If `veca=hati + 2 hatj + 2hatk, |vecb|=5` and angle between `veca and vecb` is `(pi)/(60,` then the area of the triangle formed by these two vectors as two side is :

If veca.vecb=sqrt15,|vecb|=sqrt3 and angle between veca and vecb" is "pi/3 , find |veca|

If veca = (hati + ahtj + hatk), veca.vecb=1 and veca xx vecb=hatj-hatk then vecb is :

If the angle between veca and vecb is 2pi//3 and the projection of veca in the direction vecb is -2, the |veca|=

If the angle between veca and vecb is (2pi)/3 and the projection of veca in the direction of vecb is – 2, then |veca| =

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

If 2veca*vecb = |veca| * |vecb| then the angle between veca & vecb is

If veca = hati + 2 hatj + 3 hatk, vecb=- hati + 2 hatj + hatk and vec c = 3 hati + hatj, then th such that vec a + t vecb is at right angles to vec c, will be equal to :

If veca,vecb and vecc are unit vectors such that veca+vecb+vecc=vec0 then angle between veca and vecb is

If veca=hati -2 hatj + 3 hatk if vecb is a vector such that veca.vecb=|vecb| and |veca-vecb|=sqrt7, then |vecb|=