Tính hợp lí (nếu có thể): d) (2 . 6^ 9 − 2 ^5 . 18^ 4 )/(2^ 2 . 6^ 8) ;
Giải thích
d) \(\frac{{2\,.\,{6^9} - {2^5}\,.\,{{18}^4}}}{{{2^2}\,.\,{6^8}}}\)
\[ = \frac{{2\,.\,{{\left( {2\,.\,3} \right)}^9} - {2^5}\,.\,{{\left( {2\,.\,{3^2}} \right)}^4}}}{{{2^2}\,.\,{{\left( {2\,.\,3} \right)}^8}}}\]
\[ = \frac{{2\,.\,{2^9}\,.\,{3^9} - {2^5}\,.\,{2^4}\,.\,{3^8}}}{{{2^2}\,.\,{2^8}\,.\,{3^8}}}\]
\[ = \frac{{{2^{10}}\,.\,{3^9} - {2^9}\,.\,{3^8}}}{{{2^{10}}\,.\,{3^8}}}\]\[ = \frac{{{2^9}\,.\,{3^8}\left( {6 - 1} \right)}}{{{2^{10}}\,.\,{3^8}}}\].\[ = \frac{5}{2}\]..