Well, in my logic it has rotational symmetry of order one because you can turn it 360 degrees and return it back to its original position. However, when it is order 1, it is apparently said that it doesn't have any rotational symmetry.
no
A scalene triangle has one order of rotational symmetry.
An equilateral triangle has both line symmetry and rotational symmetry. A non-equilateral isosceles triangle has line symmetry but not rotational symmetry. A scalene triangle has neither kind of symmetry.
None.
It depends on the type of triangle. A scalene triangle (no equal sides) has no rotational symmetry. An isosceles triangle (2 equal sides) has rotational symmetry order 2. An equilateral triangle (3 equal sides) has rotational symmetry order 3. The order of rotational symmetry is how many time a shape will fit over itself during one complete rotation.
Yes, an equilateral triangle has rotational symmetry of order 3.
A scalene triangle has one order of rotational symmetry.
Rotational symmetry of order 1.
An equilateral triangle has both line symmetry and rotational symmetry. A non-equilateral isosceles triangle has line symmetry but not rotational symmetry. A scalene triangle has neither kind of symmetry.
Isosceles and scalene.
None.
Scalene triangle * * * * * A scalene triangle does not have rotational symmetry of order 3. The triskelion (the three legs) on the Isle of Man flag, or a simplified version of that shape will meet the requirements.
It depends on the type of triangle. A scalene triangle (no equal sides) has no rotational symmetry. An isosceles triangle (2 equal sides) has rotational symmetry order 2. An equilateral triangle (3 equal sides) has rotational symmetry order 3. The order of rotational symmetry is how many time a shape will fit over itself during one complete rotation.
A scalene triangle has no lines of symmetry.
a scalene triangle has no lines of symmetry
An isoceles triangle does not have rotational symmetry.
Only an equilateral triangle has rotational symmetry.
Yes, an equilateral triangle has rotational symmetry of order 3.