$$=\frac{(1.2\times10^{-2})^{2}}{(1.5\times10^{-2})(3.0\times10^{-2})^{3}}$$
$\frac{3200}{9}\approx 355.555555556$
$$\frac{\left(1.2\times \frac{1}{100}\right)^{2}}{1.5\times 10^{-2}\times \left(3\times 10^{-2}\right)^{3}}$$
$$\frac{\left(\frac{3}{250}\right)^{2}}{1.5\times 10^{-2}\times \left(3\times 10^{-2}\right)^{3}}$$
$$\frac{\frac{9}{62500}}{1.5\times 10^{-2}\times \left(3\times 10^{-2}\right)^{3}}$$
$$\frac{\frac{9}{62500}}{1.5\times \frac{1}{100}\times \left(3\times 10^{-2}\right)^{3}}$$
$$\frac{\frac{9}{62500}}{\frac{3}{200}\times \left(3\times 10^{-2}\right)^{3}}$$
$$\frac{\frac{9}{62500}}{\frac{3}{200}\times \left(3\times \frac{1}{100}\right)^{3}}$$
$$\frac{\frac{9}{62500}}{\frac{3}{200}\times \left(\frac{3}{100}\right)^{3}}$$
$$\frac{\frac{9}{62500}}{\frac{3}{200}\times \frac{27}{1000000}}$$
$$\frac{\frac{9}{62500}}{\frac{81}{200000000}}$$
$$\frac{9}{62500}\times \frac{200000000}{81}$$
$$\frac{3200}{9}$$
Show Solution
Hide Solution
$\frac{2 ^ {7} \cdot 5 ^ {2}}{3 ^ {2}} = 355\frac{5}{9} = 355.55555555555554$
