Two vectors `vecP and vecQ` lie one plane. Vectors `vecR` lies in a differenct plane. In such a case, `vecP + vecQ + vecR`

Two vectors vecP and vecQ that are perpendicular to each other are :

Magnitude of resultant of two vectors vecP and vecQ is equal to magnitude of vecP . Find the angle between vecQ and resultant of vec2P and vecQ .

The resultant of two vectors vecP and vecQ is perpendicular to the vector vecP and its magnitude is equal to half of the magnitude of vector vecQ . Then the angle between P and Q is

if vecP +vecQ = vecP -vecQ , then

The vectors vecP and vecQ have equal magnitudes of vecP +vecQ is n times the magnitude of vecP-vecQ , then angle between vecP and vecQ is:

There vectors vecP, vecQ and vecR are such that vecP+vecQ+vecR=0 Vectors vecP and vecQ are equal in , magnitude . The magnitude of vector vecR is sqrt2 times the magnitude of either vecP or vecQ . Calculate the angle between these vectors .

Let vecq and vecr be non - collinear vectors, If vecp is a vector such that vecp.(vecq+vecr)=4 and vecp xx(vecq xx vecr)=(x^(2)-2x+9)vecq" then " +(siny)vecr (x, y) lies on the line

Two vectors vecp and vecq lie in the xy plane. Their magnitudes are 3.50 and 6.30 units, repspectively, and their directions are 220^(@) and 75.0^(@), respectively, as measured countercloskwise from the positive x axis. What are the values of (a) vecp xx vecq(b) vecp .vecq ?