![]() ![]() Understanding the concept of range is essential in mathematics as it helps in analyzing and interpreting data. It cannot be calculated for qualitative data, i.e., data that cannot be expressed in numerical terms. It is important to note that the range can only be calculated for quantitative data, i.e., data that can be measured and expressed in numerical terms. In such cases, other measures such as variance and standard deviation may be used to provide a more comprehensive understanding of the data. In some cases, the range may not provide a complete picture of the data as it only takes into account the largest and smallest values. Therefore, the range of this set is 15-3=12. For example, if a set of numbers is, the largest number is 15 and the smallest number is 3. Range can be calculated by subtracting the smallest number from the largest number in a set. The range is an important concept in mathematics as it helps in determining the spread of the data and provides an insight into the variability of the data. It is the difference between the largest and smallest numbers in a set or sequence. In mathematics, range refers to the set of all output values of a function. However, in set notation, rather than using the symbol "∪," we use the word "or" by convention.Understanding the definition of range in math Like interval notation, we can also use unions in set builder notation. Which can be read as "the set of all y such that y is greater than or equal to zero." The range of f(x) = x 2 in set notation is: The above can be read as "the set of all x such that x is an element of the set of all real numbers." In other words, the domain is all real numbers. Using the same example as above, the domain of f(x) = x 2 in set notation is: Standard inequality symbols such as, ≥, and so on are also used in set notation. Indicates that an element is a member of some set "such that" - symbol is followed by a constraint Like interval notation, there are a number of symbols used in set notation, the most common of which are shown in the table below: When using set notation, also referred to as set builder notation, we use inequality symbols to describe the domain and range as a set of values. Note that it is also possible to use multiple union symbols to combine more intervals in the same manner. The domain of the function is therefore all x-values except those in the interval (0, 1), which we can indicate in interval notation using the union symbol as follows: This is the same as our function above, except that it is not defined over the interval (0, 1). In the context of interval notation, it simply means to combine two given intervals. The union symbol can be read as "or" and it is used throughout various fields of mathematics. ![]() ![]() The union symbol is used when we have a function whose domain or range cannot be described with just a single interval. The range can therefore be written in interval notation as: Recall that the range of f(x) = x 2 is all positive y-values, including 0. We used parentheses rather than brackets around each endpoint because the endpoints are negative and positive infinity, which by definition have no bound. In other words, any value from negative infinity to positive infinity will yield a real result. Recall that the domain of f(x) = x 2 is all real numbers. Let's look at the same example as above, f(x) = x 2 to see how interval notation is used.
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