If triangle CDE is dilated by a scale factor of 1/5 with a center of dilation at vertex E, what is the area of triangle C'D'E'?

A) 2 units2
B) 4 units2
C) 8 units2
D) 16 units2

The correct answer would be Choice B: 4 square units.

When the scale factor is 1/5, that means the lengths of the sides are 1/5 of the original size. So instead of having a base of 20 and height of 10, the new triangle has a base of 4 and a height of 2.

The area of the triangle is: (4 x 2) / 2 = 4

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david8644 david8644 · Answer 2 · 2019-09-20T23:29:51+02:00

Answer:

B) 4 units2

Step-by-step explanation:

The resultant triangle frmo the dilatation would have 1/5 of the size on each size, in the original triangle the base is 10 units and the height is 20 units, so 1/5 of 10 would be 2, and 1/5 of 20 would be 4, the resultant triangle from the dilatation at 1/5 would have an area of 4 squared units.

The area of the triangle is calculated with the next formula:

[tex]area=\frac{basexheight}{2} \\area=\frac{4x2}{2} \\Area=4u^{2}[/tex]

If triangle CDE is dilated by a scale factor of 1/5 with a center of dilation at vertex E, what is the area of triangle C'D'E'? A) 2 units2 B) 4 units2 C) 8 units2 D) 16 units2

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If triangle CDE is dilated by a scale factor of 1/5 with a center of dilation at vertex E, what is the area of triangle C'D'E'?

A) 2 units2
B) 4 units2
C) 8 units2
D) 16 units2