Consider two vectors `vecF_(1)=2hati+5hatk` and `vecF_(2)=3hatj+4hatk`. The magnitude to thhe scalar product of these vectors is

Consider the two vectors : vecL=1hati+2hatj+3hatk " and " vecl=4hati+hatj+6hatk . Find the value of the scalar alpha such that the vector vecL-alpha vecl is perpendicular to vecL .

The resultant of the forces vecF_(1)=4hati-3hatj and vecF_(2)=6hati+8hatj is

The scalar product of vector vecA= 2hati + 5hatk and vecB = 3hatj + 5hatk is ……..

The two vectors A=2hati+hatj+3hatk and B=7hati-5hatj-3hatk are -

Find the scalar product of vectors veca=2hati-hatj+2hatk and vecb=hati-3hatj-5hatk

Find the sum of the vectors veca = -2hati+hatj-4hatk and vecb = 3hati-hatj+5hatk .

The scalar triple product of the vectors 2hati,3hatj and -5hatk is

If vecF=2hati+3hatj-hatk and vecr=hati-hatj+6hatk find vecrxxvecF

Two forces vecF_(1)=5hati+10hatj-20hatk and vecF_(2)=10hati-5hatj-15hatk act on a single point. The angle between vecF_(1) and vecF_(2) is nearly

The scalar product of two vectors A=2hati +2hatj -hatk and B=-hatj +hatk ,is given by