To find the surface area of a rectangular prism, you can use the formula:
\[ \text{Surface Area} = 2(lw + lh + wh) \]
where:
- \( l \) is the length,
- \( w \) is the width,
- \( h \) is the height.
In this case, the dimensions are:
- Length (\( l \)) = 17 cm
- Width (\( w \)) = 10 cm
- Height (\( h \)) = 4 cm
Now, plug in these values into the formula:
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Calculate \( lw \): \[ lw = 17 \times 10 = 170 , \text{cm}^2 \]
-
Calculate \( lh \): \[ lh = 17 \times 4 = 68 , \text{cm}^2 \]
-
Calculate \( wh \): \[ wh = 10 \times 4 = 40 , \text{cm}^2 \]
Now, add these areas together: \[ lw + lh + wh = 170 + 68 + 40 = 278 , \text{cm}^2 \]
Now multiply the total by 2 to get the surface area: \[ \text{Surface Area} = 2 \times 278 = 556 , \text{cm}^2 \]
So, Jerry needs 556 cm² of wrapping paper to wrap the present.