To complete the partial products, we'll first need to determine what numbers might be multiplied together to generate the different products A, B, C, and D. However, without further information about what each product is supposed to equal, we can only make assumptions based on the available values.
Let's make some educated guesses for common pairings:
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Product A: Could potentially be \( 10 \times 0.4 = 4 \) or \( 4 \times 2 = 8 \)
- Choose: 0.4, 10 or 2, 4
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Product B: Might be \( 8 \times 10 = 80 \) or \( 2 \times 4 = 8 \)
- Choose: 8, 10 or 2, 4
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Product C: Could align with something like \( 0.8 \times 10 = 8 \) or \( 20 \times 4 = 80 \)
- Choose: 0.8, 10 or 20, 4
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Product D: Could be \( 20 \times 2 = 40 \) or \( 100 \times 0.4 = 40 \)
- Choose: 20, 2 or 100, 0.4
Since you mentioned not all choices will be used, here is an example of what they might look like:
- Product A = 0.4, 10
- Product B = 2, 4
- Product C = 0.8, 10
- Product D = 20, 2
These are just examples, and the actual values may differ based on the intended multiplication scenarios. If you provide additional information about the products, I can help you complete the boxes more accurately!
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