Given `vecF=(2hati-5hatj)and vecr=(10hati-6hatj)`. then torque `vectau` is

If a=2hati+5hatj and b=2hati-hatj , then the unit vector along a+b will be

Find the cartesian equation of the plane| through the intersection of the planes vecr.(2hati+6hatj)+12=0 and vecr.(3hati-hatj+4hatk)=0 which are at a unit distance from the origin.

Find the equation of the plane through the line of intersection of vecr.(2hati-3hatj+4hatk)=1 and vecr.(hati-hatj)+4=0 and perpendicular to vecr.(2hati-hatj+hatk)+8=0

Two forces vecF_(1)=(3N)hati-(4N)hatj and vecF_(2)=-(1N)hati-(2N)hatj act on a point object. In the given figure which of the six vectors represents vecF(1) and vecF_(2) and what is the magnitude of the net forces

If veca=2hati-hatj-5hatk and vecb=hati+hatj+2hatk , then find scalar and vector product.

Find the vector equation of the plane passing through the intersection of the planes vecr.(hati+hatj+hatk)=6 and vecr.(2hati+3hatj+4hatk)=-5 and the points (1,1,1).

If vecA= 6hati- 6hatj+5hatk and vecB= hati+ 2hatj-hatk , then find a unit vector parallel to the resultant of vecA & vecB .

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

What is the torque of the force vecF=(2hati+3hatj+4hatk)N acting at the point vecr=(2hati+3hatj+4hatk)m about the origin? (Note: Tortue, vectau=vecrxxvecF )

Find the distance of the point (-1, -5, -10) from the point of intersection of the line vecr=2hati-hatj+2hatk+lambda(3hati+4hatj+2hatk) and the plane vecr.(hati-hatj+hatk)=5