Worked Exercises on First-Degree Inequalities

\[ x > 2 \]

Key idea

We isolate \(x\) on the left-hand side using the same operations as for an equation. Since we divide by a positive number, the direction of the inequality does not change.

Isolating the unknown

Subtract \(3\) from both sides:

\[ 2x > 7-3 \implies 2x > 4 \]

Divide by \(2\) (positive, so the direction remains unchanged):

\[ x > 2 \]

Solution set

\[ S = \{x \in \mathbb{R} \mid x > 2\} = (2,\,+\infty) \]

Answer

\[ \boxed{x > 2} \]

\[ x \leq 3 \]

Isolating the unknown

Add \(5\) to both sides:

\[ 3x \leq 9 \]

Divide by \(3\) (positive, direction unchanged):

\[ x \leq 3 \]

Solution set

\[ S = (-\infty,\,3] \]

Answer

\[ \boxed{x \leq 3} \]

\[ x > -2 \]

Sign caution

When dividing or multiplying by a negative number, the direction of the inequality reverses.

Isolating the unknown

Subtract \(1\) from both sides:

\[ -2x < 4 \]

Divide by \(-2\) (negative): the direction reverses from \(<\) to \(>\):

\[ x > -2 \]

Solution set

\[ S = (-2,\,+\infty) \]

Answer

\[ \boxed{x > -2} \]

\[ x \geq 2 \]

Isolating the unknown

Add \(8\) to both sides:

\[ 4x \geq 8 \]

Divide by \(4\) (positive, direction unchanged):

\[ x \geq 2 \]

Solution set

\[ S = [2,\,+\infty) \]

Answer

\[ \boxed{x \geq 2} \]

\[ x > 3 \]

Collecting the \(x\) terms

Collect the \(x\) terms on the left-hand side and the constants on the right:

\[ 3x-x > 8-2 \implies 2x > 6 \implies x > 3 \]

Solution set

\[ S = (3,\,+\infty) \]

Answer

\[ \boxed{x > 3} \]

\[ x \leq 4 \]

Collecting terms

\[ 5x-2x \leq 9+3 \implies 3x \leq 12 \implies x \leq 4 \]

Solution set

\[ S = (-\infty,\,4] \]

Answer

\[ \boxed{x \leq 4} \]

\[ x > 5 \]

Expanding the brackets

\[ 2x+2 < 3x-3 \]

Collecting terms

\[ 2-3x < -3-2x \implies \text{or: } 2+3 < 3x-2x \implies 5 < x \]

More precisely: \(2x-3x < -3-2 \implies -x < -5 \implies x > 5\) (the direction reverses when dividing by \(-1\)).

Solution set

\[ S = (5,\,+\infty) \]

Answer

\[ \boxed{x > 5} \]

\[ x > -6 \]

Clearing the fractions

The LCM of \(2\) and \(3\) is \(6\). Multiply everything by \(6\) (positive, direction unchanged):

\[ 3x + 6 > 2x \]

Collecting terms

\[ 3x-2x > -6 \implies x > -6 \]

Solution set

\[ S = (-6,\,+\infty) \]

Answer

\[ \boxed{x > -6} \]

\[ x \leq 5 \]

Clearing the fractions

The LCM of \(2\) and \(4\) is \(4\). Multiply everything by \(4\):

\[ 2(x-1) \leq x+3 \implies 2x-2 \leq x+3 \]

Collecting terms

\[ 2x-x \leq 3+2 \implies x \leq 5 \]

Solution set

\[ S = (-\infty,\,5] \]

Answer

\[ \boxed{x \leq 5} \]

\[ x \geq \dfrac{13}{4} \]

Expanding the brackets

\[ 6x-3 \geq 2x+10 \]

Collecting terms

\[ 6x-2x \geq 10+3 \implies 4x \geq 13 \implies x \geq \frac{13}{4} \]

Solution set

\[ S = \left[\frac{13}{4},\,+\infty\right) \]

Answer

\[ \boxed{x \geq \dfrac{13}{4}} \]

\[ -1 < x < 4 \]

Key idea

Each inequality is solved separately; then we take the intersection of the solution sets.

First inequality

\[ x+1>0 \implies x>-1 \]

Second inequality

\[ 2x-3<5 \implies 2x<8 \implies x<4 \]

Intersection

\[ x>-1 \;\text{ and }\; x<4 \implies -1<x<4 \]

Solution set

\[ S = (-1,\,4) \]

Answer

\[ \boxed{-1 < x < 4} \]

\[ 1 \leq x < 5 \]

First inequality

\[ 3x-2\geq1 \implies 3x\geq3 \implies x\geq1 \]

Second inequality

\[ x+5>2x \implies 5>x \implies x<5 \]

Intersection

\[ x\geq1 \;\text{ and }\; x<5 \implies 1\leq x<5 \]

Solution set

\[ S = [1,\,5) \]

Answer

\[ \boxed{1 \leq x < 5} \]

\[ -2 < x < 2 \]

Key idea

This is a compound inequality. The same operations are applied to all three parts simultaneously.

Subtracting \(3\) throughout

\[ -1-3 < 2x+3-3 < 7-3 \implies -4 < 2x < 4 \]

Dividing throughout by \(2\)

The divisor is positive, so the directions remain unchanged:

\[ -2 < x < 2 \]

Solution set

\[ S = (-2,\,2) \]

Answer

\[ \boxed{-2 < x < 2} \]

\[ 2 < x < 4 \]

First inequality

\[ 2x-1>3 \implies 2x>4 \implies x>2 \]

Second inequality

\[ 3x+2<14 \implies 3x<12 \implies x<4 \]

Intersection

\[ x>2 \;\text{ and }\; x<4 \implies 2<x<4 \]

Solution set

\[ S = (2,\,4) \]

Answer

\[ \boxed{2 < x < 4} \]

\[ 2 \leq x < 3 \]

First inequality

\[ \frac{x}{2}\geq1 \implies x\geq2 \]

Second inequality

Multiply by \(3\) (positive):

\[ x+3<6 \implies x<3 \]

Intersection

\[ x\geq2 \;\text{ and }\; x<3 \implies 2\leq x<3 \]

Solution set

\[ S = [2,\,3) \]

Answer

\[ \boxed{2 \leq x < 3} \]

No solution

First inequality

\[ x>5 \implies S_1=(5,\,+\infty) \]

Second inequality

\[ x<3 \implies S_2=(-\infty,\,3) \]

Intersection

\[ S_1 \cap S_2 = (5,\,+\infty) \cap (-\infty,\,3) = \emptyset \]

There is no real number that is simultaneously greater than \(5\) and less than \(3\).

Answer

\[ \boxed{\text{No solution} \quad S = \emptyset} \]

\[ x > \dfrac{15}{2} \]

Clearing the fractions

The LCM of \(4\), \(3\) and \(6\) is \(12\). Multiply everything by \(12\) (positive):

\[ 3(2x-3) - 4(x+1) > 2 \]

Expanding

\[ 6x-9-4x-4 > 2 \implies 2x-13 > 2 \implies 2x > 15 \implies x > \frac{15}{2} \]

Check with \(x=8\)

\[ \frac{13}{4}-\frac{9}{3}=\frac{13}{4}-3=\frac{1}{4}>\frac{1}{6} \]

Solution set

\[ S = \left(\frac{15}{2},\,+\infty\right) \]

Answer

\[ \boxed{x > \dfrac{15}{2}} \]

\[ x \leq -\dfrac{3}{2} \]

Expanding the brackets

\[ 3x-6-4x-2 \geq x-5 \implies -x-8 \geq x-5 \]

Collecting terms

\[ -x-x \geq -5+8 \implies -2x \geq 3 \]

Divide by \(-2\) (negative): the direction reverses from \(\geq\) to \(\leq\):

\[ x \leq -\frac{3}{2} \]

Check with \(x=-2\)

\[ 3(-4)-2(-3)=-12+6=-6 \] and \[ -2-5=-7 \]. Since \(-6\geq-7\)

Solution set

\[ S = \left(-\infty,\,-\frac{3}{2}\right] \]

Answer

\[ \boxed{x \leq -\dfrac{3}{2}} \]

\[ -4 < x < 9 \]

First inequality

Multiply through by the LCM \(6\):

\[ 3(x-1)<2x+6 \implies 3x-3<2x+6 \implies x<9 \]

Second inequality

\[ 2x-x>-7+3 \implies x>-4 \]

Intersection

\[ x>-4 \;\text{ and }\; x<9 \implies -4<x<9 \]

Solution set

\[ S = (-4,\,9) \]

Answer

\[ \boxed{-4 < x < 9} \]

\[ x \geq -4 \]

First inequality

Multiply through by the LCM \(6\):

\[ 2x-6 \leq 3x+1 \implies -x\leq7 \implies x\geq-7 \]

Second inequality

Multiply by \(2\):

\[ 4x+6 \geq x-6 \implies 3x\geq-12 \implies x\geq-4 \]

Intersection

\[ x\geq-7 \;\text{ and }\; x\geq-4 \]

The more restrictive condition is \(x\geq-4\).

Solution set

\[ S = [-4,\,+\infty) \]

Answer

\[ \boxed{x \geq -4} \]