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
Yes, a cane does have rotational symmetry. A cane can be rotated 180 degrees and still appear the same, making it a symmetrical object. This is because a cane has a cylindrical shape with uniform features around its axis, allowing for rotational symmetry.
Not at all; pyramids could be either squashed down to a flattened version, or elongated to a taller version, and still be symmetrical.
A cone has infinitely many lines of symmetry. This is because any line passing through the apex (point) of the cone will divide it into two symmetrical halves. The cone's circular base also serves as a line of symmetry when paired with a corresponding line passing through the apex.
In chemistry, the concept of C4 symmetry refers to molecules that have a four-fold rotational symmetry axis. This means that the molecule can be rotated by 90 degrees and still look the same. Molecules with C4 symmetry often have unique properties and structures due to their symmetrical arrangement of atoms. This symmetry can affect the molecule's stability, reactivity, and overall behavior in chemical reactions.
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.
A rhombus is a quadrilateral that has no line of symmetry but has rotation symmetry. Rotation symmetry means that the shape can be rotated by a certain degree and still look the same. In the case of a rhombus, it has rotational symmetry of order 2, meaning it can be rotated by 180 degrees and still appear unchanged.
A rhombus is the type of quadrilateral that only has rotational symmetry. Rotational symmetry occurs when a shape can be rotated less than 360 degrees and still look the same. In the case of a rhombus, it has rotational symmetry of order 2, meaning it looks the same after a 180-degree rotation. This is because all sides of a rhombus are of equal length, making it symmetrical under rotation.
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.