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To find the relative velocity of B with respect to A when they are moving in opposite directions, we can use the concept of vector addition.

Let's assume that A is moving to the right with velocity VA = V and B is moving to the left with velocity VB = 2V.

The velocity of B relative to A is given by the vector subtraction of VB from VA:

Velocity of B relative to A = VA - VB

Since A is moving to the right and B is moving to the left, their velocities have opposite directions. We can represent VA as a vector pointing to the right with magnitude V and VB as a vector pointing to the left with magnitude 2V.

Substituting the values into the equation, we have:

Velocity of B relative to A = V - (-2V)

When we subtract a negative quantity, it is equivalent to adding the positive quantity:

Velocity of B relative to A = V + 2V

Simplifying, we get:

Velocity of B relative to A = 3V

Therefore, the velocity of B relative to A when they are moving in opposite directions is 3V, pointing in the direction from B to A.

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