it is not symmetrical. welcome!
a circle has infinite line of symmetry, if you spin it, it has still got infinite linesso yes it is symmetrical
The upper case N has no line of symmetry because if you cut the N in half in any ways it will still not be symmetrical.
yes it could still be rotatonal symmetry
Not at all; pyramids could be either squashed down to a flattened version, or elongated to a taller version, and still be symmetrical.
Radially means something going straight out from a center, like the spokes on an old style wooden cartwheel. Symmetrical means something that looks the same on both sides of a center line. A bullseye target like ones used for tartget practise for instance would be radially symmetrical, any which way you turn it around its center it'd still look the same.
You turn it a quarter to see if it still has a line of symmetry.
symmetry principles always tell us something important. They often provide the most valuable clues toward deciphering the underlying principles of the cosmos, whatever those may be. In this sense, therefore, symmetry is certainly fruitful. Whether or not some all-encompassing symmetry is the grand principle that will necessitate our "theory-of-everything" is still to be determined.
Yes. Any even sided figure will have a rotational symmetry. Yes. If it is a regular shape such as a square, hexagon or octagon (equilateral and equiangular) then the rotational symmetry is the same as the number of sides. Rotational symmetry is basically if the shape is rotated, is it exactly the same as it was before. A hexagon can be rotated 6 times and still be the same without actually being in the the same postition, so a hexagon has a rotational symmetry of 6.
turn symmetry is when you turn your shape a fraction of a way in a circle and it still makes the same shape
No, the letter Y does not have rotational symmetry. It cannot be rotated and still appear the same.
an outliers can affect the symmetry of the data because u can still move around it
The rectangle's rotational symmetry is of order 2. A square's rotational symmetry is of order 4; the triangle has a symmetry of order 3. Rotational symmetry is the number of times a figure can be rotated and still look the same as the original figure.