Order from least to greatest : `" "1.19" "(120)/(84)" "131.44%`

To order the numbers \(1.19\), \(\frac{120}{84}\), and \(131.44\%\) from least to greatest, we will follow these steps: ### Step 1: Convert each number to decimal form. 1. **First number**: \(1.19\) is already in decimal form. \[ 1.19 \] 2. **Second number**: Convert \(\frac{120}{84}\) to decimal by performing the division. \[ \frac{120}{84} = 1.42857 \quad (\text{approximately}) \] 3. **Third number**: Convert \(131.44\%\) to decimal. To do this, divide by \(100\). \[ 131.44\% = \frac{131.44}{100} = 1.3144 \] ### Step 2: List the decimal values obtained. - \(1.19\) - \(1.42857\) (from \(\frac{120}{84}\)) - \(1.3144\) (from \(131.44\%\)) ### Step 3: Order the decimal values from least to greatest. Now we will compare the decimal values: - \(1.19\) - \(1.3144\) - \(1.42857\) Thus, the order from least to greatest is: \[ 1.19, \quad 1.3144, \quad 1.42857 \] ### Final Answer: The ordered list from least to greatest is: \[ 1.19, \quad 1.3144 \quad (from \, 131.44\%) , \quad 1.42857 \quad (from \, \frac{120}{84}) \] ---