Let A=(2102)A = \begin{pmatrix} 2 & 1 \\ 0 & 2 \end{pmatrix}A=(2012). What is the value of A10A^{10}A10?
(21010⋅290210)\begin{pmatrix} 2^{10} & 10 \cdot 2^9 \\ 0 & 2^{10} \end{pmatrix}(210010⋅29210)
(21010210)\begin{pmatrix} 2^{10} & 1 \\ 0 & 2^{10} \end{pmatrix}(21001210)
(1024102401024)\begin{pmatrix} 1024 & 1024 \\ 0 & 1024 \end{pmatrix}(1024010241024)
(2102100210)\begin{pmatrix} 2^{10} & 2^{10} \\ 0 & 2^{10} \end{pmatrix}(2100210210)