QUESTION IMAGE
Question
- place an x in the appropriate cell to indicate whether each real number is rational or irrational. 2π, $sqrt3{12}$, $\frac{81}{99}$, -$sqrt{196}$, rational, irrational
Step1: Recall definition of rational and irrational numbers
A rational number can be written as a fraction $\frac{p}{q}$ where $p,q$ are integers and $q
eq0$. An irrational number cannot be written as such a fraction.
Step2: Analyze $2\pi$
Since $\pi$ is an irrational number and multiplying it by 2 does not change its irrational - nature, $2\pi$ is irrational.
Step3: Analyze $\sqrt[3]{12}$
The cube - root of 12 cannot be written as a fraction of two integers. So, $\sqrt[3]{12}$ is irrational.
Step4: Analyze $\frac{15}{99}$ and $\frac{81}{1}$
$\frac{15}{99}=\frac{5}{33}$ and $\frac{81}{1}$ are both fractions of integers. So, they are rational.
Step5: Analyze $-\sqrt{196}$
$-\sqrt{196}=- 14$, which can be written as $\frac{-14}{1}$. So, it is rational.
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| Number | Rational | Irrational |
|---|---|---|
| $\sqrt[3]{12}$ | X | |
| $\frac{15}{99}$ | X | |
| $\frac{81}{1}$ | X | |
| $-\sqrt{196}$ | X |