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what are the rectangular coordinates of the polar coordinates (2√2, -π/12)? Enter your answer in the box. Enter values rounded to the nearest hundredth.

User WhirlWind
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2 Answers

4 votes

Answer:

Explanation:

what are the rectangular coordinates of the polar coordinates (2√2, -π/12)? Enter-example-1
User NameOfTheRose
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To convert polar coordinates (r, θ) into rectangular coordinates (x, y) we need to use the next formulas:

x = r*cos(θ)

y = r*sin(θ)

Substituting with r = 2√2 and θ = -π/12, we get:


\begin{gathered} x=2\sqrt[]{2}\cdot\cos (-(\pi)/(12)) \\ x=2.73 \\ y=2\sqrt[]{2}\cdot\sin (-(\pi)/(12)) \\ y=0.73 \end{gathered}

The rectangular coordinates are (2.73, 0.73)

User NaveenBharadwaj
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