To determine which sign makes the statement true, we need to compare the numbers \(3\), \(70\), and \(\pi\) (approximately \(3.14\)).
If we are examining the relationship between the numbers and looking to compare \(3\) and \(70\) with \(\pi\), here are the possible comparisons:
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If you're comparing \(3\) and \(\pi\):
- The statement \(3 < \pi\) is true since \(3 < 3.14\).
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If you're comparing \(70\) and \(\pi\):
- The statement \(\pi < 70\) is also true since \(3.14 < 70\).
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If you're comparing \(3\) and \(70\):
- The statement \(3 < 70\) is true.
So, if we consider a statement such as \(3 , ? , \pi , ? , 70\), we can conclude the relationships:
- \(3 < \pi\)
- \(3 < 70\)
- \(\pi < 70\)
To summarize, the comparisons can use \(<\) for each of the statements to remain true:
- \(3 < \pi\)
- \(\pi < 70\)
If you meant to craft a single valid statement between \(3\), \(70\), and \(\pi\) (like \(3 ? \pi\) or \(\pi ? 70\)), the common sign would be \(<\) for all valid comparisons.
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