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What is a polygon that is both equilateral and equilangular called?
Equilateral and Equiangular triangle
An equilateral triangle is an example of what kind of polygon?
equilateral triangle is an example of regular polygon
Draw a triangle that is not a regular triangle?
If by regular, you're referring to a regular polygon which has all sides equal length, and all angles equal, then an equilateral triangle is a regular triangle. If you draw a scalene triangle or an isosceles triangle then it will not be equilateral.
What is the difference between a regular polygon and non regular polygon?
Regular polygon is equilateral and equiangular. Irregular polygon is non-equilateral and non-equiangular.
Can an equilateral and equilangular triangle ever be a parallelgram?
No because a parallelogram is a quadrilateral that has 4 sides but any triangle has only 3 sides.
Polygon that is both equilateral and equilangular?
An equilateral triangle and a square.
What is a polygon that is both equilateral and equilangular called?
Equilateral and Equiangular triangle
Which polygon is equilangular and equilateral?
All regular polygons.
Can a polygon be equilangular but not equilateral?
A polygon can be equilateral but not always equiangular. Some examples of this are rhomboids and other polygons like pentagons and hexagons.
What does equilangular mean?
An equilangular polygon is a polygon who's angles are equal.
Which figure is not always equilangular?
An irregular polygon need not be equiangular.
Could you draw a picture of a regular 3 sided polygon?
An equilateral triangle. ►
Can a polygon be equilateral but not Equiangular?
A polygon cannot be equilateral but not equiangular because in the definiton of a regular polygon which is a polygon that is both equiangular and equilateral you see that you cannot have one without the other. As long as a polygon is equilateral it is also equilangular and vice versa. ARBETTES: You cannot have both in all polygons. In all triangles this is true. If a triangle is equilateral then it is equiangular. However, let's take a known quadrilateral: Rhombus. The definition of a Rhombus is that it has all equal sides. That's it. It's oppsite angles have to be congruent, but they do not all have to be 90 degrees.
If you draw 2 equilateral triangles that are congruent and share a side what polygon is formed is it a regular polygon?
it should make a square leaned over
Why is an equilateral polygon not necessarily a regular polygon?
A regular polygon must be equiangular as well as equilateral. A rhombus is an example of a polygon that is equilateral but not equiangular.
Does a eaquailateral triangle have all equal angles?
Yes I can't explain it through words easily, but I can help you visualize it. A triangle has to be equilangular and equilateral simultaneously. It can't have one property over the other, the reason for this is: In any way, shape, or form draw a square with side lengths of 2 units. Make this precise. Now, draw a rombus, with the exact same side lengths of the square. If you compare the two, all you basically did, was move the sides around/change the angle measures. With a triangle, you can't shift around the sides AT ALL (if you want, try making two equilateral triangles of different size. Can you change the angles without changing the side lengths?). Thus, triangles have to be equilateral AND equilangular. If you compare the two four sided shapes, you have now just proved that every polygon in existence with four or more sides can be equilateral, without being equilangular. However, the opossite does not work Try the above steps with ANY SHAPE that has more than four sides of the same length.
Can a regular polygon be equilateral?
a regular polygon is always equilateral
