Home
Class 12
MATHS
Vectors vecA and vecB satisfying the ve...

Vectors `vecA and vecB` satisfying the vector equation `vecA+ vecB = veca, vecA xx vecB =vecb and vecA.veca=1`. Vectors and `vecb` are given vectosrs, are

Promotional Banner

Similar Questions

Explore conceptually related problems

Vectors vecA and vecB satisfying the vector equation vecA+ vecB = veca, vecA xx vecB =vecb and vecA.veca=1 . where veca and vecb are given vectosrs, are

Vectors vecA and vecB satisfying the vector equation vecA+ vecB = veca, vecA xx vecB =vecb and vecA.veca=1 . where veca and vecb are given vectors, are

Three vectors vecA, vecB and vecC satisfy the relation vecA. vecB=0 and vecA. vecC=0. The vector vecA is parallel to

Three vectors vecA, vecB and vecC satisfy the relation vecA. vecB=0 and vecA. vecC=0. The vector vecA is parallel to

For vectors vecA and vecB , (vecA + vecB). (vecA xx vecB) will be :

If veca, vecb and vecc are vectors such that veca. vecb = veca.vecc, veca xx vecb = veca xx vecc, a ne 0. then show that vecb = vecc.

If veca and vecb are non - zero vectors such that |veca + vecb| = |veca - 2vecb| then

If veca and vecb are non - zero vectors such that |veca + vecb| = |veca - 2vecb| then

If veca and vecb are non - zero vectors such that |veca + vecb| = |veca - 2vecb| then

If veca and vecb are non - zero vectors such that |veca + vecb| = |veca - 2vecb| then