$A$ vector $\overline{OP}$ makes angles of $45^{\circ}$ with $OX$ and $60^{\circ}$ with $OY$. Find the angle that $\overline{OP}$ makes with $OZ$ (in degrees).

If the direction ratios $(d.r.'s)$ of two lines are connected by the relations $a-b+c=0$ and $a^2-b^2+2c^2=0$,and $\theta$ is the angle between these lines,then $\cos \theta = $

What are the direction cosines of a line perpendicular to the $yz$-plane?

The angle between the lines whose direction ratios satisfy the equations $l+m+n=0$ and $l^2=m^2+n^2$ is

Show that the three lines with direction cosines $\frac{12}{13}, \frac{-3}{13}, \frac{-4}{13} ; \frac{4}{13}, \frac{12}{13}, \frac{3}{13} ; \frac{3}{13}, \frac{-4}{13}, \frac{12}{13}$ are mutually perpendicular.

If $\cos \alpha, \cos \beta, \cos \gamma$ are the direction cosines of a vector $\vec{a}$,then $\cos 2 \alpha + \cos 2 \beta + \cos 2 \gamma$ is equal to