Problem 6
Question
Find the value of each given expression. \(|3-8|\)
Step-by-Step Solution
Verified Answer
The value of \\( |3-8| \\) is 5.
1Step 1: Identify the Expression
The given expression is \( |3-8| \), where you need to find the absolute value of the difference between 3 and 8.
2Step 2: Calculate the Difference
Subtract 8 from 3, which gives \( 3 - 8 = -5 \).
3Step 3: Apply Absolute Value
The absolute value of a number is its distance from zero on the number line, regardless of direction. So the absolute value of \(-5\) is \(5\).
Key Concepts
Number LineSubtractionDistance from Zero
Number Line
The number line is a visual representation of numbers placed at specific intervals. It helps us understand the concept of absolute value by showing the relative position of numbers in relation to zero.
- **Positive numbers** are located to the right of zero on the number line.- **Negative numbers** are found to the left of zero.
To use a number line:- **Locate the numbers**: In the example \(3-8\), you start by identifying where 3 and 8 are on the number line.- **Identify differences**: You need to discern how these numbers relate to each other and zero.
This visual tool helps in calculating absolute values because it makes it clear how far a number is from zero. Remember that regardless of direction on the line, distance is always positive.
- **Positive numbers** are located to the right of zero on the number line.- **Negative numbers** are found to the left of zero.
To use a number line:- **Locate the numbers**: In the example \(3-8\), you start by identifying where 3 and 8 are on the number line.- **Identify differences**: You need to discern how these numbers relate to each other and zero.
This visual tool helps in calculating absolute values because it makes it clear how far a number is from zero. Remember that regardless of direction on the line, distance is always positive.
Subtraction
Subtraction is the process of finding the difference between two numbers. In our example, the expression \(3 - 8\) involves subtraction.
- To subtract, second number "8" is taken away from the first number "3".- In terms of steps, it means going left on the number line from 3, landing at -5.
- **Steps in subtraction**: - Look at the first number (the minuend), in this case, it’s 3. - Deduct the second number (the subtrahend), which here is 8.
- The result of 3 - 8 is negative 5, shown by moving to the left on the number line beyond zero.
Subtraction is integral in finding absolute values, as it helps calculate how numbers relate in size and position on the number line.
- To subtract, second number "8" is taken away from the first number "3".- In terms of steps, it means going left on the number line from 3, landing at -5.
- **Steps in subtraction**: - Look at the first number (the minuend), in this case, it’s 3. - Deduct the second number (the subtrahend), which here is 8.
- The result of 3 - 8 is negative 5, shown by moving to the left on the number line beyond zero.
Subtraction is integral in finding absolute values, as it helps calculate how numbers relate in size and position on the number line.
Distance from Zero
Distance from zero is essentially what absolute value measures. It tells us how far a number is from zero on the number line, regardless of its sign.
- **Example**: - |-5| means we are interested in how far -5 is from zero. - The distance is counted as 5 units, ignoring the negative sign.
This aspect makes absolute value a critical part of analyzing differences and positions:- A negative result from subtraction, like in the \(3 - 8 = -5\) case, needs absolute value processing to express the true distance from zero.- Thus, \|3 - 8| = | -5 | = 5\.
Understanding distance from zero helps with understanding numerical relationships in everyday contexts, making challenging calculations more intuitive.
- **Example**: - |-5| means we are interested in how far -5 is from zero. - The distance is counted as 5 units, ignoring the negative sign.
This aspect makes absolute value a critical part of analyzing differences and positions:- A negative result from subtraction, like in the \(3 - 8 = -5\) case, needs absolute value processing to express the true distance from zero.- Thus, \|3 - 8| = | -5 | = 5\.
Understanding distance from zero helps with understanding numerical relationships in everyday contexts, making challenging calculations more intuitive.
Other exercises in this chapter
Problem 6
Solve and check each of the equations. \(x^{2}+6 x+5=0\)
View solution Problem 6
Perform the indicated operations and write the result in simplest form. \(\left(-3 c^{4}\right)^{2}\)
View solution Problem 7
In \(3-8,\) write each polynomial as the product of its greatest common monomial factor and a polynomial. $$ 4 a-12 a b+16 a^{2} $$
View solution Problem 7
In \(3-12,\) write the sum or difference of the given polynomials in simplest form. $$ \left(a^{2} b^{2}-a b+5\right)+\left(a^{2} b^{2}+a b-3\right) $$
View solution