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https://math.answers.com/geometry/A_image_of_10000_sided_polygons

A image of 10000 sided polygons? - Answers

Such an image - viewed on a computer - would be almost totally indistinguishable from a circle. The internal angles of a polygon add up to 180(n-2), where n is the number of sides. so the measurement of the angles is calculated by (180(n-2)) / n. In this case that calculates as (180 (9998)) / 10000, which gives 1799640 / 10000 = 179.964 degrees. For such an angle to be discernable, the dimensions of the polygon would need to be immense - far greater than could be displayed by a computer.



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A image of 10000 sided polygons? - Answers

https://math.answers.com/geometry/A_image_of_10000_sided_polygons

Such an image - viewed on a computer - would be almost totally indistinguishable from a circle. The internal angles of a polygon add up to 180(n-2), where n is the number of sides. so the measurement of the angles is calculated by (180(n-2)) / n. In this case that calculates as (180 (9998)) / 10000, which gives 1799640 / 10000 = 179.964 degrees. For such an angle to be discernable, the dimensions of the polygon would need to be immense - far greater than could be displayed by a computer.



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https://math.answers.com/geometry/A_image_of_10000_sided_polygons

A image of 10000 sided polygons? - Answers

Such an image - viewed on a computer - would be almost totally indistinguishable from a circle. The internal angles of a polygon add up to 180(n-2), where n is the number of sides. so the measurement of the angles is calculated by (180(n-2)) / n. In this case that calculates as (180 (9998)) / 10000, which gives 1799640 / 10000 = 179.964 degrees. For such an angle to be discernable, the dimensions of the polygon would need to be immense - far greater than could be displayed by a computer.

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      Such an image - viewed on a computer - would be almost totally indistinguishable from a circle. The internal angles of a polygon add up to 180(n-2), where n is the number of sides. so the measurement of the angles is calculated by (180(n-2)) / n. In this case that calculates as (180 (9998)) / 10000, which gives 1799640 / 10000 = 179.964 degrees. For such an angle to be discernable, the dimensions of the polygon would need to be immense - far greater than could be displayed by a computer.
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