Question
Find the projection of the vector $ \vec{v_1} = \left(-4,~3\right) $ on the vector $ \vec{v_2} = \left(5,~12\right) $.
Answer
Solution
Explanation
The projection of $ \vec{v_1} $ on the vector $ \vec{v_2} $ is given by
$$ \text{Proj}_{\vec{b}}{\vec{a}} = \dfrac{ \vec{a} \cdot \vec{b} }{ \| \vec{a} \|^2 } \vec{b}$$First we find the dot product and magnitude of vector $ \, \vec{b} $:
$$ \begin{aligned}\vec{a} \cdot \vec{b} &= 16 \\[1 em]\| \vec{b} \| &= 13 \\[1 em]\end{aligned} $$Now we can find the projection
$$ \text{Proj}_{\vec{b}}{\vec{a}} = \dfrac{ 16 }{ \left( 13 \right)^2 } \cdot \vec{b} = \dfrac{ 16 }{ 169 } \cdot \vec{b} = \frac{ 16 }{ 169 } \cdot \left(5,~12\right) = \left(\dfrac{ 80 }{ 169 },~\dfrac{ 192 }{ 169 }\right) $$This page was created using
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