We have \(S_{ABCD}=AB.BC=\frac{2}{3}BC.BC=\frac{2}{3}BC^2\)
So \(\frac{2}{3}BC^2=24\Rightarrow BC^2=36\Rightarrow BC=6\Rightarrow AB=4\) (cm)
\(\Rightarrow\) The perimeter of ABCD is \(2.\left(4+6\right)=20\left(cm\right)\)
Violympic toán 8
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Let ABCD be a trapezoid with bases AB, CD and O be the intersection of AC and BD. If the areas of triangle OAB, triangle OCD are 16cm2, 40cm2respectively and M is the midpoint of BD, then the area of the triangle AMD is .........cm2.
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P/s: As you may now, These are some questions from the 8 round of Math Violympic. Plz help me as much as you can! Thanks for all!