Let V is a finite dimensional vector space with direct sum of its subspaces U and W

Let us check the dimensional correctness of the relation v = u + at .

Let vec u and vec v be unit vectors such that vec u xxvec v+vec u=vec w and vec w xxvec u=vec v. Find the value of [vec uvec vvec w]

Assertion :- Unit vector is used to describe a direction in space. Reason :- Unit vector has a unit through its magnitude is one.

Let r be the radius vector of a particle in motion about some reference point and r its modulus. Similarly, v be the velocity vector and v its modulus. Then

Addition of vectors in 3 dimensional space

Test the dimensional consistency of the following equations: v= u + at

If u,v and w is a linearly independent system of vectors, examine the system p,q and r, where p=(cosa)u+(cosb)v+(cosc)w q=(sina)u+(sinb)v+(sinc)w r=sin(x+a)u+sin(x+b)v+sin(x+c)w for linearly dependent.

Direction: Study the following information carefully and answer the given questions. S, T. U, V, W, X and Y are 7 boxes which are kept in a stack but not necessarily in the same order. There are 4 boxes between T and W. There are 2 boxes between W and Y. Only one box is between U and V. Box U is kept above V. U is not immediately above Y. There are as many boxes between T and V as between W and S. U is not the topmost box. Which of the following statement is correct? U is kept between T and Y. W is the topmost box. V is the bottommost box.