To rewrite the expression \( 2712 \cdot 2714 \), we can use properties of exponents.
We can express it as follows:
\[
2712 \cdot 2714 = 27^{12} \cdot 27^{14} = 27^{12+14} = 27^{26}
\]
Now, let's rewrite your given expressions for clarity if needed:
1. \( 27^{\frac{1}{4}} \) is equivalent to \( \sqrt[4]{27} \) (the 4th root of 27).
2. \( 27^{\frac{1}{3}} \) is equivalent to \( \sqrt[3]{27} \) (the cube root of 27).
3. \( 27^{\frac{1}{8}} \) is equivalent to \( 27^{1/8} \) (27 to the power of 1/8).
4. \( 27^{\frac{3}{4}} \) is equivalent to \( 27^{3/4} \) (27 to the power of 3/4).
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