One figure is [b]similar[/b] to another if there is a sequence of rigid motions and dilations that takes the first figure so that it fits exactly over the second. [br][br]Translation and dilation takes triangle ABC onto triangle FDE so:[br] triangle ABC ~ triangle FDE[br] [img]data:image/png;base64,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[/img][br](we read ~ as “is similar to”)[br][img]data:image/png;base64,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[/img][br][br][br][br]Are the triangles below [b]similar[/b]?[br][br][img]data:image/png;base64,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[/img][br][br]

Write a sequence of transformations (translation, rotation, reflection, dilation) to take one triangle to the other.[br][br][br]

Write a similarity statement about the 2 figures, and explain how you know they are similar.[br]