Let's solve each of these fractions by converting them to decimals. Since all the denominators are either
10 or
100, this is straightforward because:
- A fraction with denominator
10 means the decimal has
one digit after the decimal point.
- A fraction with denominator
100 means the decimal has
two digits after the decimal point.
---
Step-by-step conversions:
#### 1. $\frac{92}{100} = 0.92$
→ 92 hundredths = 0.92
#### 2. $\frac{29}{100} = 0.29$
→ 29 hundredths = 0.29
#### 3. $\frac{3}{10} = 0.3$
→ 3 tenths = 0.3
#### 4. $\frac{1}{100} = 0.01$
→ 1 hundredth = 0.01
#### 5. $\frac{73}{100} = 0.73$
→ 73 hundredths = 0.73
#### 6. $\frac{34}{100} = 0.34$
→ 34 hundredths = 0.34
#### 7. $\frac{44}{100} = 0.44$
→ 44 hundredths = 0.44
#### 8. $\frac{9}{10} = 0.9$
→ 9 tenths = 0.9
#### 9. $\frac{2}{10} = 0.2$
→ 2 tenths = 0.2
#### 10. $\frac{5}{10} = 0.5$
→ 5 tenths = 0.5
#### 11. $\frac{74}{100} = 0.74$
→ 74 hundredths = 0.74
#### 12. $\frac{3}{100} = 0.03$
→ 3 hundredths = 0.03
#### 13. $\frac{9}{100} = 0.09$
→ 9 hundredths = 0.09
#### 14. $\frac{35}{100} = 0.35$
→ 35 hundredths = 0.35
---
Final Answers:
$$
\begin{align*}
\frac{92}{100} &= 0.92 \\
\frac{29}{100} &= 0.29 \\
\frac{3}{10} &= 0.3 \\
\frac{1}{100} &= 0.01 \\
\frac{73}{100} &= 0.73 \\
\frac{34}{100} &= 0.34 \\
\frac{44}{100} &= 0.44 \\
\frac{9}{10} &= 0.9 \\
\frac{2}{10} &= 0.2 \\
\frac{5}{10} &= 0.5 \\
\frac{74}{100} &= 0.74 \\
\frac{3}{100} &= 0.03 \\
\frac{9}{100} &= 0.09 \\
\frac{35}{100} &= 0.35 \\
\end{align*}
$$
✔ All converted correctly!
Let me know if you'd like a printable version or explanation for any specific one!
Parent Tip: Review the logic above to help your child master the concept of fraction and decimal worksheet.