Chapter 5: Linear Inequalities

1. Rules of Inequality

Inequalities behave like equations, with one major exception: Multiplying or Dividing by a negative number reverses the sign.

Inequality Lab

Start with: \( 10 > 6 \). Apply an operation to see what happens.

10 > 6

Exam Alert:
Sign changes ONLY when multiplying or dividing by a negative number.
Adding or subtracting never flips the inequality.

2. Solving Inequalities (One Variable)

We solve for \( x \) and represent the solution on a number line or in interval notation.

Symbol	Meaning	Interval Bracket	Circle Type
\( < \)	Less than	\(( ... )\)	Open
\( \le \)	Less or equal	\([ ... ]\)	Filled (Closed)
\( > \)	Greater than	\(( ... )\)	Open
\( \ge \)	Greater or equal	\([ ... ]\)	Filled (Closed)

Number Line Plotter

Visualize the solution set.

2.1 Linear Inequalities in Two Variables

A linear inequality in two variables is of the form:

\( ax + by < c \)

\( ax + by \le c \)

\( ax + by > c \)

\( ax + by \ge c \)

Its solution is a region in the coordinate plane, not a single point.

Exam Tip: CBSE may ask to identify whether a given inequality is linear or not.

2.2 Inequalities Involving Fractions

While solving inequalities with fractions:

Clear denominators carefully.
If you multiply/divide by a negative denominator, reverse the inequality sign.

Example:

\( \frac{x}{-2} > 3 \)

\( x < -6 \) (Sign reversed)

Common Mistake: Students forget to flip the sign.

2.3 Absolute Value Inequalities

Properties involving the modulus function (for \( a > 0 \)):

\( |x| < a \implies -a < x < a \) (Distance is less than a)
\( |x| \le a \implies -a \le x \le a \)
\( |x| > a \implies x < -a \text{ or } x> a \) (Distance is greater than a)
\( |x| \ge a \implies x \le -a \text{ or } x \ge a \)

Example: Solve \( |x - 2| \le 3 \)

\( -3 \le x - 2 \le 3 \implies -1 \le x \le 5 \). Solution: \( [-1, 5] \)

3. Graphical Solution (Two Variables)

To solve \( ax + by > c \) graphically:

Replace inequality with \( = \) to get line equation.
Draw the line (Dotted for \( <,> \); Solid for \( \le, \ge \)).
Pick a test point (usually \( (0,0) \)) not on the line.
If True, shade towards the point. If False, shade away.

Region Tester

Test the origin (0,0) for \( ax + by > c \)

x + y >

3.1 System of Linear Inequalities

When two or more linear inequalities are given together, the solution is the common region satisfying all inequalities.

Example:

\( x + y \ge 4 \)

\( x \ge 0 \)

\( y \ge 0 \)

The shaded region common to all inequalities is the solution.

Exam Tip: Shade carefully. Even one wrong boundary loses marks.

4. Solution Set & Verification

The solution set of an inequality is the set of all values that make the inequality true.

Example:

Check whether \( x = 1 \) satisfies \( 3x - 2 < 4 \)

\( 3(1) - 2 = 1 < 4 \) ✔

Note: Always substitute and check.

4.1 Word Problems (Applications)

Steps to formulate a linear inequality from a word problem:

Identify the unknown quantity and assign a variable (e.g., \( x \)).
Translate phrases like "at least" (\( \ge \)), "at most" (\( \le \)), "more than" (\( > \)), and "less than" (\( < \)) correctly.
Set up the inequality and solve.

Example (Grades): To get grade A, average of 3 exams must be at least 90. If marks in two exams are 87 and 92, find the minimum marks in the third exam (\( x \)).

\( \frac{87 + 92 + x}{3} \ge 90 \)

\( 179 + x \ge 270 \implies x \ge 91 \)

One-Page Revision Checklist

Tick each box mentally. If you can explain it, you are exam-ready.

1. Basics of Inequalities

Know symbols: <, >, ≤, ≥
Inequality is different from equation
Solution is a range of values, not one value

2. Rules of Inequalities

Adding same number → sign does NOT change
Subtracting same number → sign does NOT change
Multiplying by positive number → sign unchanged
Multiplying or dividing by negative → sign reverses

Golden Rule: Only NEGATIVE multiplication/division flips the sign.

3. Solving Linear Inequalities (One Variable)

Solve like equation till x is alone
Reverse sign if needed
Final answer written as inequality

4. Number Line Representation

Open circle → < or >
Filled circle → ≤ or ≥
Arrow direction correct
Interval notation correct

Examples:

x > 2 → (2, ∞)

x ≤ −1 → (−∞, −1]

5. Inequalities with Fractions

Denominators cleared carefully
Sign reversed if denominator is negative
Final inequality checked

6. Linear Inequalities in Two Variables

Standard form: ax + by </>/≤/≥ c
Represents a REGION, not a line
Boundary line drawn correctly

7. Graphical Solution

Replace inequality with equality
Solid line → ≤ or ≥
Dotted line → < or >
Test point (0,0) used correctly
Correct side shaded

8. System of Linear Inequalities

Each inequality shaded separately
Final solution = COMMON shaded region
Axes included when x ≥ 0, y ≥ 0

9. Solution Set & Verification

Substitute value correctly
LHS compared with RHS
Final statement: satisfies / does not satisfy

10. Exam Smart Checks

Sign reversal not forgotten
Boundary line type correct
Interval notation accurate
Diagram neat and labeled

If you ticked everything:
You are ready for MCQs, graphs, and 5-mark questions.

Concept Mastery Quiz

1. Multiplying both sides of \( -x < 5 \) by -1 gives:

2. The interval notation for \( x \ge 3 \) is:

3. For strict inequalities (\( <,> \)), the boundary line is:

4. Is (0,0) a solution to \( 2x + y > 5 \)?

5. Which value satisfies \( 3x - 2 < 4 \)?