To rewrite the expression \( 2712 \cdot 2714 \), we can use the property of exponents that states \( a^m \cdot a^n = a^{m+n} \).
Here, we can combine the two terms: \[ 2712 \cdot 2714 = 27^{12} \cdot 27^{14} = 27^{12 + 14} = 27^{26} \]
While this specific option is not present among the responses you provided, you might have meant to simplify the expression or find another representation. Unfortunately, the exact forms don't seem to match with the rewritten expression \( 27^{26} \).
If you want to visually represent \( 2712 \cdot 2714 \) more simply or find another expression equivalent, please clarify the context, and I'll be glad to assist!
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