How to find the surface area of a prism - ISEE Upper Level Quantitative Reasoning
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Find the surface area of a non-cubic prism with the following measurements:
Find the surface area of a non-cubic prism with the following measurements:
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The surface area of a non-cubic prism can be determined using the equation:
The surface area of a non-cubic prism can be determined using the equation:
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The above diagram shows a rectangular solid. The shaded side is a square. In terms of 
, give the surface area of the box.
The above diagram shows a rectangular solid. The shaded side is a square. In terms of
Tap to reveal answer
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces): 
Left, right (two surfaces): 
The total surface area: 
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces):
Left, right (two surfaces):
The total surface area:
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Find the surface area of a non-cubic prism with the following measurements:
Find the surface area of a non-cubic prism with the following measurements:
Tap to reveal answer
The surface area of a non-cubic prism can be determined using the equation:
The surface area of a non-cubic prism can be determined using the equation:
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The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.
The above diagram shows a rectangular solid. The shaded side is a square. In terms of
Tap to reveal answer
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces):
Left, right (two surfaces):
The total surface area:
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces):
Left, right (two surfaces):
The total surface area:
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Find the surface area of a non-cubic prism with the following measurements:
Find the surface area of a non-cubic prism with the following measurements:
Tap to reveal answer
The surface area of a non-cubic prism can be determined using the equation:
The surface area of a non-cubic prism can be determined using the equation:
← Didn't Know|Knew It →
The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.
The above diagram shows a rectangular solid. The shaded side is a square. In terms of
Tap to reveal answer
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces):
Left, right (two surfaces):
The total surface area:
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces):
Left, right (two surfaces):
The total surface area:
← Didn't Know|Knew It →
Find the surface area of a non-cubic prism with the following measurements:
Find the surface area of a non-cubic prism with the following measurements:
Tap to reveal answer
The surface area of a non-cubic prism can be determined using the equation:
The surface area of a non-cubic prism can be determined using the equation:
← Didn't Know|Knew It →
The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.
The above diagram shows a rectangular solid. The shaded side is a square. In terms of
Tap to reveal answer
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces):
Left, right (two surfaces):
The total surface area:
A square has four sides of equal length, as seen in the diagram below.
All six sides are rectangles, so their areas are equal to the products of their dimensions:
Top, bottom, front, back (four surfaces):
Left, right (two surfaces):
The total surface area:
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