Let the matrix $A = \begin{bmatrix} 10^{30} + 5 & 10^{20} + 4 & 10^{20} + 6 \\ 10^4 + 2 & 10^8 + 7 & 10^{10} + 2n \\ 10^4 + 8 & 10^6 + 4 & 10^{15} + 9 \end{bmatrix}$,where $n \in N$. Then:
- A$A$ is invertible for all $n \in N$
- B$A$ is not invertible for all $n \in N$
- C$A$ may or may not be invertible depending on the value of $n \in N$
- DData insufficient
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