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Continuous or Discrete, again Identify each variable as continuous or discrete a. Number of people in line at a supermarket checkout counter b. Depth of a snowfall c. Length of time for a driver to respond when faced with an impending collision d. Number of aircraft arriving at the Atlanta airport in a given hour

Short Answer

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Based on the given solution, create a short-answer question: Question: Identify whether the following variables are continuous or discrete: a. Number of people in line at a supermarket checkout counter, b. Depth of a snowfall, c. Length of time for a driver to respond when faced with an impending collision, and d. Number of aircraft arriving at the Atlanta airport in a given hour. Answer: a. Discrete, b. Continuous, c. Continuous, d. Discrete

Step by step solution

01

Define continuous and discrete variables

Continuous variables can take any value within a specified range and can be measured with any degree of accuracy. Discrete variables can only have a finite number of values within a specified range, usually integer values (whole numbers).
02

Variable analysis

a. Number of people in line at a supermarket checkout counter This variable is discrete since the number of people will always be a whole number, and cannot include decimal values (e.g., 5.5 people). b. Depth of a snowfall This variable is continuous since snowfall depth can be measured with any degree of accuracy, and can include decimal values (e.g., 5.5 inches). c. Length of time for a driver to respond when faced with an impending collision This variable is continuous since time can be measured with any degree of accuracy, and can include decimal values (e.g., 1.5 seconds). d. Number of aircraft arriving at the Atlanta airport in a given hour This variable is discrete since the number of aircraft will always be a whole number, and cannot include decimal values (e.g., 10.5 aircraft).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Probability and Statistics
In the world of mathematics, probability and statistics play a pivotal role in understanding and interpreting the data that surrounds us. Probability is the study of chance and is used to quantify the likelihood of various outcomes. It's the tool that tells us how likely it is to roll a six on a dice, or the chance of rain on a cloudy day.

Statistics, on the other hand, deals with the collection, analysis, interpretation, presentation, and organization of data. When we collect data, we can describe it using measures of central tendency like the mean, median, and mode, or we can talk about its spread using range, variance, and standard deviation.

For instance, if we're considering the number of people in line at a supermarket checkout counter, statistically, we might be interested in the average number of people in line during peak hours, how this number varies, or the probability of having more than ten people in line at any point in time. These statistical analyses help businesses make decisions about staffing and checkout counter openings.
Variable Analysis
Moving on to variable analysis, this involves examining different types of variables and understanding their nature and characteristics. A variable, in essence, is any characteristic that can take on different values among subjects in a study. As seen in the exercise, we differentiate mainly between continuous and discrete variables.

A discrete variable, like the number of people in line or the number of aircraft arriving at an airport, can only take on specific values which are often countable and non-divisible. In everyday life, this would translate to scenarios like the number of books on a shelf or the number of cups sold at a coffee shop. You can't have half a person or half an aircraft, right?

In contrast, a continuous variable like the depth of snowfall or the reaction time of a driver can take any value within a range, including fractions and decimals. This includes measurements such as speed, temperature, and time. Variable analysis thus requires us to look at the kind of data at hand and decide which statistical tools will provide the most accurate analysis related to that data.
Measuring Variables
The task of measuring variables is quite crucial as it directly influences the quality of data obtained. Each variable type requires different measurement techniques. For discrete variables, counting is the usual method. For example, you count the number of people in a line, or the number of cars passing through a toll booth.

Continuous variables, however, require more nuanced measurement tools that can handle the intricacy and range present in these types of data. Depth of snowfall, for example, might be measured using a ruler or a depth gauge, and can be recorded to the nearest tenth of an inch. Similarly, the time taken to react to a hazard might be measured with a stopwatch or high-tech sensors and recorded in milliseconds. When measuring continuous variables, precision and accuracy are key, as these measurements can be infinitely detailed.

Understanding the distinction between these types of variables and being able to measure them accurately ensures that the data we use in statistics is reliable. This reliability is fundamental, as data informs decisions in fields ranging from science and medicine to economics and public policy.

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Most popular questions from this chapter

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