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The plane x + 3y + 13 = 0 passes through the line of intersection of the planes 2x - 8y + 4z = p and 3x - 5y + 4z + 10 = 0. If the plane is perpendicular to the plane 3x - y - 2z - 4 = 0, then the value of p is

162.

If a straight line makes the angles 60°, 45° and $α$ with X, Y and Z-axes respectively, then $\sin^{2} (α)$ is equal to

$\frac{3}{4}$
$\frac{3}{2}$
$\frac{1}{2}$
1

163.
The angle between a and b is $\frac{5 π}{6}$ and and the projection of a on b is $\frac{- 9}{\sqrt{3}}$ , then $|a|$ is equal to

12

8

10

6

Given, angle between a and b is $\frac{5 π}{6}$

and $\frac{a . b}{|b|} = \frac{- 9}{\sqrt{3}} [∵ a . b = |a| |b| \cos (θ)] \Rightarrow |a| \cos (θ) = \frac{- 9}{\sqrt{3}} \Rightarrow |a| \cos (\frac{5 π}{6}) = \frac{- 9}{\sqrt{3}} \Rightarrow |a| \times - \frac{\sqrt{3}}{2} = \frac{- 9}{\sqrt{3}} \Rightarrow |a| \times - \frac{\sqrt{3}}{2} = \frac{- 9}{\sqrt{3}} |a| = 6$

164.

The direction cosines of the straight line given by the planes x = 0 and z = 0 are

1, 0, 0
0, 0, 1
1, 1, 0
0, 1, 0

165.

If a . b = 0 and a + b makes an angle of 60° with b, then $|a|$ is equal to

0
$\frac{1}{\sqrt{3}} |b|$
$\frac{1}{|b|}$
$\sqrt{3} |b|$

166.

The straight line r = $(\hat{i} + \hat{j} + \hat{k}) + a (2 \hat{i} - \hat{j} + 4 \hat{k})$ meets the XY - plane at the point

(2, - 1, 0)
(3, 4, 0)
$(\frac{1}{2}, \frac{3}{4}, 0)$
$(\frac{1}{2}, \frac{5}{4}, 0)$

167.

The equation of the plane passing through (- 1, 5, - 7) and parallel to the plane 2x - 5y + 7z + 11 = 0, is

$r . (2 \hat{i} - 5 \hat{j} - 7 \hat{k}) + 76 = 0$
$r . (2 \hat{i} - 5 \hat{j} + 7 \hat{k}) + 76 = 0$
$r . (2 \hat{i} - 5 \hat{j} - + 7 \hat{k}) + 75 = 0$
$r . (2 \hat{i} - 5 \hat{j} + 7 \hat{k}) + 65 = 0$

168.

The angle subtended at the point (1, 2, 3) by the points P(2, 4, 5) and Q(3, 3, 1) is

90°
60°
30°
0°

169.

If the two lines $\frac{x - 1}{2} = \frac{1 - y}{- a} = \frac{z}{4}$ and $\frac{x - 3}{1} = \frac{2 y - 3}{4} = \frac{z - 2}{2}$ are perpendicular, then the value of a is equal to

170.

If the line $\frac{x + 1}{2} = \frac{y + 1}{3} = \frac{z + 1}{4}$ meets the plane x + 2y + 3z = 14 at P, then the distance between P and the origin is