Rotational symmetry along one axis.
Axisymmetry is a form of symmetry around an axis - also known as rotational symmetry.
It can be thought of rotational symmetry along the axis
It have 4 axis of symmetry . Two Perpendiculars and two Diagonals
It is the axis of symmetry which is a line such that a object that is rotated at right angles to it becomes congruent to its original state before the angle of rotation reaches 360 degrees.
It depends upon the pyramid: if it is a right rectangular pyramid it will have one axis of rotational symmetry which runs from the apex to the centre of the base and a rotational symmetry of 2. If it is not a right rectangular pyramid then there is no axis of rotation which will permit the pyramid to fit on itself before a complete rotation of 360°
Rotational symmetry along one axis.
Reflectional symmetry
Axisymmetry is a form of symmetry around an axis - also known as rotational symmetry.
If the central point of the straight line is placed exactly on the middle, and such central point has an axis, it will have a rotational symmetry.
It can be thought of rotational symmetry along the axis
The earth will have both rotational and circular motions. Rotational motion because of the earth rotating about its own axis(axis joining the line north and south poles). Circular motion because of moving around the sun.
It have 4 axis of symmetry . Two Perpendiculars and two Diagonals
It is the axis of symmetry which is a line such that a object that is rotated at right angles to it becomes congruent to its original state before the angle of rotation reaches 360 degrees.
Nothing. (Except if you count z axis and you get into 3D!)
Not exactly. Rotational symmetry means that a shape will look the same if the object is rotated around some axis, by ANY angle.There are no specific requirements as to where the axis must be.
Not exactly. Rotational symmetry means that a shape will look the same if the object is rotated around some axis, by ANY angle.There are no specific requirements as to where the axis must be.