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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 a line that a figure is flipped across to create a mirror imge of the original figure?
It is a line of symmetry
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.
What is a dilation used to create an image larger than the original?
A dilation is a transformation that enlarges or reduces a figure by a scale factor relative to a fixed point called the center of dilation. When creating an image larger than the original, the scale factor is greater than 1. This process involves multiplying the coordinates of each point in the original figure by this scale factor, resulting in a proportionally larger image while maintaining its shape. Dilation is commonly used in various fields, including art, architecture, and graphic design.
What is scale factor of 0.7?
The scale factor of 0.7 indicates a reduction of size by 30%. When applied to geometric figures, it means that each dimension of the original shape is multiplied by 0.7, resulting in a smaller version of the figure. For example, if a length of a side is originally 10 units, applying a scale factor of 0.7 would reduce it to 7 units.
What is The original figure in a transformation?
It is the figure before any transformation was applied to it.
How do you solve dilation?
To solve a dilation problem, you first need to identify the center of dilation and the scale factor. The scale factor indicates how much larger or smaller the figure will be compared to the original. For each point on the original figure, you calculate the new coordinates by multiplying the distances from the center of dilation by the scale factor. Finally, plot the new points to create the dilated figure.
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 a line that a figure is flipped across to create a mirror imge of the original figure?
It is a line of symmetry
Suppose you copy a figure on a copier using the given size factor find the scale factor from the original figure to the copy in decimal form 150 percent?
1.25
How do you find the scale factor of dilation?
The scale factor is the ratio of any side of the image and the corresponding side of the original figure.
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.
What is a dilation used to create an image larger than the original?
A dilation is a transformation that enlarges or reduces a figure by a scale factor relative to a fixed point called the center of dilation. When creating an image larger than the original, the scale factor is greater than 1. This process involves multiplying the coordinates of each point in the original figure by this scale factor, resulting in a proportionally larger image while maintaining its shape. Dilation is commonly used in various fields, including art, architecture, and graphic design.
How does the size of an image compare to the original figure undergoes a dilation with a scale factor of one?
A scale factor of one means that there is no change in size.
What is scale factor of 0.7?
The scale factor of 0.7 indicates a reduction of size by 30%. When applied to geometric figures, it means that each dimension of the original shape is multiplied by 0.7, resulting in a smaller version of the figure. For example, if a length of a side is originally 10 units, applying a scale factor of 0.7 would reduce it to 7 units.
Transformation that enlarges or reduces a figure?
Scaling changes the size of a figure. If the scale factor is greater than 1, the figure is enlarged; if the scale factor is less than 1, the figure is reduced. I the scale factor is equal to 1, the figure's size is unchanged. If there is a centre of enlargement, the new figure can be drawn exactly by multiplying the distance of every point from the centre of enlargement, multiplying this by the scale factor and drawing the new point at this distance from the centre of enlargement. (For a polygonal figure, only the vertices need be measured and the lines between the vertices of the original figure drawn in). With a centre of enlargement, the scale factor can be negative. In this case, the distance to the new points is measured on the opposite side of the centre to the original points, so that it is a straight line form the original point, through the centre to the new point.
How do you find the scale factor of a figure to a similar figure?
To find the scale factor of a figure to a similar figure, you can compare corresponding linear dimensions, such as side lengths or heights. Divide the length of a side of the original figure by the length of the corresponding side of the similar figure. The resulting value is the scale factor, which indicates how much larger or smaller one figure is compared to the other. Ensure that both figures are oriented similarly for an accurate comparison.
