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Describe how four turns can put a figure back in its original position?
what 4 turns can put a figure in its original positions
How do i describe how four turns can put a figure back in its original position?
To describe how four turns can return a figure to its original position, you can explain that each turn represents a rotation around a central point, typically 90 degrees. When you rotate a figure four times by 90 degrees, the total rotation amounts to 360 degrees, which is a full circle. Thus, after four turns, the figure aligns perfectly with its initial orientation, effectively returning it to its original position. This concept can be visualized easily with shapes like squares or circles.
What is a four sided figure called?
A four sided figure is called a quadrilateral.
How does a dilation of a figure with a scale factor 0.5 compare to a dilation of the figure worth a scale factor 2?
A dilation with a scale factor of 0.5 reduces the size of the figure to half its original dimensions, resulting in a smaller figure. In contrast, a dilation with a scale factor of 2 enlarges the figure to twice its original dimensions, creating a larger figure. Therefore, the two dilations produce figures that are similar in shape but differ significantly in size, with the scale factor of 2 yielding a figure that is four times the area of the figure dilated by 0.5.
What is the scale factor that doubles the size of a figure is?
The scale factor that doubles the size of a figure is 2. When a figure is enlarged by a scale factor of 2, all its dimensions—such as length, width, and height—are multiplied by 2, resulting in a figure that has four times the area and eight times the volume of the original.
Describe how four turns can put a figure back in its original position?
what 4 turns can put a figure in its original positions
How do i describe how four turns can put a figure back in its original position?
To describe how four turns can return a figure to its original position, you can explain that each turn represents a rotation around a central point, typically 90 degrees. When you rotate a figure four times by 90 degrees, the total rotation amounts to 360 degrees, which is a full circle. Thus, after four turns, the figure aligns perfectly with its initial orientation, effectively returning it to its original position. This concept can be visualized easily with shapes like squares or circles.
What is the highest number of turns in a figure skating jump that a man has done in competition?
Four Turns
How can four turns put a figure in its oringinal position?
If you start at point A, go to point B, turn and go to point C, turn and go to point D, turn and go to point E, and turn and go to point A.
How many forms of the figure four leg lock are there?
2,shawn michael's 1 legged and ric flair's original
When was Figure Four created?
Figure Four was created in 1996.
What are the four major adverse side effect of scan conversion?
staircase,unequal brightness,distorted image,deviation from original position
What is a four sided figure called?
A four sided figure is called a quadrilateral.
What is a figure with four sides and four vertices?
If it is a 2-dimensional figure then it is a quadrilateral. If it is a 3-dimensional figure then it is a tetrahedron.
How does a dilation of a figure with a scale factor 0.5 compare to a dilation of the figure worth a scale factor 2?
A dilation with a scale factor of 0.5 reduces the size of the figure to half its original dimensions, resulting in a smaller figure. In contrast, a dilation with a scale factor of 2 enlarges the figure to twice its original dimensions, creating a larger figure. Therefore, the two dilations produce figures that are similar in shape but differ significantly in size, with the scale factor of 2 yielding a figure that is four times the area of the figure dilated by 0.5.
How do koalas move?
They use their four legs, moving one leg further than its original position multiple times to move around.
Name of a four sided figure?
The name of a four sided figure (or shape) is called a Square. :)
