If P is a point in space such that OP is inclined to OX at `45^(@)` and OY to `60^(@)` then OP inclined to ZO at

Find the position vector of a point A in space such that vec(OA) is inclined at 60^@ to OX and at 45^@ to OY and |vec(OA)| = 10 units.

Choose the correct answer and give justification for each. If tangents PA and PB from a point P to a circle with centre O are inclined to each other at angle of 80^(@) , then /_POA is equal to

Resultant of two forces vecF_(1) and vecF_(2) has magnitude 50 N. The resultant is inclined to vecF_(1) at 60^(@) and to vecF_(2) at 30^(@) . Magnitudes of vecF_(1) and vecF_(2) , respectively, are:

A projectile si thrown with velocity of 50m//s towards an inclined plane from ground such that is strikes the inclined plane perpendiclularly. The angle of projection of the projectile is 53^(@) with the horizontal and the inclined plane is inclined at an angle of 45^(@) to the horizontal. (a) Find the time of flight. (b) Find the distance between the point of projection and the foot of inclined plane.

If two tangents from point P to a circle are inclined to each other at a angle of 14 0^(@), at what angle will the radii from the points of contact of those tangents be inclined ?

If two radit of a circle are inclined to each other at an angle of 70^(@), then the tangents at the end points of those radii are inclined to each other at an angle of……..

In the triangle OAB , M is the midpoint of AB, C is a point on OM, such that 2 OC = CM . X is a point on the side OB such that OX = 2XB. The line XC is produced to meet OA in Y. Then (OY)/(YA)=

A block of 50 kg on a smooth plane inclined at 60^(@) and another block of 30 kg on a smooth plane inclined at 30^(@) with horizontal are connected by a light string passing over a frictionless pully as shown in the figure. Take g = 10 ms^(-2) , sqrt(3) =1.7 . The acceleration of the blocks and tension in the string are.

A kite is flying at a height of 60m above the ground. The string attached to the kite is temporarily tied to a point on the ground. The inclination of the string with the ground is 60^(@) . Find the length of the string, assuming that there is no slack in the string.

Two large plane mirrors OM and ON are arranged at 150° as shown in the figure. P is a point object and SS' is a long line perpendicular to the line OP. Find the length of the part of the line SS' on which two images of the point object P can be seen.