If a unit vector `veca` makes angles `(pi)/(3)` with `hati,(pi)/(4)` with `hatj` and an acute angle `theta` with `hatk` then find `theta` and hence , the components of `veca`.

If a unit vector hat(a) , makes angles (pi)/(3) with hat(i),(pi)/(4) with hat(j) and an acute angle theta with hat(k) , then find theta and hence the components of a.

If a unit vector vec(a) makes an angle (pi)/(3) with hat(i), (pi)/(4) with hat(j) and a acute angle theta with hat(k) , then find the value of theta .

Find a vector vec(a) of a magnitude 5sqrt(2) making an angle of (pi)/(4) with x-axis , (pi)/(2) with y-axis and an acute angle theta with z-axis.

A unit vector hata makes an angle pi/4 with z-axis, if hata+hati+hatj is a unit vector then hata is equal to

If veca = 4 hati + 6 hatj and vecb =3 hatj + 4 hatk, then the vector form of the component of veca along vecb is :

If veca = ( 2 hati + 3 hatj + hatk ) then write the direction cosines of veca

If veca , a vector of magnitude 50 , is collinear with the vector vecb = 6 hati - 8hatj - (15)/(2) hatk , and makes an acute angle with the positive direction of z-axis , then the vector veca is equal to

If veca and vecb are unit vectors and theta is the angle between veca and vecb , then sin.(theta)/(2) is

If vecA=3hati+2hatj and vecB=4hatj-5hatk then find |vecA+vecB|

If vecA=3hati+2hatj and vecB=4hatj-5hatk then find |vecA-vecB|