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The points D(4,−5)(4,−5), E(4,0)(4,0), F(−5,2)(−5,2), and G(−5,−3)(−5,−3) form parallelogram DEFG. Plot the points then click the "Graph Quadrilateral" button. Then find the perimeter of the parallelogram. Round your answer to the nearest tenth if necessary.

User FreshPow
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1 Answer

21 votes
21 votes

The coordinates of the parallelogram are given to be:


\begin{gathered} D=\left(4,-5\right) \\ E=\left(4,0\right) \\ F=\left(-5,2\right) \\ G=\left(-5,-3\right) \end{gathered}

The graph is shown below:

To get the perimeter of the shape, the lengths of the lines are to be calculated.

According to the property of a parallelogram, the opposite sides are equal. Therefore:


\begin{gathered} EF=DG \\ FG=ED \end{gathered}

The length of line ED can be calculated to be:


ED=0-(-5)=5\text{ units}

The length of line EF can be calculated using the distance formula:


\begin{gathered} EF=√((x_2-x_1)^2+(y_2-y_1)^2) \\ \therefore \\ EF=√((-5-4)^2+(2-0)^2) \\ EF=√(81+4) \\ EF=√(85) \end{gathered}

Therefore, the perimeter is calculated as follows:


Perimeter=2(5)+2(√(85))=28.4

ANSWER


Perimeter=28.4\text{ units}

The points D(4,−5)(4,−5), E(4,0)(4,0), F(−5,2)(−5,2), and G(−5,−3)(−5,−3) form parallelogram-example-1
User Jeroen Van Menen
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2.2k points
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