Home
Class 11
PHYSICS
If vec(A) xx vec(B) = 0 and vec(B) xx ve...

If `vec(A) xx vec(B) = 0 and vec(B) xx vec(C ) = 0`, the angle between `vec(A) and vec(C )` is :

A

0

B

`pi`

C

`pi//4`

D

`pi//2`

Text Solution

Verified by Experts

The correct Answer is:
A, B
Promotional Banner

Topper's Solved these Questions

  • VECTORS

    AAKASH SERIES|Exercise Practice Sheet (Exercise-III) (Multiplication of Vectors (Level-I)) (Straight Objective Type Questions)|35 Videos

  • VECTORS

    AAKASH SERIES|Exercise Practice Sheet (Exercise-III) (Multiplication of Vectors (Level-II)) (Straight Objective Type Questions)|14 Videos

  • VECTORS

    AAKASH SERIES|Exercise Practice Sheet (Exercise-II) (Resolution of Vectors (Level -I)) (Straight Objective Type Questions)|19 Videos

  • UNITS AND MEASUREMENTS

    AAKASH SERIES|Exercise ADDITIONAL PRACTICE EXERCISE (PRACTICE SHEET (ADVANCED))|14 Videos

  • VISCOSITY

    AAKASH SERIES|Exercise Questions for Descriptive Answers|3 Videos

Similar Questions

Explore conceptually related problems

If vec(A) = vec(B) - vec( C) then determine the angle between vec(A) and vec(B)

Let vec(A), vec(B) and vec(C ) be unit vectors. Suppose vec(A).vec(B) = vec(A).vec(C ) = 0 and that the angle between vec(B) and vec(C ) is (pi)/(6) " then " vec(A) = +- n[vec(B) xx vec(C )] find the n

If three vectors vec(a), vec(b), vec(c ) are such that vec(a) ne vec(0) and vec(a) xx vec(b)=2 (vec(a) xx vec(c )), |vec(a)| = |vec(c )| =1, |vec(b)|=4 and the angle between vec(b) and vec(c ) is cos^(-1) ((1)/(4)) , then vec(b)-2vec(c )= lamda vec(a) where lamda =

(vec(a) xx vec(b), vec(b) xx vec(a)) =

If vec(a) + vec(b) + vec(c )= vec(0) and |vec(a) xx vec(b)|=3 , then |vec(b) xx vec(c )| =

a, b are the magntidues of vectors vec(a) " & " vec(b) . If vec(a) xx vec(b) = 0 the value of vec(a). vec(b) is