If O be the origin and OP=r and OP makes an angle `theta` with the positive direction of x-axis and lies in the XY plane find the coordinates of P.

IF O be the origin and OP makes angles 45^0 and 60^0 with the positive directionof x and y-axes respectively and OP=12 units find the coordinates of P.

If O be the origin and OP makes an angle of 45^0 and 60^0 with the positive direction of x and y axes respectively and OP=12 units, find the coordinates of P.

The length of the focal chord which makes an angle theta with the positive direction of x -axis is 4a cos ec^(2)theta

If O is the origin,OP=3 with direction ratios -1,2, and -2, then find the coordinates of P.

Let P M be the perpendicular from the point P(1,2,3) to the x-y plane. If vec O P makes an angle theta with the positive direction of the z- axis and vec O M makes an angle phi with the positive direction of x- axis, w h e r eO is the origin and thetaa n dphi are acute angels, then a. costhetacosphi=1//sqrt(14) b. sinthetasinphi=2//sqrt(14) c. ""tanphi=2 d. tantheta=sqrt(5)//3

Let PM be the perpendicular from the point P(1, 2, 3) to XY-plane. If OP makes an angle theta with the positive direction of the Z-axies and OM makes an angle Phi with the positive direction of X-axis, where O is the origin, then find theta and Phi .

Let PM be the perpendicular from the point P(1, 2, 3) to XY-plane. If OP makes an angle theta with the positive direction of the Z-axies and OM makes an angle Phi with the positive direction of X-axis, where O is the origin, theta and Phi are acute angles, then

Let PQ be the perpendicular form P(1,2,3) to xy-plane. If OP makes an angle theta with the positive direction of z-axis and OQ makes an angle phi with the positive direction of x-axis where O is the origin show that tantheta=sqrt(5)/3 and tanphi=2 .

A square of each side 2, lies above the x-axis and has one vertex at the origin. If one of the sides passing through the origin makes an angle 30^(@) with the positive direction of the x-axis, then the sum of the x-coordinates of the vertices of the square is: