Here's the question you clicked on:
jkbo
A quadrilateral has vertices (2, 0), (0, –2), (–2, 4), and (–4, 2). Which special quadrilateral is formed by connecting the midpoints of the sides? a.kite b.rectangle c.trapezoid d.rhombus
The question is a bit messed up, if you want to be very accurate. The most accurate answer is a square, which can be belong in the rhombus category, which belongs in the trapezoid category. Funny right? \[squar e \subseteq rhombus \subseteq trapezoid\] But for this test, the most suitable answer is d.rhombus
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you get a parallelogram !!
you can find out the lengths of the sides of the quadrilateral ! you'll find two pair of equal sides...
Sorry sorry sorry, you are right. Damn I need some sleep :-p
@meera_yadav you graphed that completely wrong. The given coordinates make a rectangle...