What is the distance between $(2, \frac{5 π}{8})$ $(2 , (5 pi)/8 )$ and $(3, \frac{1 π}{3})$ $(3 , (1 pi )/3 )$ ?

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What is the distance between $(2, \frac{5 π}{8})$ $(2 , (5 pi)/8 )$ and $(3, \frac{1 π}{3})$ $(3 , (1 pi )/3 )$ ?

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Answer 1 · 2016-02-09T11:33:29

The distance between those two coordinates is $\sqrt{13 - 12 cos (\frac{7 π}{24})} \approx 2.39$ $sqrt(13 - 12 cos((7pi)/24)) ~~2.39$ .

Explanation:

You can use the law of cosines to do that.

Let me illustrate why:

Polar coordinates $(r, θ)$ $(r, theta)$ are defined by the radius $r$ $r$ and the angle $θ$ $theta$ .

Imagine lines leading from the pole to your respective polar coordinates. Those lines represent two sides of a triangle with lengths $A = 3$ $A = 3$ and $B = 2$ $B = 2$ . The distance between those two coordinates being the third side, $C$ $C$ .

Furthermore, the angle between $A$ $A$ and $B$ $B$ can be computed as the difference between the two angles of your polar coordinates:

$γ = \frac{5 π}{8} - \frac{π}{3} = \frac{7 π}{24}$ $gamma = (5pi)/8 - pi/3 = (7pi)/24$

Thus, the length of the side $C$ $C$ can be found with the help of law of cosines on that triangle:

$C^{2} = A^{2} + B^{2} - 2 A B cos (γ)$ $C^2 = A^2 + B^2 - 2AB cos(gamma)$

$= 3^{2} + 2^{2} - 2 \cdot 3 \cdot 2 \cdot cos (\frac{7 π}{24})$ $= 3^2 + 2^2 - 2 * 3 * 2 * cos((7pi)/24)$

$= 13 - 12 cos (\frac{7 π}{24})$ $= 13 - 12 cos((7pi)/24)$

$\Rightarrow C = \sqrt{13 - 12 cos (\frac{7 π}{24})} \approx 2.39$ $=> C = sqrt(13 - 12 cos((7pi)/24)) ~~2.39$

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What is the distance between $(2, \frac{5 π}{8})$ $(2 , (5 pi)/8 )$ and $(3, \frac{1 π}{3})$ $(3 , (1 pi )/3 )$ ?

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