e. \( 0.6 \times 0.3= \) \( =\frac{6}{10} \times \frac{3}{10}= \) \( =\frac{6 \times 3}{100}= \)

Imagine you're throwing a game of basketball and trying to calculate your shooting percentage! Now, when you multiply \(0.6\) by \(0.3\), you're not just doing math; you're finding out how likely two independent events might occur! In this case, the result is \(0.18\), or \(18\%\), which means if you made \(60\%\) of your shots and \(30\%\) of your teammates, together they create a combined likelihood of scoring \(18\%\). Next up, let's break down those fractions! By transforming the decimals into fractions, you found \( \frac{6}{10} \times \frac{3}{10} \) and simplified that to \( \frac{18}{100} \), which is actually another fun way to see percentages in action! Just remember, whenever you simplify fractions, you’re honing your math skills for everyday decisions, like budgeting or cooking—just think of it as a recipe for success!