Question

arme a conta.
$\frac{34.10 {}^{15} }{946.10 {}^{12} } =$
por favor...​

Answer 1

$Resolução \\ \begin{gathered} \boxed{ \begin{array}{lr}{  \frac{34 \times {10}^{15} }{946 \times {10}^{12} } } \\ \\ \frac{34 \times \cancel{ {10}^{15} }}{34 \times \cancel{ {10}^{12} } } = \frac{34 \times {10}^{15\color{green} - 12} }{946} \\ \\ \: \: \: \: \: \: \: \: \: \frac{34 \times {10}^{\color{green}3} }{946} \\ \\ \frac{\cancel{34} \times {10}^{3} }{\cancel{946}} \: \: \: \: \: \: \: \: \: \: \frac{34 \div 2}{946 \div 2} = \frac{17}{473} \\ \\ \frac{\color{green}17\color{a} \times {10}^{3} }{\color{green}473} \\ \\ \frac{17 \times\color{green}1000 }{473} \\ \\ \color{green}\begin{gathered} \boxed{ \begin{array}{lr}{ Resolução: \frac{17000}{473} } \large \sf \: \large \sf \large \sf  \: \end{array}} \end{gathered} \large \sf \: \large \sf \large \sf  \: \end{array}} \end{gathered}$

${\huge\boxed { {\bf{E}}}\boxed { \red {\bf{a}}} \boxed { \blue {\bf{s}}} \boxed { \gray{\bf{y}}} \boxed { \red {\bf{}}} \boxed { \orange {\bf{Math}}}}$