If |vecV_1+vecV_2|=|vecV_1+vecV_2|` and `V_2` is finite, then

If |vecV_(1)+vecV_(2)|=|vecV_(1)-vecV_(2)| and V_(2) is finite, then

Consider a tetrahedron with faces F_(1),F_(2),F_(3),F_(4) . Let vec(V_(1)), vecV_(2),vecV_(3),vecV_(4) be the vectors whose magnitude are respectively equal to areas of F_(1).F_(2).F_(3).F_(4) and whose directions are perpendicular to their faces in outward direction. Then |vecV_(1) + vecV_(2) + vecV_(3) + vecV_(4)| , equals:

Let veca vecb and vecc be non- zero vectors aned vecV_(1) =veca xx (vecb xx vecc) and vecV_(2) = (veca xx vecb) xx vecc .vectors vecV_(1) and vecV_(2) are equal . Then

If vecu and vecv are unit vectors and theta is the acute angle between them, then 2 uvecu xx 3vecv is a unit vector for

Assertion: An observer is moving due east and wind appears him to blow from north. Then the actual direction of air blow must be towards south-east Reason: vecV_(R)=vecV_(A)-vecV_(M) where vecV_(R) is the relative velocity of wind w.r.t. man. vecV_(A)= actual velocity of wind (w.r.t. ground) and vecV_(M)= velocity of man w.r.t. ground.

Given that vectors veca and vecb asre perpendicular to each other, find vector vecv in erms of veca and vecb satisfying the equations vecv.veca=0, vecc.vecb=1 and [vecv veca vecb]=1

If vecu=veca-vecb , vecv=veca+vecb and |veca|=|vecb|=2 , then |vecuxxvecv| is equal to

Two particles of masses m_1 and m_2 in projectile motion have velocities vecv_1 and vecv_2 respectively at time t=0. They collide at time t_0. Their velocities become vecv_1' and vecv_2' at time 2t_0 while still moving in air. The value of |(m_1vecv_1' + m_2vecv_2') - (m_1vecv_1 + m_2vecv_2)| is

If the vectors veca and vecb are perpendicular to each other then a vector vecv in terms of veca and vecb satisfying the equations vecv.veca=0, vecv.vecb=1 and [(vecv, veca, vecb)]=1 is

Let vecu,vecv and vecw be vectors such that vecu+ vecv + vecw =0 if |vecu|= 3, |vecv|=4 and |vecw|=5 then vecu.vecv + vecv .vecw + vecw + vecw .vecu is