Range - Algebra 2

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Question

The above chart shows a specific week of work at an advertising firm. What is the range of the hourly rates of the workers?

Answer

The range is difference between the largest value and the smallest value.

$Largest=\$40$

$Smallest=\$15$

$Range=Largest-Smallest=$40-$15=\$25$

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Question

Suppose the ages of a college chemistry class were recorded and the ages reported were as follows:

What is the range of this data?

Answer

The range is calculated by subtracting the smallest value from the largest value: .

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Question

Observe the following table:

Client Age
Marsha 14
Tom 13
Alice 65
Brandy 34
Candy 23
James 43
Brady 19

Find the range for the ages of the clients in the table?

Client	Age
Marsha	14
Tom	13
Alice	65
Brandy	34
Candy	23
James	43
Brady	19

Answer

Let us start by identifying the maximum and minimum values of the list of values.

The maximum is 65 and the minimum is 13.

The range is computed by substracting the minimum from the maximum, which gives us:

$R= $\text{Max}$-$\text{Min}$$

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Question

Observe the following list of terms:

The range of this list of numbers is . Which value can take?

Answer

The range of this list of numbers is 10 which is obtained by doing 20-10.

This means that 20 and 10 are respectively the maximum and minimum values of the list of numbers.

Therefore x has to be a value between 10 and 20.

17 being the only value within this range it is therefore the right answer.

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Question

Find the range of the set:

Answer

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 4}, 5, 6, 12, 15, 18, 19, 23, 26, 27, 31, 39, {\color{Green} 41}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is as follows.

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Question

Find the range of the set:

Answer

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 12}, 15, 16, 24, 25, 31, {\color{Green} 36}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is,

.

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Question

Find the range of the set:

Answer

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 15}, 24, 27, 28, 28, 39, 44, 47, 61, 77, {\color{Green} 88}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is,

.

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Question

Find the range of the following set of data.

Answer

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 14}, 22, 22, 31, 32, 35, 36, 37, 39, 41, 42, 48, 50, 58, {\color{Green} 63}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is their difference,

.

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Question

Find the range of the set:

Answer

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 2}, 3, 5, 8, 13, 21, 34, {\color{Green} 55}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is their difference,

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Question

Find the range of the set:

Answer

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue}15}, 15, 19, 21, 22, 24, 26, 27, 29, 31, 33, {\color{Green}36}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is their difference,

.

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Question

What is the range of the following data set?

Answer

What is the range of the following data set?

The range is found by taking the difference between the largest and smallest value in the data set.

Largest: 103

Smallest: 1

So our range is

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Question

Find the range of the following dataset:

Answer

The range is the difference of the largest and the smallest number.

The largest number in this set is . The smallest number in this set is .

Subtract these numbers.

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Question

Find the range of the dataset.

Answer

The range of the dataset is the difference of the highest and lowest numbers. Determine the highest number. The highest number in the set is .

The lowest number is .

Subtract these numbers.

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Question

Find the range of the dataset: $a = [$\frac{1}{4}$, $\frac{5}{6}$ , $\frac{2}{3}$,$\frac{3}{8}$ ]$

Answer

The range is the difference of the highest and lowest number. In order to determine the highest and lowest fraction in the dataset, we must convert each fraction to a like denominator and compare.

The least common denominator for these fractions is . Reconvert all fractions with a denominator of 24 in order to compare numerators. Multiply the numerators with what was multiplied on the denominator to get the least common denominator.

$a = [$\frac{1}{4}$, $\frac{5}{6}$ , $\frac{2}{3}$,$\frac{3}{8}$ ] = [$\frac{6}{24}$, $\frac{20}{24}$ , $\frac{16}{24}$,$\frac{9}{24}$ ]$

The largest number is: $\frac{5}{6}$ or $\frac{20}{24}$

The smallest number is: $\frac{1}{4}$ or $\frac{6}{24}$

Subtract these numbers.

$\frac{20}{24}$-$\frac{6}{24}$ = $\frac{14}{24}$ = $\frac{7}{12}$

The range is: $\frac{7}{12}$

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Question

Find the range of the following data set:

Answer

Find the range of the following data set:

The range is simply the distance between the largest and smallest value.

Let's begin by finding our two extreme values:

Largest: 2952

Smallest: 1

So our range is 2951

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Question

Find the range of this data set:

Answer

Find the range of this data set:

To begin, let's put our numbers in increasing order:

Next, find the difference between our largest and smallest number. This is our range:

So our answer is 922

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Question

Find the range of the following data set:

Answer

Find the range of the following data set:

Let's begin by putting our data in increasing order:

Next, find the difference between our first and last numbers. This will be our range.

So our answer is 566

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Question

Mrs. Potter gave a test to her Algebra II class, and the scores were as follows:

What is the range of the test scores?

Answer

The range is simply the maximum value minus the minimum value. The highest test score was , and the lowest was .

, so the range of the test scores was 27.

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Question

What is the range of the following equation?

$\small 3x+2$ where $\small 3\leq x\leq10$

Answer

The range is the smallest value subtracted from the biggest value.

This means that for this specific example you need to plug in "3" into the equation and subtract your answer from what you get when you plug "10" into the equation as these are the two endpoints of your function.

Upon doing this you get:

$\small 32-11=21$

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Question

Find the range of the numbers: .

Answer

Step 1: Arrange the numbers from smallest to largest:

.

Step 2: Subtract the largest number and the smallest door to find the range.

The range is .

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Range - Algebra 2

The above chart shows a specific week of work at an advertising firm. What is the range of the hourly rates of the workers?

The range is difference between the largest value and the smallest value.

Suppose the ages of a college chemistry class were recorded and the ages reported were as follows: What is the range of this data?

The range is calculated by subtracting the smallest value from the largest value: .

Observe the following table: ClientAgeMarsha14Tom13Alice65Brandy34Candy23James43Brady19 Find the range for the ages of the clients in the table?

Let us start by identifying the maximum and minimum values of the list of values. The maximum is 65 and the minimum is 13. The range is computed by substracting the minimum from the maximum, which gives us:

Observe the following list of terms: The range of this list of numbers is . Which value can take?

The range of this list of numbers is 10 which is obtained by doing 20-10. This means that 20 and 10 are respectively the maximum and minimum values of the list of numbers. Therefore x has to be a value between 10 and 20. 17 being the only value within this range it is therefore the right answer.

Find the range of the set:

To find the range of a set subtract the smallest number in the set from the largest number in the set: The largest number is in green: The smallest number is in blue: Therefore the range is as follows.

Find the range of the set:

To find the range of a set subtract the smallest number in the set from the largest number in the set: The largest number is in green: The smallest number is in blue: Therefore the range is, .

Find the range of the set:

To find the range of a set subtract the smallest number in the set from the largest number in the set: The largest number is in green: The smallest number is in blue: Therefore the range is, .

Find the range of the following set of data.

To find the range of a set subtract the smallest number in the set from the largest number in the set: The largest number is in green: The smallest number is in blue: Therefore the range is their difference, .

Find the range of the set:

To find the range of a set subtract the smallest number in the set from the largest number in the set: The largest number is in green: The smallest number is in blue: Therefore the range is their difference,

Find the range of the set:

To find the range of a set subtract the smallest number in the set from the largest number in the set: The largest number is in green: The smallest number is in blue: Therefore the range is their difference, .

What is the range of the following data set?

What is the range of the following data set? The range is found by taking the difference between the largest and smallest value in the data set. Largest: 103 Smallest: 1 So our range is

Find the range of the following dataset:

The range is the difference of the largest and the smallest number. The largest number in this set is . The smallest number in this set is . Subtract these numbers.

Find the range of the dataset.

The range of the dataset is the difference of the highest and lowest numbers. Determine the highest number. The highest number in the set is . The lowest number is . Subtract these numbers.

Find the range of the dataset:

Find the range of the following data set:

Find the range of the following data set: The range is simply the distance between the largest and smallest value. Let's begin by finding our two extreme values: Largest: 2952 Smallest: 1 So our range is 2951

Find the range of this data set:

Find the range of this data set: To begin, let's put our numbers in increasing order: Next, find the difference between our largest and smallest number. This is our range: So our answer is 922

Find the range of the following data set:

Find the range of the following data set: Let's begin by putting our data in increasing order: Next, find the difference between our first and last numbers. This will be our range. So our answer is 566

Mrs. Potter gave a test to her Algebra II class, and the scores were as follows: What is the range of the test scores?

The range is simply the maximum value minus the minimum value. The highest test score was , and the lowest was . , so the range of the test scores was 27.

What is the range of the following equation? where

Find the range of the numbers: .

Step 1: Arrange the numbers from smallest to largest: . Step 2: Subtract the largest number and the smallest door to find the range. The range is .

The range is difference between the largest value and the smallest value.

$Largest=\$40$

$Smallest=\$15$

$Range=Largest-Smallest=$40-$15=\$25$

Suppose the ages of a college chemistry class were recorded and the ages reported were as follows:

What is the range of this data?

Observe the following table:

Client Age
Marsha 14
Tom 13
Alice 65
Brandy 34
Candy 23
James 43
Brady 19

Find the range for the ages of the clients in the table?

Let us start by identifying the maximum and minimum values of the list of values.

The maximum is 65 and the minimum is 13.

The range is computed by substracting the minimum from the maximum, which gives us:

$R= $\text{Max}$-$\text{Min}$$

Observe the following list of terms:

The range of this list of numbers is . Which value can take?

The range of this list of numbers is 10 which is obtained by doing 20-10.

This means that 20 and 10 are respectively the maximum and minimum values of the list of numbers.

Therefore x has to be a value between 10 and 20.

17 being the only value within this range it is therefore the right answer.

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 4}, 5, 6, 12, 15, 18, 19, 23, 26, 27, 31, 39, {\color{Green} 41}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is as follows.

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 12}, 15, 16, 24, 25, 31, {\color{Green} 36}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is,

.

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 15}, 24, 27, 28, 28, 39, 44, 47, 61, 77, {\color{Green} 88}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is,

.

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue} 2}, 3, 5, 8, 13, 21, 34, {\color{Green} 55}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is their difference,

To find the range of a set subtract the smallest number in the set from the largest number in the set:

${\color{Blue}15}, 15, 19, 21, 22, 24, 26, 27, 29, 31, 33, {\color{Green}36}$

The largest number is in green:

The smallest number is in blue:

Therefore the range is their difference,

.

What is the range of the following data set?

The range is found by taking the difference between the largest and smallest value in the data set.

Largest: 103

Smallest: 1

So our range is

The range is the difference of the largest and the smallest number.

The largest number in this set is . The smallest number in this set is .

Subtract these numbers.

The range of the dataset is the difference of the highest and lowest numbers. Determine the highest number. The highest number in the set is .

The lowest number is .

Subtract these numbers.

Find the range of the dataset: $a = [$\frac{1}{4}$, $\frac{5}{6}$ , $\frac{2}{3}$,$\frac{3}{8}$ ]$

Find the range of the following data set:

The range is simply the distance between the largest and smallest value.

Let's begin by finding our two extreme values:

Largest: 2952

Smallest: 1

So our range is 2951

Find the range of this data set:

To begin, let's put our numbers in increasing order:

Next, find the difference between our largest and smallest number. This is our range:

So our answer is 922

Find the range of the following data set:

Let's begin by putting our data in increasing order:

Next, find the difference between our first and last numbers. This will be our range.

So our answer is 566

Mrs. Potter gave a test to her Algebra II class, and the scores were as follows:

What is the range of the test scores?

The range is simply the maximum value minus the minimum value. The highest test score was , and the lowest was .

, so the range of the test scores was 27.

What is the range of the following equation?

$\small 3x+2$ where $\small 3\leq x\leq10$

Step 1: Arrange the numbers from smallest to largest:

.

Step 2: Subtract the largest number and the smallest door to find the range.

The range is .