The area of a cross section perpendicular to the base of a rectangular prism is 45 square inches. If the length and width of the base are 5 inches each, what is the height of the prism? The height of the prism is BLANK inches.

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vijayalalitha vijayalalitha · Answer 1 · 2020-03-06T06:48:06+01:00

The height of the prism is [tex]2.25 \ in[/tex]

Explanation:

It is given that the area of the cross section of the rectangular prism is 45 square inches.

Length of the rectangular prism is [tex]5 \ in[/tex]

Width of the rectangular prism is [tex]5 \ in[/tex]

To determine the height of the prism, let us substitute these values in the formula [tex]SA=(2l+2w)h[/tex] , we get,

[tex]45=(2(5)+2(5))h[/tex]

Multiplying the terms within the bracket, we get,

[tex]45=(10+10)h[/tex]

Adding the terms within the bracket, we have,

[tex]45=20h[/tex]

Dividing both sides by 20, we get,

[tex]2.25=h[/tex]

Thus, the height of the rectangular prism is [tex]2.25 \ in[/tex]

Ashardalor Ashardalor · Answer 2 · 2022-05-18T18:16:28+02:00

Answer:

3.6

Step-by-step explanation:

The Correct answer is 3.6.

We know that a cross section is a part of the Rectangular Prism.

It should be in the Exact middle of the Rectangular Prism.

So 45•2=90

90÷25=3.6

3.6 is the answer.

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