Geometry (A): COMPLETE: Guided Practice

Complete the following questions. The answers are listed below for you to check yourself.

Review Questions

$R,S,T,U$ are midpoints of sides of triangles $\triangle XPO$ and $\triangle YPO$ .

Complete the following:

If $OP = 12$ , then $RS=$ ___ and $TU =$ ___.
If $RS = 8$ , then $TU =$ ____.
If $RS = 2x$ and $OP = 18$ , then $x =$ ___and $TU =$ ___.
If $OP = 4x$ and $RS = 6x-8$ , then $x =$ _____.
Consider triangle with vertices and midpoint on .
1. Find the coordinates of point $M$ .
2. Use the Midsegment Theorem to find the coordinates of the point $N$ on side $\overline{YZ}$ that makes $\overline{MN}$ the midsegment.
For problem 5, describe another way to find the coordinates of point $N$ that does not use the Midsegment Theorem.

In problems 7-8, the segments join the midpoints of two sides of the triangle. Find the values of $x$ and $y$ for each problem.

In triangle $\triangle XYZ$ , sides $\overline{XY}, \overline{YZ}$ , and $\overline{ZX}$ have lengths $26,38$ and $42$ respectively. Triangle $\triangle RST$ is formed by joining the midpoints of $\triangle XYZ$ . Find the perimeter of $\triangle RST$ .
1. For the original triangle $\triangle XYZ$ of 9, find its perimeter and compare to the perimeter of $\triangle RST$ .
2. Can you state a relationship between a triangle’s perimeter and the perimeter of the triangle formed by connecting its midsegments?

Review Answers

$RS = 6$ and $TU = 6$
$TU = 8$
$x = \frac{9}{2}, TU = 9$
$x = 2$
1. $M(2,5)$
2. $N(4,7)$
Find midpoint $M$ and then the slope of $\overline{XY}$ . Find the line through $M$ parallel to $\overline{XY}$ (line $l_1$ ). Find the equation of the line that includes $\overline{YZ}$ (line $l_2$ ). Find the intersection of lines $l_1$ and $l_2$ .
$x = 5$ , $y = 3$
$x = 7$ , $y = \frac{7} {2}$
$P = 53$
1. The perimeter of $\triangle XYZ$ is $106.$ The perimeter of $\triangle RST$ is $53.$
2. The perimeter of the midsegment triangle will always be half the perimeter of the original triangle.

Last modified: Monday, May 10, 2010, 7:44 PM