Copy of IM Geo.1.2 Practice: Constructing Patterns

This diagram was created by starting with points A and B and using only straightedge and compass to construct the rest. All steps of the construction are visible.
Describe precisely the straightedge and compass moves required to construct the line [math]CD[/math] in this diagram.
[size=150]In the construction, [math]A[/math] is the center of one circle, and [math]B[/math] is the center of the other. 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[/img][br][size=100]Identify [b]all [/b]segments that have the same length as segment [/size][math]AB[/math].[/size]
This diagram was constructed with straightedge and compass tools.  [math]A[/math] is the center of one circle, and [math]C[/math] is the center of the other. 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[/img][br]Select [b]all[/b] line segments that [i]must[/i] have the same length as segment[math]AB[/math].
[size=150]Clare used a compass to make a circle with radius the same length as segment [math]AB[/math]. She labeled the center [math]C[/math]. 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[/img][br]Which statement must be true?
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Information: Copy of IM Geo.1.2 Practice: Constructing Patterns