What is wrong with the statement $\sqrt[3]{7} \cdot \sqrt[3]{7} = 7$?
Choose the correct answer below.
A. Because $\sqrt[3]{7} = 7^{1/3}$, the expression on the left side of the equation is equal to $7^{2/3}$. The expression on the right side of the equation is equal to $7^1$, and $7^{2/3} \neq 7^1$.
B. There is nothing wrong with this statement.
C. Because $\sqrt[3]{7} = 7^3$, the expression on the left side of the equation is equal to $7^6$. The expression on the right side of the equation is equal to $7^1$, and $7^6 \neq 7^1$.
D. Because $\sqrt[3]{7} = 7^3$, the expression on the left side of the equation is equal to $7^6$. The expression on the right side of the equation is equal to $7^1$, and $7^6 \neq 7^1$.
