Plot the point on the polar coordinate system. ( − 2 , 2 π 3 ) (-2,\frac{2\pi}{3}) ( − 2 , 3 2 π )

Here we're asked to plot the point on the polar coordinate system and the point that we're given is negative two, two pi over three. So I have an r value of negative two and a theta value of two pi over three. So first locating my angle at two pi over three radians, I'm going to end up right along this line. But because I have an r value that is a negative, that tells me that I need to count in the opposite direction rather than in this direction that I would if I had a positive r value. So here I'm going to count one, two in that opposite direction of my angle, and this is where my point will be. Thanks for watching, and let me know if you have questions.

16. Parametric Equations & Polar Coordinates

Polar Coordinates

Calculus

16. Parametric Equations & Polar Coordinates

Polar Coordinates

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Multiple Choice

Plot the point on the polar coordinate system.
$(-2,\frac{2\pi}{3})$

Polar coordinate system showing point (-2, 2π/3) marked in red.

Verified step by step guidance

Step 1: Understand the polar coordinate system. In polar coordinates, a point is represented as (r, θ), where 'r' is the radial distance from the origin and 'θ' is the angle measured counterclockwise from the positive x-axis.

Step 2: Analyze the given point (-2, 2π/3). The radial distance 'r' is negative, which means the point is located in the opposite direction of the angle θ. The angle θ = 2π/3 is measured counterclockwise from the positive x-axis.

Step 3: Locate the angle θ = 2π/3 on the polar coordinate system. This angle lies in the second quadrant, as it is between π/2 and π.

Step 4: Since the radial distance 'r' is negative, move in the opposite direction of the angle θ. Instead of plotting the point in the second quadrant, plot it in the fourth quadrant along the same line as θ = 2π/3.

Step 5: Mark the point at a distance of 2 units from the origin in the fourth quadrant along the line opposite to θ = 2π/3. This is the correct location of the point (-2, 2π/3) in the polar coordinate system.