Problem:
Let ABCD be a parallelogram and let AAβ²,BBβ²,CC, and DDβ² be parallel rays in space on the same side of the plane determined by ABCD. If AAβ²=10, BBβ²=8,CCβ²=18,DDβ²=22, and M and N are the midpoints of Aβ²Cβ² and Bβ²Dβ², respectively, then MN=
Answer Choices:
A. 0
B. 1
C. 2
D. 3
E. 4
Solution:
Let O be the intersection of AC and BD. Then O is the midpoint of AC and BD, so OM and ON are the midlines in trapezoids ACCβ²Aβ² and BDDβ²Bβ², respectively. Hence OM=(10+18)/2=14 and ON=(8+22)/2=15. Since OMβ₯AAβ²,ONβ₯BBβ², and AAβ²β₯BBβ², it follows that O,M, and N are collinear. Therefore,
MN=β£OMβONβ£=β£14β15β£=1
Note. In general, if AAβ²=a,BBβ²=b,CCβ²=c, and DDβ²=d, then MN=β£aβb+cβdβ£/2.
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