If |overset(rarr)A+overset(rarr)B|=|over...

If `|overset(rarr)A+overset(rarr)B|=|overset(rarr)A-overset(rarr)B|` what is the angle between `overset(rarr)A` and `overset(rarr)B` ?

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To solve the problem, we need to analyze the given equation involving the magnitudes of the vectors \(\vec{A}\) and \(\vec{B}\): Given: \[ |\vec{A} + \vec{B}| = |\vec{A} - \vec{B}| \] ### Step 1: Square both sides ...

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If |overset(rarr)A-overset(rarr)B|=|overset(rarr)A|-|overset(rarr)B| the angle between overset(rarr)A and overset(rarr)B is

If overset(rarr)A+overset(rarr)B+overset(rarr)C =0 and A = B + C, the angle between overset(rarr)A and overset(rarr)B is :

Let overset(rarr)C = overset(rarr)A+overset(rarr)B then :

The maqunitudes of vecotr overset(rarrA), overset(rarr)B and overset(rarr)C are respectively 12,5 and 13 units and overset(rarr)A+overset(rarr)B=overset(rarr)C then the angle between overset(rarr)A and overset(rarr)B is :

If overset(rarr)A=overset(rarr)B+overset(rarr)C and the magnitude of overset(rarr)A, overset(rarr)B and overset(rarr)C are 5,4 and 3 units respectively the angle between overset(rarr)A and overset(rarr)C is

Dot product of two vectors overset(rarr)A and overset(rarr)B is defined as overset(rarr)A.overset(rarr)B=aB cos phi , where phi is angle between them when they are drawn with tails coinciding. For any two vectors . This means overset(rarr)A . overset(rarr)B=overset(rarr)B. overset(rarr)A that . The scalar product obeys the commutative law of multiplication, the order of the two vectors does not matter. The vector product of two vectors overset(rarr)A and overset(rarr)B also called the cross product, is denoted by overset(rarr)A xx overset(rarr)B . As the name suggests, the vector product is itself a vector. overset(rarr)C=overset(rarr)A xx overset(rarr)B then C=AB sin theta , overset(rarr)A=hat i+ hat j-hatk and overset(rarr)B=2 hat i +3 hat j +5 hat k angle between overset(rarr)A and overset(rarr)B is

Projection of overset(rarr)P on overset(rarr)Q is :

If overset(rarr)B=noverset(rarr)A and overset(rarr)A is antiparallel with overset(rarr)B , then n is :

Given vector overset(rarr)A=2 hat I +3hatj , the angle between overset(rarr)A and y-axis is :

VMC MODULES ENGLISH-INTRODUCTION TO VECTORS & FORCES -JEE Advanced ( ARCHIVE LEVEL-2)

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