How to find the surface area of a prism - ISEE Upper Level Quantitative Reasoning

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Question

Find the surface area of a non-cubic prism with the following measurements:

Answer

The surface area of a non-cubic prism can be determined using the equation:

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Question

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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): $15 \cdot 15 =225$

The total surface area: $4 \cdot 15x + 2 \cdot 225 = 60x + 450$

Compare your answer with the correct one above

Question

Find the surface area of a non-cubic prism with the following measurements:

Answer

The surface area of a non-cubic prism can be determined using the equation:

Compare your answer with the correct one above

Question

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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): $15 \cdot 15 =225$

The total surface area: $4 \cdot 15x + 2 \cdot 225 = 60x + 450$

Compare your answer with the correct one above

Question

Find the surface area of a non-cubic prism with the following measurements:

Answer

The surface area of a non-cubic prism can be determined using the equation:

Compare your answer with the correct one above

Question

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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): $15 \cdot 15 =225$

The total surface area: $4 \cdot 15x + 2 \cdot 225 = 60x + 450$

Compare your answer with the correct one above

Question

Find the surface area of a non-cubic prism with the following measurements:

Answer

The surface area of a non-cubic prism can be determined using the equation:

Compare your answer with the correct one above

Question

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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): $15 \cdot 15 =225$

The total surface area: $4 \cdot 15x + 2 \cdot 225 = 60x + 450$

Compare your answer with the correct one above

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How to find the surface area of a prism - ISEE Upper Level Quantitative Reasoning

Find the surface area of a non-cubic prism with the following measurements:

The surface area of a non-cubic prism can be determined using the equation:

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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:

Find the surface area of a non-cubic prism with the following measurements:

The surface area of a non-cubic prism can be determined using the equation:

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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:

Find the surface area of a non-cubic prism with the following measurements:

The surface area of a non-cubic prism can be determined using the equation:

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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:

Find the surface area of a non-cubic prism with the following measurements:

The surface area of a non-cubic prism can be determined using the equation:

The above diagram shows a rectangular solid. The shaded side is a square. In terms of , give the surface area of the box.

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: