The answer will depend on the details of the spinner which you have not provided.
72
The answer will depend on the details of the spinner which you have not provided.
Because 180 degrees clockwise is the same as 180 degrees counterclockwise.
In two dimensions, the equations of rotation about the origin are: x' = x cos t - y sin t y' = x sin t + y cos t. where t is the angle of rotation, counterclockwise.
order of rotation of semicircle is 1. angle of rotation of semicircle is 360 degree. If you want to find angle of rotation of a shape, then divide 360 from order of rotation of a shape.
72
The answer will depend on the details of the spinner which you have not provided.
Rotation preserves shape - therefore the angle before the rotation equals the angle after the rotation.
Because 180 degrees clockwise is the same as 180 degrees counterclockwise.
1/4 of 360 degrees = 90 degrees which is a right angle
The earth's orbit is the path along which the earth travels around the sun. The earth's axis is always inclined to its orbital plane at an angle of 66 and a half degree. shannon is awesome
The transformation you're referring to is called rotation. In a rotation, each point of a figure is turned around a specific point, known as the center of rotation, through a specified angle and direction (clockwise or counterclockwise). This transformation preserves the shape and size of the figure while changing its orientation.
If you can rotate (or turn) a figure around a center point by fewer than 360° and the figure appears unchanged, then the figure has rotation symmetry. The point around which you rotate is called the center of rotation, and the smallest angle you need to turn is called the angle of rotation. This figure has rotation symmetry of 72°, and the center of rotation is the center of the figure:
The movement of a figure to a new position by turning it around a point is known as rotation. In geometry, this involves rotating the figure about a fixed point, called the center of rotation, by a certain angle. The distance from the center of rotation to any point on the figure remains constant during this transformation. Rotations can occur in both clockwise and counterclockwise directions.
In mathematics, the angle of rotation refers to the measure of the angle through which a figure or object is rotated around a fixed point, typically the origin in a coordinate system. It is usually expressed in degrees or radians and can be positive (indicating a counterclockwise rotation) or negative (indicating a clockwise rotation). This concept is essential in geometry, trigonometry, and various applications involving transformations and symmetry.
In mathematics, the angle of rotation is a measurement of the amount, the angle, that afigure is rotated about a fixed point, often the center of a circle.For example, the carts on a Ferris wheel move along a circle around the center point of that circle. If a cart moves around the wheel once, the angle of rotation is 360 degrees. If the cart was stuck halfway, at the top of the wheel, at that point its angle of rotation was only 180 degrees.
In geometry, a rotation refers to the movement of a figure around a fixed point, called the center of rotation. The figure remains the same shape and size, but it changes its position, orientation, or both. A rotation can be either clockwise or counterclockwise, and is measured in degrees.