Questions: A scale of measurement that exhibits the properties of nominal data is considered an ordinal scale when which of the following is accurate? a. The interval between values is a fixed unit of measure. b. The order or rank of the data is not meaningful. c. The order or rank of the data is meaningful. d. The scale requires a zero value indicating nothing exists at the zero point.

Solution Steps

To determine when a scale of measurement that exhibits the properties of nominal data is considered an ordinal scale, we need to identify the characteristic that differentiates ordinal scales from nominal scales. Ordinal scales not only categorize data but also rank them in a meaningful order.

The correct answer is: c. The order or rank of the data is meaningful.

This is because an ordinal scale provides information about the order or rank of the data, which is not provided by a nominal scale.### Step 1: Understanding the Question We need to determine when a scale of measurement that exhibits the properties of nominal data is considered an ordinal scale.

Let's analyze each option to see which one correctly describes the transition from nominal to ordinal scale:

• Option a: "The interval between values is a fixed unit of measure."

  • This describes an interval scale, not an ordinal scale.

• Option b: "The order or rank of the data is not meaningful."

  • This describes nominal data, not ordinal data.

• Option c: "The order or rank of the data is meaningful."

  • This correctly describes an ordinal scale, where the order or rank of the data is meaningful.

• Option d: "The scale requires a zero value indicating nothing exists at the zero point."

  • This describes a ratio scale, not an ordinal scale.

Final Answer