What Are Integers?
Integers are a set of numbers that include all whole numbers (both positive and negative) along with zero. They do not include fractions or decimals. Mathematically, integers are represented as:
…,-3, -2, -1, 0, 1, 2, 3,…
In simple terms, integers are numbers that can be written without a fractional or decimal component.
Types of Integers
- Positive Integers: Numbers greater than zero (1, 2, 3, …).
- Negative Integers: Numbers less than zero (-1, -2, -3, …).
- Zero: Neither positive nor negative, zero (0) is a neutral integer.
Rules of Integers
Understanding the basic rules of integers is essential for solving mathematical problems efficiently. Here are the key rules:
1. Addition of Integers:
- When adding two positive integers, the result is always positive. (5 + 3 = 8)
- When adding two negative integers, add their absolute values and place a negative sign. (-5 + -3 = -8)
- When adding a positive and a negative integer, subtract the smaller absolute value from the larger absolute value and take the sign of the larger absolute value. (-7 + 3 = -4)
2. Subtraction of Integers:
- Convert subtraction into addition by changing the sign of the second number. (-4 – (-7) = -4 + 7 = 3)
- Follow the rules of integer addition.
3. Multiplication of Integers:
- Positive × Positive = Positive (3 × 4 = 12)
- Negative × Negative = Positive (-3 × -4 = 12)
- Positive × Negative = Negative (3 × -4 = -12)
4. Division of Integers:
- Positive ÷ Positive = Positive (12 ÷ 3 = 4)
- Negative ÷ Negative = Positive (-12 ÷ -3 = 4)
- Positive ÷ Negative = Negative (12 ÷ -3 = -4)
Properties of Integers
Integers follow certain fundamental properties that help in simplifying calculations. These include:
1. Closure Property:
- Integers are closed under addition, subtraction, and multiplication, meaning that the result of any of these operations is always an integer.
2. Commutative Property:
- Addition: a + b = b + a (e.g., 4 + (-2) = -2 + 4)
- Multiplication: a × b = b × a (e.g., 5 × (-3) = -3 × 5)
3. Associative Property:
- Addition: (a + b) + c = a + (b + c) (e.g., (2 + -3) + 4 = 2 + (-3 + 4))
- Multiplication: (a × b) × c = a × (b × c)
4. Distributive Property:
- a × (b + c) = (a × b) + (a × c)
5. Identity Property:
- Additive Identity: Any number plus zero remains the same (a + 0 = a).
- Multiplicative Identity: Any number multiplied by one remains the same (a × 1 = a).
Examples of Integer Operations
Example 1: Adding Integers
(-6) + 9 = 3 (Take the difference and apply the sign of the larger absolute value.)
Example 2: Multiplying Integers
(-4) × (-5) = 20 (Negative × Negative = Positive)
Example 3: Dividing Integers
(-20) ÷ (5) = -4 (Negative ÷ Positive = Negative)
Real-Life Applications of Integers
- Temperature Measurement: Negative values represent cold temperatures (e.g., -10°C in winter).
- Banking and Finance: Deposits (positive integers) and withdrawals (negative integers).
- Stock Market: Rise and fall in stock prices are expressed using positive and negative integers.
- Elevation and Depth: Altitude is positive above sea level and negative below sea level.
Conclusion
Integers form a crucial foundation in mathematics and have widespread applications in real life. Understanding their properties, rules, and operations helps students grasp mathematical concepts more efficiently. By mastering integers, you build a strong base for solving algebraic expressions, equations, and real-world problems.
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