Angle ABC is taken by a dilation with center P and scale factor 3 to angle A'B'C'. The measure of angle ABC is 21 degrees. What is the measure of angle A'B'C'?[br][br][br]

Select [b]all [/b]lines that could be the image of line [i]m[/i] by a dilation.[br][img]data:image/png;base64,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[/img]

Dilate line [i]f[/i] with a scale factor of 2. The image is line [i]g[/i]. Which labeled point could be the center of this dilation?[br][img]data:image/png;base64,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[/img]

Quadrilateral A'B'C'E' is the image of quadrilateral ABCE after a dilation centered at F. [br]What is the scale factor of this dilation?[br][img]data:image/png;base64,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[/img]

A polygon has a perimeter of 18 units. It is dilated with a scale factor of 3/2. What is the perimeter of its image?

Solve the equation. [br][img]data:image/png;base64,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[/img][br][br]