Asked by jayla
Using a number line, what whole number and rational number to the nearest half is 10−−√
between?(1 point)
10−−√
is between
and
.
between?(1 point)
10−−√
is between
and
.
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To find the whole number and the rational number to the nearest half that the square root of 10 (\(\sqrt{10}\)) falls between, let's first calculate \(\sqrt{10}\):
\[
\sqrt{10} \approx 3.162
\]
Next, we need to identify the whole number that \(\sqrt{10}\) is closest to. The whole numbers surrounding \(3.162\) are \(3\) and \(4\). Therefore, \(\sqrt{10}\) is between \(3\) and \(4\).
Now, we will find the rational number to the nearest half. The nearest halves surrounding \(3.162\) are \(3.0\) and \(3.5\). Since \(3.162\) is closer to \(3.0\) than to \(3.5\), we can conclude that \(\sqrt{10}\) is between \(3.0\) and \(3.5\).
Putting this all together:
\(\sqrt{10}\) is between **3** (whole number) and **3.0** (rational number to the nearest half).
\[
\sqrt{10} \approx 3.162
\]
Next, we need to identify the whole number that \(\sqrt{10}\) is closest to. The whole numbers surrounding \(3.162\) are \(3\) and \(4\). Therefore, \(\sqrt{10}\) is between \(3\) and \(4\).
Now, we will find the rational number to the nearest half. The nearest halves surrounding \(3.162\) are \(3.0\) and \(3.5\). Since \(3.162\) is closer to \(3.0\) than to \(3.5\), we can conclude that \(\sqrt{10}\) is between \(3.0\) and \(3.5\).
Putting this all together:
\(\sqrt{10}\) is between **3** (whole number) and **3.0** (rational number to the nearest half).
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