Finding length of line that intersects trapezoid diagonals.
By Daniel Johnston
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In trapezoid $ABCD,$ base $\overline{AB}$ has length 6, and base $\overline{CD}$ has length 18. A line passes through the intersection of the diagonals, parallel to the bases. This line intersects $\overline{AD}$ and $\overline{BC}$ at $X$ and $Y,$ respectively. Find $XY.$
I thought to try and get the value of XY I could maybe make a proportion using the median. I don't really understand how I'd go about incorporating the diagonal lengths to find the length of a line that intersects through their intersection point.
$\endgroup$ 12 Answers
$\begingroup$Let AC and BD cross at O. Then, the similar triangles lead to$\frac{XO}{AB}= \frac{XD}{DA},\> \frac{XO}{DC}= \frac{XA}{AD}$. Add up the two ratios to get
$$\frac{XO}{AB}+ \frac{XO}{DC}=1 $$which yields $XO = \frac{AB\cdot DC}{AB+DC}=\frac92$. Likewise, $YO= \frac92$. Thus, $XY = XO +YO =9$.
$\endgroup$ $\begingroup$Let the intersection of the diagonals be $O$.
Show that
- $\frac{OA}{OC} = \frac{6}{18}$.
- $\frac{ OY } { AB} = \frac{OC } { AC} = \frac{ 18} { 18 + 6 } $.
- $ OY = 4.5$.
- Similarly, $OX = 4.5$, so $XY = 9$.
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