What is the Difference Between Parameter and Statistic?
🆚 Go to Comparative Table 🆚The main difference between a parameter and a statistic lies in the population they describe and the data they represent. Here are the key differences:
- Parameter: A parameter is a fixed, numerical value that describes an entire population. It is an unknown value that is often estimated using statistics derived from sample data. For example, the mean of the population's height or the proportion of the population's political affiliation are parameters.
- Statistic: A statistic is a known number that describes a sample, or a portion of the target population. It is a characteristic of the sample, and its value depends on the specific sample taken. For example, the average income of a sample of 1,000 individuals in a city or the percentage of people who like vanilla ice cream in a class of third graders are statistics.
To determine whether a given number is a parameter or a statistic, ask yourself the following questions:
- Does the number describe a whole, complete population where every member can be reached for data collection?
- Is it possible to collect data for this number from every member of the population in a reasonable amount of time?
If the answer is yes to both questions, the number is likely a parameter. If not, it is likely a statistic.
In summary, parameters describe the characteristics of an entire population and are often theoretical concepts, while statistics describe the characteristics of samples and are derived from actual data collected from a portion of the population.
Comparative Table: Parameter vs Statistic
Here is a table comparing the differences between parameters and statistics:
| Parameter | Statistic |
|---|---|
| Describes the properties of an entire population | Describes the properties of a sample |
| Fixed, unknown numerical value | Known, variable numerical value |
| Represents the true value of the population | Estimates the value of the population based on sample data |
| Symbolized by Greek letters or upper-case Latin letters (e.g., μ, σ, P) | Symbolized by lower-case Latin letters (e.g., x̄, s, p̂) |
| Population mean symbolized by μ (Greek letter "mu") | Sample mean symbolized by x̄ (called "x-bar") |
| Population standard deviation symbolized by σ (Greek letter "sigma") | Sample standard deviation symbolized by s |
| Population proportion symbolized by P | Sample proportion symbolized by p̂ (called "p-hat") |
In summary, parameters describe the characteristics of a whole population, while statistics describe the characteristics of a sample. Parameters are fixed and unknown, while statistics are variable and known. Parameters are symbolized by Greek letters or upper-case Latin letters, while statistics are symbolized by lower-case Latin letters.
- Probability vs Statistics
- Mathematics vs Statistics
- Variable vs Parameter
- Attribute vs Parameter
- Argument vs Parameter
- Descriptive vs Inferential Statistics
- Parametric vs Non Parametric
- Variable vs Random Variable
- Bar Graph vs Histogram
- Sample vs Population
- Variable vs Constant
- Population vs Sample Standard Deviation
- Standard Deviation vs Mean
- Coefficient vs Constant
- Classification vs Regression
- Normative vs Empirical
- Features vs Characteristics
- Binomial vs Normal Distribution
- Categorical Data vs Numerical Data