Assertion: The unit vectors `hati,hatj` and `hatk` have units of distance and dimersions `[M^(0)L^(1)T^(0)]` ltbr. Reason: The product of a scalr and a vector is a new scalar.

Assertion : The unit vectors hati, hatj and hatk have of distance and dimensions [M^(o)L^(1)T^(o)] . Reason : The product of a scalar and a vector of a new scalar.

The unit vector along hati+hatj is :

The unit vector along 2hati+3hatj is

The unit vector in the direction 6hati-2hatj+3hatk is ………….

Assertion: The dot product of one vector with another vector may be scalar or a vector. Reason: If the product of two vectors is a vector quantity, then product is called a dot product.

If a unit vector is represented by 0.5hati + 0.8hatj + chatk the value of c is

The angle between the vectors (hati+hatj) and (2^(1/2)hatj+hatk)) is

Assertion: The angle between the two vectors (hati+hatj) and (hatj+hatk) is (pi)/(3) radian. Reason: Angle between two vectors vecA and vecB is given by theta=cos^(-1)((vecA.vecB)/(AB))

Find the unit vector in the direction of the vector 2hati-2hatj+hatk .

Find a unit vector parallel to the vector -3hati+4hatj .