Order the missing numbers from the rational number set from least to greatest. {1.2,−1,0.03,1,−1/2} (2 points) −1 , , , , 1.2

1 answer

To order the missing numbers from the set {1.2, −1, 0.03, 1, −1/2} from least to greatest, we can first convert all numbers into decimal form (if they aren't already) for easier comparison. Here's the conversion:

  • \(−1\) is already in decimal form: \(−1.0\)
  • \(0.03\) remains \(0.03\)
  • \(1\) is \(1.0\)
  • \(−\frac{1}{2}\) is equivalent to \(-0.5\)
  • \(1.2\) remains \(1.2\)

Now let's list them in decimal form:

  • \(−1.0\)
  • \(−0.5\)
  • \(0.03\)
  • \(1.0\)
  • \(1.2\)

Now, ordering them from least to greatest gives:

  1. \(−1.0\)
  2. \(−0.5\)
  3. \(0.03\)
  4. \(1.0\)
  5. \(1.2\)

Thus, the ordered list is: \[ −1, −\frac{1}{2}, 0.03, 1, 1.2 \]

Therefore, the missing numbers ordered from least to greatest are \(−\frac{1}{2}\) and \(0.03\).