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How do you find the ratio of two regular polygons?

How do you find the ratio of two regular polygons?

  1. Answer:
  2. The number of sides of each polygon is 3 and 6.
  3. Step-by-step explanation:
  4. Let, n1 : n2 = 1 : 2.
  5. So, A1 : A2 = 3 : 8.
  6. Putting, n2 = 2n1 ;
  7. ∴ Number of sides of first polygon is 3.
  8. ∴ Number of sides of second polygon is 6.

What is respective ratio of number of sides to number of diagonals of a polygon?

Total number of diagonals in a regular polygon with n sides is = n(n – 3)/2.

What is the ratio of the number of sides of a square to the number of edges of a cube?

Hence, the ratio is 4 : 8 or 1 : 2. Q3. In the above figure, side length of each small cube is 0.5 cm, with the total number of small cubes being 81. What is the area in square centimeter of Δ XYZ?

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What are the names of irregular polygons?

Named polygons

  • Tetragon, 4 sides.
  • Pentagon, 5 sides.
  • Hexagon, 6 sides.
  • Heptagon, 7 sides.
  • Octagon, 8 sides.
  • Nonagon Enneagon, 9 sides.
  • Decagon, 10 sides.
  • Undecagon, 11 sides.

How many sides a regular polygon has whose each exterior angle is 45?

8
As each exterior angle is 45o , number of angles or sides of the polygon is 360o45o=8 .

How many sides does a regular polygon have if the measure of an exterior angle is 30 degree?

12
Since all the angles are congruent, 30a=360 , and a=12 . Since a=s , s=12 , so the polygon has 12 sides.

How do you find the number of sides of a regular polygon given the exterior angle?

Divide 360 by the amount of the exterior angle to also find the number of sides of the polygon. For example, if the measurement of the exterior angle is 60 degrees, then dividing 360 by 60 yields 6. Six is the number of sides that the polygon has.

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What is the ratio between the number of sides of polygons?

Two regular polygons are such that the ratio between the number of sides is 1:2 and the ratio of measures of their interior angles is 3:4. How would one find the number of sides of each polygon? UpdateCancel.

How many sides does a polygon have with 5 sides?

Let the no. of sides of the regular polygons be n and 2n. Then the interior angles would be: It is given that the ratio between the measures of interior angles is 3:4. Therefore one polygon is of 5 sides and the other is of 10 sides.

What is the ratio between the measures of interior angles?

It is given that the ratio between the measures of interior angles is 3:4. Therefore one polygon is of 5 sides and the other is of 10 sides. Please solve it in the notebook to get a clear step by step answer.