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Identify the points \((x, y)\) on the unit circle that corresponds to real number $t$. $t = \frac{-5\pi}{3}$, point is 

          Identify the points \((x, y)\) on the unit circle that corresponds to real number $t$.
$t = \frac{-5\pi}{3}$, point is
Identify the points (x, y) on the unit circle that corresponds to real number t. t = (-5Ď€)/(3), point is

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Precalculus with Limits
Precalculus with Limits
Ron Larson 2nd Edition
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Identify the points (x,y) on the unit circle that corresponds to real number t. Identify the points (,y) on the unit circle that corresponds to real number t. -57T point is
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00:01 This problem actually goes really fast if you just have the unit circle memorized but that's okay if you don't because what you can do is probably just work through it so this order pair would be 1 0 this order pair straight up is 0 1 and then halfway in between is root 2 over 2 root 2 over 2 because the x and y values have to be the same over here is root 3 over 2 1 half and there's definitely a pattern here 1 half root 3 over 2 but what you have to realize is…
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