3, it's called a triangle.
No, it is not true that a polygon with an odd number of angles cannot have congruent angles. A polygon can have an odd number of angles and still have some or all of them be congruent. For example, a regular pentagon has five angles that are all congruent, and a polygon with an odd number of sides can also have pairs of congruent angles.
I think it has the same because it just depends on how to split number they're looking 4
i don't really get the "same number of sides" ----- the angles of a polygon are the same with other angles within the polygon, if it is a regular polygon, and there a formula for getting the total sum of angles which is 180X(N-2) where N is the number of sides.
The exterior angles of any polygon are as many as their sides.
Any polygon with an even number of sides (vertices) in which at least one pair of opposite angles are of the same measure.
No, it is not true that a polygon with an odd number of angles cannot have congruent angles. A polygon can have an odd number of angles and still have some or all of them be congruent. For example, a regular pentagon has five angles that are all congruent, and a polygon with an odd number of sides can also have pairs of congruent angles.
A polygon has the same number of sides and angles.
I think it has the same because it just depends on how to split number they're looking 4
i don't really get the "same number of sides" ----- the angles of a polygon are the same with other angles within the polygon, if it is a regular polygon, and there a formula for getting the total sum of angles which is 180X(N-2) where N is the number of sides.
The exterior angles of any polygon are as many as their sides.
Any polygon with an even number of sides (vertices) in which at least one pair of opposite angles are of the same measure.
The number of angles on a polygon is the same number of sides the shape has.
No - the interior angles of a polygon must total at least 360 degrees.
No. A polygon has exactly the same number of angles as sides.
A polygon has exactly the same number of both internal and external angles to the number of sides. Assuming external angles count, there are two times the number of sides as the total number of angles
If you multiply 360 by the number of angles in the polygon and then subtract the sum of all the interior angles you will end up with the sum of all the exterior angles of the polygon.
The inside angles of a polygon are called "interior angles." The sum of the interior angles of a polygon can be calculated using the formula ( (n - 2) \times 180^\circ ), where ( n ) is the number of sides in the polygon. Each individual interior angle can be found by dividing the total sum by the number of angles (or sides) if the polygon is regular.