The resultant of ` vecp and vecq` makes angle `alpha "with " vecp and beta " with " vecq` . Then

The resultant of vecA and vecB makes an angle alpha with vecA and beta and vecB ,

The resultant of vecA and vecB makes an angle alpha with vecA and beta and vecB ,

The resultant of vecP and vecQ is perpendicular to vecP . What is the angle between vecP and vecQ

vecP is resultant of vecA and vecB. vecQ is resultant of vecA and -vecB , the value of absP^2 + absQ^2 would be

The resultant of forces vecP and vecQ is vecR. If vecQ is doubles then vecR is doubled. If the direction of vecQ is reversed then vecR is again doubled . Then P^2:Q^2:R^2 is (A) 3:1:1 (B) 2:3:2 (C) 1:2:3 (D) 2:3:1

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 .

Find the angle between two vectors vecp and vecq are 4,3 with respectively and when vecp.vecq =5 .

vecP, vecQ, vecR, vecS are vector of equal magnitude. If vecP + vecQ - vecR=0 angle between vecP and vecQ is theta_(1) . If vecP + vecQ - vecS =0 angle between vecP and vecS is theta_(2) . The ratio of theta_(1) to theta_(2) is

Let (vecp xx vecq) xx vecp +(vecp.vecq)vecq =(x^(2)+y^(2))vecq + (14-4x-6y)vecp Where vecp and vecq are two non-collinear vectors, vecp is unit vector and x,y are scalars. Then the value of (x+y) is

Find the resultant of two vectors vecP = 3 hati + 2hatj and vecQ = 2hati + 3 hat j