Trigonometry/Vectors and Dot Products

Consider the vectors U and V (with respective magnitudes |U| and |V|). If those vectors enclose an angle θ then the dot product of those vectors can be written as:

${\displaystyle 𝐔\cdot 𝐕=|𝐔||𝐕|\cos (\theta )}$

If the vectors can be written as:

${\displaystyle 𝐔=(U_x,U_y,U_z)}$

${\displaystyle 𝐕=(V_x,V_y,V_z)}$

then the dot product is given by:

${\displaystyle 𝐔\cdot 𝐕=U_x{V}_x+U_y{V}_y+U_z{V}_z}$

For example,

${\displaystyle (1,2,3)\cdot (2,2,2)=1(2)+2(2)+3(2)=12.}$

and

${\displaystyle (0,5,0)\cdot (4,0,0)=0.}$

We can interpret the last case by noting that the product is zero because the angle between the two vectors is 90 degrees.

Since

${\displaystyle |𝐔|=\sqrt{U_x^2+U_y^2+U_z^2}}$

and

${\displaystyle |𝐕|=\sqrt{V_x^2+V_y^2+V_z^2}}$

this means that

${\displaystyle \cos (\theta )=\frac{U_x{V}_x+U_y{V}_y+U_z{V}_z}{\sqrt{U_x^2+U_y^2+U_z^2}\sqrt{V_x^2+V_y^2+V_z^2}}}$

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