For the ellipse with a = 6 and b = 4, what are the coordinates of the minor vertices?

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Multiple Choice

For the ellipse with a = 6 and b = 4, what are the coordinates of the minor vertices?

Explanation:
The endpoints of the minor axis are located where the ellipse is at its narrowest – the points with x = 0 and y equal to ±b. Since a = 6 makes the major axis horizontal and b = 4, the ellipse is x^2/36 + y^2/16 = 1. The minor axis runs along the y-direction, so the endpoints are at (0, ±4). Therefore, the minor vertices are (0, 4) and (0, -4).

The endpoints of the minor axis are located where the ellipse is at its narrowest – the points with x = 0 and y equal to ±b. Since a = 6 makes the major axis horizontal and b = 4, the ellipse is x^2/36 + y^2/16 = 1. The minor axis runs along the y-direction, so the endpoints are at (0, ±4). Therefore, the minor vertices are (0, 4) and (0, -4).

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