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What is the area of a cross-section that is parallel to face ABCD ?



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12
cm²
A rectangular prism containing dashed lines representing the hidden edges. The face nearest the viewer is a rectangle labeled A B C D with side A D labeled six centimeters and side D C labeled twelve centimeters. The face furthest from the viewer is labeled E F G H. Side C G is labeled thirty-six centimeters. The length of the prism is thirty-six centimeters, the width is twelve centimeters, and the height is six centimeters.

What is the area of a crosssection that is parallel to face ABCD Enter your answer in the box 12 cm A rectangular prism containing dashed lines representing the class=

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Answer:

Step-by-step explanation:

the area of a cross-section that is parallel to face ABCD = area of ABCD = 6*12 = 72 cm2

The area of a cross-section that is parallel to face ABCD is [tex]72cm^{2}[/tex]

Area of cross-section :

A diagram of cuboid is given .

We have to find the area of a cross-section that is parallel to face ABCD.

The cross section area is the area of a two-dimensional shape obtained when a three-dimensional object is cut  according to given condition.

The length  and width of surface ABCD is 12cm and 6cm respectively.

So that, cross section of surface ABCD will be the rectagle has length of 12cm and width of 6cm.

Thus, area of cross section = 12 * 6 = 72 square centimeters.

Learn more about the cross sectional area here:

https://brainly.com/question/4418420

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