The magnitude of the vectors product of two vectors `|vecA| and |vecB|` may be

The magnitude of the vector product of two vectors vecA and vecB may not be:

The ratio of maximum and minimum magnitude of the resultant of two vectors vecA and vecB is 3:2. The relation between A and B is

The magnitude of scalar product of two vectors is 8 and of vector product is 8sqrt(3) . The angle between them is:

If the magnitude of the vector product | vec(A) xx vec(B)| of two vector is equal to the magnitude of their scalar product | vec(A) . vec(B)| , then the angle between vec(A) and vec(B) is ……….

Find the vector product of vectors vecA = 4hati + 2 hatJ - hatk ,vecB = hati+ 3 hatJ + 4 hatk

The resultant of the vectors A and B is perpendicular to the vector A and its magnitude is equal to half the magnitude of vector B. The angle between vecA" and "vecB 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.

Which of the following statement about the sum of the two vectors vecA " and " vecB , is/are correct ?

Two vectors of equal magnitude 5 unit have an angle 60^0 between them. Find the magnitude of (a) the sum of the vectors and (b) the difference of the vectors. . .

In vector diagram shown in figure where (vecR) is the resultant of vectors (vecA) and (vecB) . If R= (B)/(sqrt2) , then value of angle theta is :