[br]Find the length of this segment to [math]\frac{1}{8}[/math]the nearest  of a 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[/img]

Find the length of this segment to the nearest 0.1 of a 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[/img]

Estimate the length of this segment to the nearest [math]\frac{1}{8}[/math] of a unit.[br][br][img]data:image/png;base64,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[/img]

Estimate the length to the nearest 0.1 of a unit.[br][br][img]data:image/png;base64,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[/img]

Describe a rigid transformation that takes [math]ABC[/math] to the triangle you selected.

If the perimeter of the square is 40 units, what is the perimeter of each L-shaped region?

Explain how you know.

Describe a rigid transformation that takes Triangle A to Triangle B displayed below.