A vector `vecr` is inclined at equal angles to the three axes. If the magnitude of `vecr` is `2sqrt3` units, then find the value of `vecr`.

A vector vecr=aveci+bvecj is equally inclined to both x and y axes. If the magnitude of the vetor is 2 units, then what are the values of a and b respectively?

Find a vector vecr equally inclined to the three axes and whose magnitude is 3 sqrt(3) units.

A vector vecr is equally inclined with the coordinates axes. If the tip of vecr is in the positive octant and |vecr|=6 , then vecr is

There vectors vecP, vecQ and vecR are such that vecP+vecQ+vecR=0 Vectors vecP and vecQ are equal in , magnitude . The magnitude of vector vecR is sqrt2 times the magnitude of either vecP or vecQ . Calculate the angle between these vectors .

A vector vecr is inclined to x-axis at 45^(@) and y-axis at 60^(@) if |vecr| =8 units. Find vecr.

Let vecp2hati+hatj-2hatk, vecq=hati+hatj. If vecr is a vector such that vecp. Vecr=|vecr|, |vecr-vecp|=2sqrt2 and the angle between vecp xx vecq and vecr is (pi)/(6) , then the value of |(vecpxxvecq)xx vecr| is equal to

Two vectors vecA and vecB inclined at an angle theta have a resultant vecR which makes an angle alpha with vecA and angle beta with vecB . Let the magnitudes of the vectors vecA, vecB and vecR be represented by A, B and R respectively. Which of the following relations is not correct ?

Vector vecR is the resultant of the vetors vecA and vecB . Ratio of maximum value of |vecR| to the minimum value of |vecR| is 3/1 . The (|vecA|)/(|vecB|) may be equal to-

Let veca=-hati-hatk,vecb =-hati + hatj and vecc = i + 2hatj + 3hatk be three given vectors. If vecr is a vector such that vecr xx vecb = vecc xx vecd and vecr.veca =0 then find the value of vecr .vecb .

A vector vecr is equally inclined with the vectors veca=cos thetahati+sin theta hatj, vecb=-sin theta hati+cos theta hatj and vecc=hatk , then the angle between vecr and veca is