C2.6 – Inequalities

Section A — Recall    Questions 1–5
1. State the meaning of the symbol $\geq$ in words.
Answer
Greater than or equal to.
2. What type of circle is used on a number line to represent a strict inequality?
Answer
An open circle.
Remember: Open circle = strict inequality ($<$ or $>$) — boundary value not included. Closed circle = inclusive inequality ($\leq$ or $\geq$) — boundary value included.
3. State the two inequality symbols that require a closed circle on a number line.
Answer
$\leq$ and $\geq$
4. On a number line, in which direction does the line extend from the circle for the inequality $x > 5$?
Answer
To the right (towards larger values).
5. What does a closed circle at a value on a number line tell you about that value?
Answer
The value is included in the inequality — it is part of the solution.
Section B — Application    Questions 6–10
6. Write the inequality shown on this number line. 0 1 2 3 4 5 6 x
Answer
  • Open circle at 3 → 3 is not included → strict inequality
  • Line goes to the right → greater than
$x > 3$
7. Write the inequality shown on this number line. −5 −4 −3 −2 −1 0 1 x
Answer
  • Closed circle at −2 → −2 is included → inclusive inequality
  • Line goes to the left → less than or equal to
$x \leq -2$
8. Write the inequality shown on this number line. −4 −3 −2 −1 0 1 2 x
Answer
  • Left boundary: closed circle at −2 → −2 is included → $\leq$
  • Right boundary: open circle at 2 → 2 is not included → $<$
  • Line runs between the two circles → range
$-2 \leq x < 2$
9. Describe how to represent the inequality $x \geq -3$ on a number line. State: the type of circle used, where to place it, and the direction the line goes.
Answer
  • The symbol is $\geq$ (inclusive) → use a closed circle
  • Place the closed circle at $-3$
  • $\geq$ means greater than or equal to → draw the line to the right
Closed circle at −3, line extending to the right.
10. Write the inequality shown on this number line. −2 −1 0 1 2 3 4 x
Answer
  • Open circle at 0 → 0 is not included → strict inequality
  • Line goes to the right → greater than
$x > 0$
Section C — Challenge    Questions 11–15
11. Write the inequality shown by each of the following number lines.
(a)
−6 −5 −4 −3 −2 −1 0 x
(b)
−1 0 1 2 3 4 5 x
(c)
−3 −2 −1 0 1 2 3 x
Answer
(a)

Closed circle at −4 → −4 is included → $\leq$. Line goes left → less than or equal to.

$x \leq -4$
(b)

Open circle at 1 → 1 is not included → $>$. Line goes right → greater than.

$x > 1$
(c)

Closed circle at −1 → −1 is included → $\leq$. Open circle at 3 → 3 is not included → $<$. Line between two circles → range.

$-1 \leq x < 3$
12. For the inequality $-4 \leq x < 1$:
(a)
What type of circle is used at $x = -4$? Explain why.
(b)
What type of circle is used at $x = 1$? Explain why.
(c)
Is the value $x = 1$ included in this inequality? Give a reason.
Answer
(a) Circle at $x = -4$
Closed circle. The symbol at this boundary is $\leq$, which is inclusive — so −4 is included in the solution.
(b) Circle at $x = 1$
Open circle. The symbol at this boundary is $<$, which is strict — so 1 is not included in the solution.
(c) Is $x = 1$ included?
No. The symbol is $<$ (strictly less than 1), so $x = 1$ is not part of the solution. The open circle at 1 shows this.
Key rule: Always check the symbol at each boundary separately. $\leq$ or $\geq$ → closed circle (included). $<$ or $>$ → open circle (not included).
13. A student draws a number line to show $x > 2$. They use a closed circle at 2 and shade to the right.
(a)
Identify the mistake in the student’s diagram.
(b)
State what the correct circle should be and explain why.
Answer
(a) The mistake
The student used a closed circle at 2. A closed circle means 2 is included in the solution, but $x > 2$ means $x$ is strictly greater than 2 — so 2 is not included.
(b) Correct circle
The correct circle is an open circle at 2. The symbol $>$ is a strict inequality, which means the boundary value (2) is not part of the solution. An open circle shows the value is not included.
Common mistake: Using a closed circle for $<$ or $>$. Always ask: is the boundary value included? If not → open circle.
14. A number line shows a closed circle at $-3$ and an open circle at $0$, with a line connecting them. −5 −4 −3 −2 −1 0 1 x
(a)
Write the inequality shown.
(b)
Is $x = -3$ a solution? Give a reason.
(c)
Is $x = 0$ a solution? Give a reason.
(d)
Write one value of $x$ that satisfies this inequality.
Answer
(a) The inequality

Closed circle at −3 → $\leq$.   Open circle at 0 → $<$.

$-3 \leq x < 0$
(b) Is $x = -3$ a solution?
Yes. The closed circle at −3 shows that −3 is included in the inequality (the symbol is $\leq$).
(c) Is $x = 0$ a solution?
No. The open circle at 0 shows that 0 is not included in the inequality (the symbol is $<$).
(d) One value of $x$
Any value between −3 and 0. For example: $x = -2$  (or $x = -1$, etc.)
15. Answer the following questions about inequalities and number lines.
(a)
A number line has a closed circle at 1 with the line going to the right. Write the inequality this represents.
(b)
Write an inequality that would be shown with an open circle at 1 with the line going to the left.
(c)
Explain how the two inequalities from (a) and (b) differ in terms of whether $x = 1$ is included.
Answer
(a)

Closed circle → inclusive ($\geq$). Line goes right → greater than or equal to.

$x \geq 1$
(b)

Open circle → strict ($<$). Line goes left → less than.

$x < 1$
(c) How they differ
In (a), $x \geq 1$ uses $\geq$, so $x = 1$ is included — shown by the closed circle.
In (b), $x < 1$ uses $<$, so $x = 1$ is not included — shown by the open circle.
The difference is the inequality symbol: $\geq$ includes the boundary value; $<$ does not.

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