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Linear Equations

Introduction to Linear Equations

A linear equation is an equation that, when graphed, forms a straight line. The standard form of a linear equation is:
ax + b = 0
where 'a' and 'b' are constants, and 'x' is the variable.

Solving Linear Equations

To solve a linear equation, follow these steps to isolate the variable 'x':

  • Simplify both sides: Combine like terms on both sides of the equation, if any.
  • Move the variable term to one side: Use addition or subtraction to place the variable term on one side and the constant term on the other.
  • Isolate the variable: Divide or multiply both sides by the coefficient of the variable to find the value of 'x'.

Examples

Example 1: Solve 3x + 5 = 11
Solution: 3x + 5 = 11
Subtract 5 from both sides:
3x = 6
Divide both sides by 3:
x = 2

Example 2: Solve 2x − 4 = 10
Solution: 
2x − 4 = 10
Add 4 to both sides:
2x = 14
Divide both sides by 2:
x = 7

Example 3: Solve 5x + 2 = 3x + 10
Solution: 
5x + 2 = 3x + 10
Subtract 3x from both sides:
2x + 2 = 10
Subtract 2 from both sides:
2x = 8
Divide both sides by 2:
x = 4

Solving Inequalities

Introduction to Inequalities

An inequality is like an equation, but instead of an equals sign (=), it uses inequality symbols:

  • < (less than)
  • ≤ (less than or equal to)
  • > (greater than)
  • ≥ (greater than or equal to)

Solving Inequalities

The process of solving inequalities is similar to solving linear equations, but there are some important differences:

  • Simplify both sides: Combine like terms on each side of the inequality.
  • Move the variable term to one side: Use addition or subtraction to get the variable term on one side and the constant term on the other.
  • Isolate the variable: Divide or multiply both sides by the coefficient of the variable. Important: If you multiply or divide both sides of an inequality by a negative number, you must reverse the inequality symbol.

Examples

Example 1: Solve 2x + 3 < 7
Solution: 
2x + 3 < 7
Subtract 3 from both sides:
2x < 4
Divide both sides by 2:
x < 2

Example 2: Solve 4x − 5 ≥ 3
Solution:
4x − 5 ≥ 3
Add 5 to both sides:
4x ≥ 8
Divide both sides by 4:
x ≥ 2

Example 3: Solve −3x + 6 > 0
Solution: −3x + 6 > 0
Subtract 6 from both sides:
−3x > −6
Divide both sides by -3 (remember to reverse the inequality):
x < 2

Graphing Solutions

Graphing Linear Equations

When graphing a linear equation y = mx + b:

  • m is the slope (rise over run).
  • b is the y-intercept (where the line crosses the y-axis).

Graphing Inequalities

When graphing inequalities, the graph will show a region that satisfies the inequality:

  • Use a dashed line for < or > (the boundary is not included).
  • Use a solid line for ≤ or ≥ (the boundary is included).
  • Shade the region where the inequality holds true.

Example

Graph the inequality y ≤ 2x + 1:

  • Graph the line y = 2x + 1 with a solid line.
  • Shade the region below the line (because y is less than or equal to).

Summary

  • Linear equations form a straight line and can be solved by isolating the variable.
  • Inequalities represent a range of values and require careful handling, especially when multiplying or dividing by negative numbers.
  • Graphing solutions helps visualize the set of possible solutions for both equations and inequalities.

Question for Equations and Inequalities
Try yourself:
Which of the following is the correct first step when solving a linear equation?
View Solution

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FAQs on Equations and Inequalities - Year 9 Mathematics (Cambridge)

1. What is the difference between linear equations and inequalities?
Ans. Linear equations are mathematical expressions where two expressions are set equal to each other, while inequalities involve expressions that are not necessarily equal, but rather show a relationship between two values using symbols such as <, >, ≤, or ≥.
2. How do you solve linear inequalities algebraically?
Ans. To solve linear inequalities algebraically, you follow similar rules as solving linear equations, with the key difference being how to handle the inequality sign when performing operations on both sides of the inequality.
3. How can graphing solutions help in understanding equations and inequalities better?
Ans. Graphing solutions can provide a visual representation of the relationship between variables in equations and inequalities, making it easier to understand the solution set and see where the lines intersect or diverge.
4. Can you have more than one solution to a linear equation or inequality?
Ans. Yes, linear equations and inequalities can have one solution, no solution, or infinitely many solutions, depending on the specific values and relationship between the variables in the equation or inequality.
5. How are linear equations and inequalities applied in real-life scenarios?
Ans. Linear equations and inequalities are commonly used in various fields such as economics, engineering, and physics to model and solve real-world problems involving relationships between different variables.
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