Improper Fractions and Write each improper fraction as a mix 4) \( \frac{11}{3}= \) \( \qquad \) 2. \( \frac{19}{5}= \) \( \qquad \) 1. \( \frac{73}{8}= \) \( \qquad \) 6. \( \frac{49}{6}= \) 2. \( \frac{53}{4}= \) \( \qquad \) 10. \( \frac{96}{8}= \) 13. \( \frac{71}{7}= \) \( \qquad \) 14. \( \frac{59}{6}= \) 7. \( \frac{75}{5}= \) \( \qquad \) 18. \( \frac{95}{4}= \) 1. \( \frac{99}{8}= \) \( \qquad \) 22. \( \frac{77}{4}= \)

To convert an improper fraction to a mixed number, simply divide the numerator by the denominator. The quotient will be your whole number, and the remainder over the original denominator will be the fractional part. For example, for \( \frac{11}{3} \), dividing gives 3 with a remainder of 2, so it's \( 3 \frac{2}{3} \). Now let's play with some examples! \( \frac{73}{8} \) equals 9 with a remainder of 1, resulting in \( 9 \frac{1}{8} \). Similarly, \( \frac{96}{8} \) breaks down perfectly as \( 12 \) since there is no remainder. It's like slicing up a delicious pie and showing off your impressive sharing skills!