Describe All Numbers { A $}$ That Are At A Distance Of 12 From The Number 3. Express This Using Absolute Value Notation.
Introduction
In mathematics, the concept of distance between two numbers is crucial in various mathematical operations and functions. The absolute value notation is a powerful tool used to express the distance between two numbers. In this article, we will explore the concept of numbers that are at a distance of 12 from the number 3, expressed using absolute value notation.
Understanding Absolute Value Notation
Absolute value notation is a mathematical representation of the distance between two numbers. It is denoted by the symbol | | and is used to express the absolute value of a number. The absolute value of a number is its distance from zero on the number line. For example, the absolute value of 5 is 5, and the absolute value of -5 is also 5.
Expressing Distance Using Absolute Value Notation
To express the distance between two numbers using absolute value notation, we use the formula:
|a - b| = c
where a and b are the two numbers, and c is the distance between them.
Numbers at a Distance of 12 from the Number 3
Using the formula above, we can express the numbers that are at a distance of 12 from the number 3 as:
|a - 3| = 12
Solving the Equation
To solve the equation above, we need to isolate the variable a. We can do this by adding 3 to both sides of the equation:
a - 3 + 3 = 12 + 3
a = 15
Finding the Negative Solution
Since the absolute value notation represents the distance between two numbers, we also need to find the negative solution. To do this, we can subtract 12 from 3:
a - 3 = -12
a = -9
Conclusion
In conclusion, the numbers that are at a distance of 12 from the number 3 are 15 and -9. These numbers can be expressed using absolute value notation as:
|a - 3| = 12
where a is the number that is at a distance of 12 from the number 3.
Examples and Applications
The concept of numbers at a distance of 12 from the number 3 has various applications in mathematics and real-world problems. For example, in geometry, the distance between two points is a crucial concept in calculating the length of a line segment. In physics, the distance between two objects is used to calculate the time it takes for an object to travel from one point to another.
Exercises and Problems
- Find the numbers that are at a distance of 15 from the number 2.
- Express the numbers that are at a distance of 20 from the number 5 using absolute value notation.
- Find the numbers that are at a distance of 10 from the number 1.
Solutions to Exercises and Problems
- |a - 2| = 15 a - 2 + 2 = 15 + 2 a = 17
a - 2 = -15 a = -13
- |a - 5| = 20 a - 5 + 5 = 20 + 5 a = 25
a - 5 = -20 a = -15
- |a - 1| = 10 a - 1 + 1 = 10 + 1 a = 11
a - 1 = -10 a = -9
Final Thoughts
In conclusion, the concept of numbers at a distance of 12 from the number 3 is a fundamental concept in mathematics. The absolute value notation is a powerful tool used to express the distance between two numbers. By understanding this concept, we can solve various mathematical problems and apply it to real-world situations.
Introduction
In our previous article, we explored the concept of numbers that are at a distance of 12 from the number 3, expressed using absolute value notation. In this article, we will answer some frequently asked questions related to this concept.
Q&A
Q1: What is the meaning of absolute value notation?
A1: Absolute value notation is a mathematical representation of the distance between two numbers. It is denoted by the symbol | | and is used to express the absolute value of a number.
Q2: How do I express the distance between two numbers using absolute value notation?
A2: To express the distance between two numbers using absolute value notation, you can use the formula:
|a - b| = c
where a and b are the two numbers, and c is the distance between them.
Q3: What are the numbers that are at a distance of 12 from the number 3?
A3: The numbers that are at a distance of 12 from the number 3 are 15 and -9. These numbers can be expressed using absolute value notation as:
|a - 3| = 12
Q4: How do I find the negative solution to the equation |a - 3| = 12?
A4: To find the negative solution, you can subtract 12 from 3:
a - 3 = -12
a = -9
Q5: What are some real-world applications of the concept of numbers at a distance of 12 from the number 3?
A5: The concept of numbers at a distance of 12 from the number 3 has various applications in mathematics and real-world problems. For example, in geometry, the distance between two points is a crucial concept in calculating the length of a line segment. In physics, the distance between two objects is used to calculate the time it takes for an object to travel from one point to another.
Q6: How do I solve the equation |a - 2| = 15?
A6: To solve the equation, you can add 2 to both sides of the equation:
a - 2 + 2 = 15 + 2
a = 17
You can also subtract 15 from 2:
a - 2 = -15
a = -17
Q7: What are some common mistakes to avoid when working with absolute value notation?
A7: Some common mistakes to avoid when working with absolute value notation include:
- Not understanding the concept of absolute value notation
- Not using the correct formula to express the distance between two numbers
- Not considering the negative solution to the equation
- Not applying the concept to real-world problems
Q8: How do I express the numbers that are at a distance of 20 from the number 5 using absolute value notation?
A8: To express the numbers that are at a distance of 20 from the number 5 using absolute value notation, you can use the formula:
|a - 5| = 20
You can solve the equation by adding 5 to both sides of the equation:
a - 5 + 5 = 20 + 5
a = 25
You can also subtract 20 from 5:
a - 5 = -20
a = -15
Conclusion
In conclusion, the concept of numbers at a distance of 12 from the number 3 is a fundamental concept in mathematics. The absolute value notation is a powerful tool used to express the distance between two numbers. By understanding this concept, we can solve various mathematical problems and apply it to real-world situations.