To identify the sending numerical order of the decimals in the given fractions, we first need to convert the fractions to decimals:
- \( 1 \frac{1}{9} = 1 + \frac{1}{9} \approx 1.1111 \)
- \( 1 \frac{1}{6} = 1 + \frac{1}{6} \approx 1.1667 \)
- \( 1 \frac{3}{12} = 1 + \frac{3}{12} = 1 + 0.25 = 1.25 \)
- \( 0.01 = 0.01 \)
- \( 0.062 = 0.062 \)
Now we list all the values in decimal form:
- \( 0.01 \)
- \( 0.062 \)
- \( 1.1111 \)
- \( 1.1667 \)
- \( 1.25 \)
Now we order them in ascending numerical order:
- \( 0.01 \)
- \( 0.062 \)
- \( 1 \frac{1}{9} \) (approximately \( 1.1111 \))
- \( 1 \frac{1}{6} \) (approximately \( 1.1667 \))
- \( 1 \frac{3}{12} \) (which is \( 1.25 \))
Thus, the sending numerical order of the original formats is:
- \( 0.01 \)
- \( 0.062 \)
- \( 1 \frac{1}{9} \)
- \( 1 \frac{1}{6} \)
- \( 1 \frac{3}{12} \)