Because a rhombus which is rotated through 180 degrees will coincide with itself.
A rhombus has an order of rotational symmetry of 2. This means that it can be rotated by 180 degrees and still look the same, and it can also be rotated by 360 degrees, which brings it back to its original position. In essence, there are two distinct orientations in which a rhombus can appear identical during rotation.
A parallelogram has rotational symmetry of order 2.
parallelogram * * * * * A parallelogram does have rotational symmetry (order 2).
It is in the order of 2
A rectangle.
Yes, of order 2.
There is reflective symmetry about each of the diagonals as well as rotational symmetry or order 2.
Yes a rhombus has 2 lines of symmetry. These lines of symmetry join its opposite corners.
It has rotational symmetry order 2. Its is also known as a diamond and is a special type of rectangle
A rhombus is one example.
A rhombus has an order of rotational symmetry of 2. This means that it can be rotated by 180 degrees and still look the same, and it can also be rotated by 360 degrees, which brings it back to its original position. In essence, there are two distinct orientations in which a rhombus can appear identical during rotation.
A line has rotational symmetry of order 2.
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.
It has rotational symmetry to the order of 2
A parallelogram has rotational symmetry of order 2.
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.
no shape does! * * * * * Not true. A parallelogram has rotational symmetry of order 2, but no lines of symmetry.