Mathematics • Year 8 • Unit 3 • Lesson 20

Similar Figures

Build fluency with the scale factor k = image side ÷ object side, finding missing sides in similar figures, and applying the area ratio k². One worked example, one guided fill-in, then eight independent problems.

Build · I Do / We Do / You Do

1. I do — fully worked example

Read every line. Each step has a short reason so you can see why, not just what.

Problem. △ABC ∼ △PQR. Given AB = 4 cm, PQ = 6 cm, and AC = 5 cm. Find the scale factor k and the length PR.

Step 1 — Identify the corresponding pair you can use to find k.

AB corresponds to PQ (both come first in the similarity statement).

Reason: vertex order in △ABC ∼ △PQR pairs A↔P, B↔Q, C↔R. So AB↔PQ and AC↔PR.

Step 2 — Calculate k (image ÷ object).

k = PQ ÷ AB = 6 ÷ 4 = 1.5

Reason: scale factor is always image side ÷ object side, taken in the same direction for every pair.

Step 3 — Apply k to the unknown side.

PR = AC × k = 5 × 1.5 = 7.5 cm

Reason: object side × k = image side. The same k works for every pair of corresponding sides.

Step 4 — Sanity check.

7.5 ÷ 5 = 1.5 = k ✓

Reason: the ratio image:object should be the SAME for every corresponding pair.

Answer: k = 1.5, PR = 7.5 cm.

Stuck? Revisit lesson § Card 7 — this is exactly the worked example, with the same four steps.

2. We do — fill in the missing steps

Same shape as Section 1, with the working faded. Fill in each blank. 4 marks

Problem. Two similar rectangles. The small rectangle has length 8 cm and area 24 cm². The large rectangle has length 12 cm. Find (i) the scale factor k and (ii) the area of the large rectangle.

Step 1 — Identify a corresponding pair of LENGTHS: small length 8 cm ↔ large length ______ cm.

Step 2 — Calculate k (image ÷ object):

k = ______ ÷ ______ = ______

Step 3 — For area, use the AREA RATIO rule: areas scale by ______, not by k.

Area of large = Area of small × ______ = 24 × ______ = ______ cm²

Step 4 — Sanity check: a length-1.5× rectangle should have an area about ______ times bigger (not just 1.5 times).

Stuck? Revisit lesson § Card 8 — area ratio = k² (in this case 1.5² = 2.25).

3. You do — independent practice

Show working. The first four are foundation (just find k or one missing side). The middle two are standard (k with decimals, or area ratio). The last two are extension (reduction, perimeter vs area).

Foundation — find k or a missing side

3.1 △ABC ∼ △PQR. AB = 6 cm, PQ = 9 cm. Find the scale factor k. 1 mark

3.2 Two similar triangles have corresponding sides 4 cm and 10 cm. Another side of the smaller triangle is 7 cm. Find the corresponding side of the larger triangle. 1 mark

3.3 A shape has a side of 10 cm. Its similar image has the corresponding side of 15 cm. Find k. 1 mark

3.4 Two similar figures have k = 3. The smaller figure has perimeter 20 cm. Find the perimeter of the larger figure. 1 mark

Standard — decimals and area ratio

3.5 △ABC ∼ △XYZ. AB = 5 cm, BC = 8 cm, AC = 6 cm, and XY = 7.5 cm. Find k, then find YZ and XZ. 2 marks

3.6 Two similar shapes have a linear scale factor of k = 4. State the ratio of their areas (larger : smaller). 2 marks

Extension — reduction and dimension analysis

3.7 Two similar triangles have scale factor k = 2.5 (large to small). The smaller triangle has area 16 cm². Find the area of the larger triangle, showing your use of the area ratio rule. 2 marks

3.8 A photo is REDUCED so that what was 20 cm wide becomes 8 cm wide. (i) Find k (image ÷ object). (ii) If the original area was 600 cm², find the reduced area. (iii) If the original perimeter was 70 cm, find the reduced perimeter. 2 marks

Stuck on 3.8? Reduction means k < 1. Use perimeter × k for perimeter; use area × k² for area.

How did this worksheet feel?

Got it Partly Lost

What I'll revisit before next class:

Answers — Do not peek before attempting

Section 2 — We do (rectangles fill-in)

Step 1: small 8 cm ↔ large 12 cm.
Step 2: k = 12 ÷ 8 = 1.5.
Step 3: areas scale by k², not by k. Area of large = 24 × k² = 24 × 2.25 = 54 cm².
Step 4: a length-1.5× rectangle has an area about 2.25 times bigger (k² = 1.5² = 2.25).

3.1 — AB = 6, PQ = 9

k = PQ ÷ AB = 9 ÷ 6 = k = 3/2 = 1.5.

3.2 — sides 4 and 10, plus 7

k = 10 ÷ 4 = 2.5. Missing side = 7 × 2.5 = 17.5 cm.

3.3 — sides 10 and 15

k = 15 ÷ 10 = k = 1.5.

3.4 — perimeter scaling

Perimeter scales by k (linear measure), so larger perimeter = 20 × 3 = 60 cm.

3.5 — △ABC ∼ △XYZ

k = XY ÷ AB = 7.5 ÷ 5 = 1.5.
YZ = BC × k = 8 × 1.5 = 12 cm.
XZ = AC × k = 6 × 1.5 = 9 cm.

3.6 — area ratio when k = 4

Area ratio = k² = 4² = 16, so areas are in ratio 16 : 1.

3.7 — k = 2.5, small area 16 cm²

Area ratio = k² = 2.5² = 6.25.
Large area = 16 × 6.25 = 100 cm².

3.8 — photo reduced 20 → 8

(i) k = 8 ÷ 20 = 0.4 (a reduction, k < 1).
(ii) Area scales by k² = 0.4² = 0.16, so reduced area = 600 × 0.16 = 96 cm².
(iii) Perimeter scales by k = 0.4, so reduced perimeter = 70 × 0.4 = 28 cm.