To find the cubic root of 135, we can represent it mathematically as \( \sqrt[3]{135} \).
First, we can simplify it if possible. We can factor 135 into its prime factors:
\[ 135 = 27 \times 5 = 3^3 \times 5 \]
Now, we take the cubic root:
\[ \sqrt[3]{135} = \sqrt[3]{27 \times 5} = \sqrt[3]{27} \times \sqrt[3]{5} = 3\sqrt[3]{5} \]
So, the cubic root of 135 is:
\[ 3\sqrt[3]{5} \]
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