To determine the area of the rectangle, we need the lengths of its sides, which are usually denoted as length (l) and width (w).
In your provided data, you listed several numbers:
- 26 units²
- 22 units
- 52 units
- 11 units
However, it is unclear which of these numbers correspond to the length and width of the rectangle.
Typically, the area \( A \) of a rectangle is calculated with the formula: \[ A = l \times w \]
Given the options, let’s first identify potential length and width:
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If we take 22 units and 26 units, then: \[ A = 22 \times 26 = 572 \text{ units}^2 \]
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If we take 22 units and 52 units, then: \[ A = 22 \times 52 = 1144 \text{ units}^2 \]
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If we take 26 units and 52 units, then: \[ A = 26 \times 52 = 1352 \text{ units}^2 \]
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Lastly, if we take 22 units and 11 units, then: \[ A = 22 \times 11 = 242 \text{ units}^2 \]
However, there is no clear indication in your question as to which dimensions apply to the rectangle.
For the four options you provided, it seems that the total area for 26 units² could potentially be a misinterpretation of the area, or it could relate to dimensions such as length or width.
Please clarify which two values relate to the dimensions of the rectangle, and I can help determine the area accordingly.
1 answer