Grade 10 Principles of Mathematics (MPM2D)

Worked Example 1.1 — Completing the Square

Write $y = 2x^2 - 12x + 11$ in vertex form and state the vertex.

Step 1 Factor out the leading coefficient from the $x$-terms: $$y = 2(x^2 - 6x) + 11$$

Step 2 Complete the square inside the bracket. Half of $-6$ is $-3$; $(-3)^2 = 9$. Add and subtract 9 inside: $$y = 2(x^2 - 6x + 9 - 9) + 11 = 2\bigl[(x-3)^2 - 9\bigr] + 11$$

Step 3 Distribute the 2: $$y = 2(x-3)^2 - 18 + 11 = 2(x-3)^2 - 7$$

The vertex is at $(3, -7)$, the axis of symmetry is $x = 3$, and the parabola opens upward (minimum value of $-7$).

Worked Example 2.1 — Simple Trinomial

Factor $x^2 - 3x - 28$.

We need two numbers that multiply to $-28$ and add to $-3$. The pair is $-7$ and $4$.

$$x^2 - 3x - 28 = (x - 7)(x + 4)$$

The zeros are $x = 7$ and $x = -4$, so the parabola crosses the $x$-axis at these points.

Worked Example 2.2 — Decomposition ($a \neq 1$)

Factor $6x^2 + 7x - 3$.

Step 1 Multiply $a \cdot c = 6 \times (-3) = -18$. Find two numbers that multiply to $-18$ and add to $7$: that's $9$ and $-2$.

Step 2 Rewrite the middle term using these numbers: $$6x^2 + 9x - 2x - 3$$

Step 3 Group and factor: $$= 3x(2x + 3) - 1(2x + 3) = (3x - 1)(2x + 3)$$

Worked Example 2.3 — Solving a Quadratic by Factoring

Solve $x^2 + 2x - 15 = 0$.

Step 1 Factor: $(x + 5)(x - 3) = 0$.

Step 2 Apply the zero product property: $x + 5 = 0$ or $x - 3 = 0$.

$$x = -5 \quad \text{or} \quad x = 3$$

Worked Example 3.1 — Using the Quadratic Formula

Solve $3x^2 - 5x - 2 = 0$ using the quadratic formula.

Step 1 Identify: $a = 3$, $b = -5$, $c = -2$.

Step 2 Compute the discriminant: $D = (-5)^2 - 4(3)(-2) = 25 + 24 = 49$.

Step 3 Apply the formula: $$x = \frac{-(-5) \pm \sqrt{49}}{2(3)} = \frac{5 \pm 7}{6}$$

Step 4 Two solutions: $x = \dfrac{5 + 7}{6} = 2$ or $x = \dfrac{5 - 7}{6} = -\dfrac{1}{3}$.

Worked Example 3.2 — Applying the Discriminant

Determine the nature of the roots of $2x^2 - 4x + 5 = 0$.

$D = (-4)^2 - 4(2)(5) = 16 - 40 = -24 < 0$.

Since $D < 0$, there are no real roots. The parabola does not intersect the $x$-axis.

Worked Example 4.1 — Median of a Triangle

Triangle $ABC$ has vertices $A(2, 1)$, $B(8, 3)$, and $C(4, 9)$. Find the length of the median from $A$ to side $BC$.

Step 1 Find the midpoint $M$ of $BC$: $M = \left(\dfrac{8+4}{2}, \dfrac{3+9}{2}\right) = (6, 6)$.

Step 2 Find the distance $AM$: $$AM = \sqrt{(6-2)^2 + (6-1)^2} = \sqrt{16 + 25} = \sqrt{41} \approx 6.40 \text{ units}$$

Worked Example 4.2 — Circle Equation

A circle has centre $(3, -2)$ and passes through the point $(7, 1)$. Find its equation.

Step 1 Find the radius using the distance formula: $$r = \sqrt{(7-3)^2 + (1-(-2))^2} = \sqrt{16 + 9} = \sqrt{25} = 5$$

Step 2 Write the equation: $(x - 3)^2 + (y + 2)^2 = 25$.

Worked Example 5.1 — Right Triangle Problem

In right triangle $PQR$ with the right angle at $Q$, $PQ = 8$ cm and $PR = 13$ cm. Find angle $P$ and the length of $QR$.

Step 1 Find $QR$ using the Pythagorean theorem: $QR = \sqrt{13^2 - 8^2} = \sqrt{169 - 64} = \sqrt{105} \approx 10.25$ cm.

Step 2 Find angle $P$: $\cos P = \dfrac{PQ}{PR} = \dfrac{8}{13}$, so $P = \cos^{-1}\!\left(\dfrac{8}{13}\right) \approx 52.0°$.

Worked Example 5.2 — Applying the Sine Rule

In triangle $ABC$, $\angle A = 42°$, $\angle B = 73°$, and $a = 15$ cm. Find side $b$.

Step 1 Note $\angle C = 180° - 42° - 73° = 65°$ (not needed here).

Step 2 Apply the sine rule: $$\frac{b}{\sin B} = \frac{a}{\sin A} \Rightarrow \frac{b}{\sin 73°} = \frac{15}{\sin 42°}$$ $$b = \frac{15 \sin 73°}{\sin 42°} = \frac{15 \times 0.9563}{0.6691} \approx 21.4 \text{ cm}$$

Worked Example 5.3 — Applying the Cosine Rule

Two sides of a triangle are 10 cm and 14 cm and the included angle is 58°. Find the third side.

Solution $$c^2 = 10^2 + 14^2 - 2(10)(14)\cos 58°$$ $$= 100 + 196 - 280(0.5299)$$ $$= 296 - 148.37 = 147.63$$ $$c = \sqrt{147.63} \approx 12.2 \text{ cm}$$