3i - 4j + 5k, - 4i + 5j + k and - 3i + 4j + 3k respectively. Then, the line PQ meets the line RS at the point
3i + 4j + 3k
- 3i + 4j + 3k
- i + 4j + k
i + j + k
The shortest distance between r = 3i + 5j + 7k + λ(i + 2j + k) and r = - i - j - k + μ(7i - 6j + k) is