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Which of these two regular polygons has the largest interior angle triangle or heptagon?
It is the regular 7 sided heptagon whose interior angles are greater than the regular 3 sided triangle
Is there a rule to decide if a shape will tessellate?
For regular polygons, the interior angle must be a factor of 360 degrees.Irregular triangles and quadrilaterals (whose angle sums are factors of 360 degrees) will tessellate. For other polygons, I am not aware of any simple rule.For regular polygons, the interior angle must be a factor of 360 degrees.Irregular triangles and quadrilaterals (whose angle sums are factors of 360 degrees) will tessellate. For other polygons, I am not aware of any simple rule.For regular polygons, the interior angle must be a factor of 360 degrees.Irregular triangles and quadrilaterals (whose angle sums are factors of 360 degrees) will tessellate. For other polygons, I am not aware of any simple rule.For regular polygons, the interior angle must be a factor of 360 degrees.Irregular triangles and quadrilaterals (whose angle sums are factors of 360 degrees) will tessellate. For other polygons, I am not aware of any simple rule.
Where does a point lie if it is on a segment whose endpoints are on the sides of the angle but is not an endpoint of the segment?
If a point lies on a segment whose endpoints are on the sides of an angle but is not an endpoint of the segment, it is located within the interior of the angle. Specifically, the point is positioned between the two sides of the angle, along the line segment that connects the two endpoints. This means the point is still constrained within the angular region defined by the sides of the angle.
What is a regular hexagon with sides of length s?
It is a plane six-sided figure, each of whose sides is of length s units and each of whose interior angles is 120 degrees.
What is the interior sum of an octagon?
The sum of the interior angles of a regular polygon is found with the formula: (n-2)180. For a regular octagon with 8 sides, the sum of the interior angles would be: (8-2)180 = 1080 degrees. This only works for regular polygons whose sides and angles are congruent.
How many sides a regular n-gon whose sum of interior angle is 1080?
8 sides and it is a regular octagon
What is the name of the regular polygon whose interior angle is treble ist exterior angle?
It is a regular octagon which has 8 sides
Which regular polygon has an interior angle whose measure is 108 degree?
hextogonImproved Answer:-A regular pentagon which has 5 sides
How many sides has a regular polygon whose interior angle is 11 times its exterior angles?
The measure of an interior angle in degrees of a regular polygon of n sides is given by the formula: 180 x (n-2) / nThe measure of an exterior angle in degrees of a regular polygon of n sides is given by the formula: 360/nIf the interior angle is 11 times the exterior angle, then:180 (n-2)/n = 11 x 360/nthen: 180 n - 360 = 11 x 360, or180 n = 12 x 360that its solution gives n = 24Accordingly, the answer is that the number of sides of this polygon is 24
What is the name of th regular polygon whose interior angle is treble its exterior?
It is a regular 8 sided octagon whose interior angles are 135 degrees and its exterior angles are 45 degrees
How do you find the number of sides of a polygon whose interior angle sum is 5580?
(5580 + 360)/180 = 33 sides
What is the name of the regular polygon whose interior angle is treble its exterior angle?
Interior angle = 3 x exterior angle. Hence Int Ang + Ext Ang = 180 Substituting 3 x Ext + Ext = 180 4 Ext = 180 Ext Angle = 180 / 4 = 45 degrees. And Exterior Ang;e = 360 / number of sides. number of sides = 360/ exterior angle No. of sides = 360/45 = 8 Hence the number of sides of the polygon is '8' . It is named as an OCTAGON.
What is the definition of central angle of a regular polygon?
an angle whose vertex is the center of the polygon and whose sides pass through adjacent vertices.
Find the number of sides of a regular convex polygon whose angle is 40degrees?
140
Calculate the number of sides of a regular polygon whose interior angles are each 165 degrees?
14 sides in the polygon
Which of these two regular polygons has the largest interior angle triangle or heptagon?
It is the regular 7 sided heptagon whose interior angles are greater than the regular 3 sided triangle
How many sides in a polygon whose interior angle is 174?
It could be three. It could be a triangle with angles of 174, 3 and 3 degrees. If it is a REGULAR polygon, though, there is a more specific answer. Interior angle = 174 deg implies exterior angle = 6 deg. Sum of ext angles = 360 deg so there must be 360/6 = 60 sides to the polygon.
