To find the product of \(2.3 \times 0.61\), let's first calculate it:
\[ 2.3 \times 0.61 = 1.403 \]
Now, we need to express 1.403 using the numbers given: 0, 1, 2, 3, 4, 5, 6. It’s common to use decimals when necessary to represent such a value.
Using the numbers, you can represent \(1.403\) in the following way:
- \(1.4\) can be formed using \(1\) and \(0.4\) (which we can approximate using decimals).
- \(0.03\) can represent the \(0.003\) (softening the precision).
So, one possibility to form \(1.403\) would be:
- Use \(1\) as the whole number.
- Use \(0.4\) (approximately \(2/5\) or \(4/10\)).
- Use \(0.003\) for the decimal precision.
But if we are required only to use the exact numbers listed without decimals, we will be limited.
Here’s a simple expression you can use:
- \(1\) from the number \(1\),
- combined with \(0.4\) approximated (using \(0\) and other values).
However, without decimals in \(0, 1, 2, 3, 4, 5, 6\), creating \(1.403\) exactly might be complex since these numbers don't have decimal values as listed.
In summary, the actual value presentable without decimals won't yield \(1.403\) directly, based on typical numeric conventions given here; therefore, using decimals would be essential to express the final sum.
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