Find a vector having magnitude equal to the magnitude of vector and parallel to vector
Magnitude of vector A is,
Unit vector in direction of vector
The vector that has magnitude same as that of vector and parallel to vector
Prove that:
, where is the angle between
By using distributive and commutative law, the dot product can be evaluated as,
That is,
If and angle between is twice the angle between then show that where is the angle between
It is given that angle between is
Therefore the angle between will be
Here,
∴
.
Hence proved.