WebMar 30, 2024 · Therefore, the maximum or greatest number of sides a polygon can have with an exterior angle greater than $50$ is $7$ sides i.e. option C. Note: Note that the exterior angle of any polygon can never exceed or be equal to $180$ degrees. In this case, when the external angle is more than fifty degrees as given, the maximum number of … WebJul 7, 2024 · Arrange the shapes in order from the shape with the greatest number of sides to the shape with the fewest number of sides. 1. triangle 2. square 3. rectangle 4. octagon 5. hexagon 6. pentagon 1 See answer Advertisement Advertisement thatboresgirl13 thatboresgirl13 1. Octagon 8 sides 2. Hexagon 6 sides 3. Pentagon 5 side
Each of these geometric shapes has a different number of sides.
WebJan 4, 2010 · Best Answer. Copy. Effectively, the answer is that a regular polygon could have an infinite number of sides. However, when the number of sides reaches a thousand or so there is very little difference to the naked eye between such a polygon and a circle. For information : Some of the early calculations for pi were based on the very small ... Webthey keep going up by 2 sides each time. Then I labelled 3 by 3 as size 1, 3 by 4 as size 2, etc. This led to the formula (where size is n): maximum number of sides = 2n + 6 . If n = … flights jfk to sxm
Lines of Symmetry of Plane Shapes - mathsisfun.com
WebThe greatest number of sides the polygon could have is . As each interior angle of the polygon is a whole number of degrees, the same must apply to each exterior angle. The sum of the exterior angles of a polygon is and so the greatest number of sides will be that of -sided polygon in which each interior angle is , thus making each exterior angle . WebOct 9, 2024 · Answer: Based on the given information, we can rank these shapes from greatest to fewest number of sides as ; triangle. In geometry, shape is very important, and they have different number of sizes. For instance, Octagon ha s 8 sizes, Hexagon posses 6 sizes, up to triangle which have 3 sizes. WebWhat is the greatest number of sides that your polygon could have? What about on a 3 by 4 grid, or a 3 by 5 grid? What about on a 3 by n grid? Can you explain the pattern by which the 'number of sides' increases? Next, explore some polygons on grids that are 4 dots high. What is the maximum number of sides a polygon could have on a 4 by n grid? flights jhb to ct