do you mean
$$\\log_3 x + 11 log_3 x^3 = 14\\\\
log_3 x + 33 log_3 x = 14\\\\
34 log_3 x = 14\\\\
log_3 x = \frac{14}{34}\\\\
\frac{logx}{log3} = \frac{14}{34}\\\\
logx = \frac{14}{34}\times log3\\\\
10^{logx} =10^{\left( \frac{14}{34}\times log3\right)}\\\\
x =10^{\left( \frac{7}{17}\times log3\right)}\\\\$$
$${{\mathtt{10}}}^{\left({\frac{{\mathtt{7}}}{{\mathtt{17}}}}{\mathtt{\,\times\,}}{log}_{10}\left({\mathtt{3}}\right)\right)} = {\mathtt{1.572\: \!033\: \!125\: \!399\: \!619\: \!1}}$$
do you mean
$$\\log_3 x + 11 log_3 x^3 = 14\\\\
log_3 x + 33 log_3 x = 14\\\\
34 log_3 x = 14\\\\
log_3 x = \frac{14}{34}\\\\
\frac{logx}{log3} = \frac{14}{34}\\\\
logx = \frac{14}{34}\times log3\\\\
10^{logx} =10^{\left( \frac{14}{34}\times log3\right)}\\\\
x =10^{\left( \frac{7}{17}\times log3\right)}\\\\$$
$${{\mathtt{10}}}^{\left({\frac{{\mathtt{7}}}{{\mathtt{17}}}}{\mathtt{\,\times\,}}{log}_{10}\left({\mathtt{3}}\right)\right)} = {\mathtt{1.572\: \!033\: \!125\: \!399\: \!619\: \!1}}$$