Geometry | Unit 1 | Lesson 9: Speedy Delivery | Practice Problems

Which construction can be used to determine whether point \(C\) is closer to point \(A\) or point \(B\)?

The diagram is a straightedge and compass construction. Lines \(\ell\), \(m\), and \(n\) are the perpendicular bisectors of the sides of triangle \(ABC\). Select all the true statements.

Decompose the figure into regions that are closest to each vertex. Explain or show your reasoning.

Which construction could be used to construct an isosceles triangle \(ABC\) given line segment \(AB\)?

Select all true statements about regular polygons.

This diagram shows the beginning of a straightedge and compass construction of a rectangle. The construction followed these steps: Start with two marked points \(A\) and \(B\) Use a straightedge to construct line \(AB\) Use a previous construction to construct a line perpendicular to \(AB\) passing through \(A\) Use a previous construction to construct a line perpendicular to \(AB\) passing through \(B\) Mark a point \(C\) on the line perpendicular to \(AB\) passing through \(A\) Explain the steps needed to complete this construction.

This diagram is a straightedge and compass construction. Is it important that the circle with center \(B\) passes through \(D\) and that the circle with center \(D\) passes through \(B\)? Show or explain your reasoning.