Mathematics • Year 9 • Unit 3 • Lesson 7

Sine Ratio — Mixed Challenge

Push your sine skills further: pick the right rearrangement, combine with Pythagoras, spot a mistake in someone's working, and design a two-stage slope problem. Decimal mode (DEG) throughout.

Master · Mixed Challenge

1. Mixed problems — pick the right sine setup

Decide whether to MULTIPLY or DIVIDE by sin θ before you start. Round to 2 d.p. unless told. 3 marks each

1.1 A right triangle has hyp = 22, θ = 42°. Find opp and then find adj (use Pythagoras).

1.2 A right triangle has opp = 8.4, θ = 65°. Find hyp.

1.3 A flagpole's shadow makes a right triangle with the pole. The sun's angle of elevation is 32°. The pole is 12 m tall (opp). Find the length of the cable that would be stretched from the sun-side tip of the shadow to the top of the pole (the hyp).

1.4 Compare ramps. Ramp X is 10 m long at 18°. Ramp Y is 10 m long at 36° (double the angle). Find the vertical rise of each (2 d.p.) and state by what factor the rise increased. Is it exactly 2? Explain in one sentence.

1.5 A surveyor measures the slope of a hillside and finds that walking 50 m up the slope lifts you 8 m vertically. Find the slope angle θ in degrees by first finding sin θ and then using your calculator's sin⁻¹ key (round θ to the nearest degree).

1.6 A 6 m water slide is built at 30°. A second section is added on directly below it that is also straight and drops a further 2 m vertically at 60°. Find the total slant length of the two sections combined (2 d.p.).

Stuck on 1.6? Section 1 length = 6 m (given). Section 2 length = 2 / sin 60°. Add them.

2. Find the mistake

A student has tried to find the length of a slide given the vertical drop and the slide angle. Exactly one line contains a Year 9 sine-rearrangement mistake. Spot it, explain why it's wrong, then re-do the working correctly. 3 marks

Problem: A water slide drops 9 m vertically at an angle of 40°. Find the slide length.

Student's working:

Line 1: opp = 9 m, θ = 40°, hyp = ?

Line 2: sin 40° = opp / hyp = 9 / hyp

Line 3: hyp = 9 × sin 40°

Line 4: hyp ≈ 9 × 0.6428 ≈ 5.79 m

(a) Which line contains the mistake?

(b) Explain in one or two sentences why that line is wrong, and what should have happened.

(c) Write out the corrected working in full from that line onward, including the corrected final answer.

Stuck? Sense-check the student's answer: hyp ≈ 5.79 m is SHORTER than opp = 9 m. But hyp is always the LONGEST side. That's a red flag — they multiplied when they should have divided.

3. Open-ended challenge — your design brief

This question has more than one valid answer. 4 marks

3.1 A council wants a wheelchair ramp that rises 1.2 m. Australian Standard AS1428 says the ramp angle must be between 4° (very gentle) and 7° (acceptable maximum). The council also has a strict rule that the ramp cannot be longer than 18 m (space limit).

Design two valid ramp options within these rules. For each:
(i) Choose an angle θ between 4° and 7°.
(ii) Calculate the required ramp length L = 1.2/sin θ (2 d.p.).
(iii) Confirm that L ≤ 18 m.
(iv) Briefly recommend the better option, with reasoning (e.g. user comfort vs space efficiency).

Stuck? Try θ = 4° and θ = 6° — calculate L for each and compare. Smaller θ = longer ramp = gentler walk.

How did this worksheet feel?

Got it Partly Lost

What I'll revisit before next class:

Answers — Do not peek before attempting

1.1 — hyp = 22, θ = 42°

opp = 22 sin 42° ≈ 22 × 0.6691 ≈ 14.72.
Pythagoras: adj² = 22² − 14.72² ≈ 484 − 216.68 ≈ 267.32, so adj ≈ 16.35.

1.2 — opp = 8.4, θ = 65°

hyp = 8.4 / sin 65° ≈ 8.4 / 0.9063 ≈ 9.27.

1.3 — Flagpole, sun at 32°, pole = 12 m

opp = 12, want hyp (string-to-shadow-tip). hyp = 12 / sin 32° ≈ 12 / 0.5299 ≈ 22.64 m.

1.4 — Ramp X (18°) vs Ramp Y (36°), both 10 m

Ramp X rise = 10 sin 18° ≈ 3.09 m.
Ramp Y rise = 10 sin 36° ≈ 5.88 m.
Factor of increase ≈ 5.88 / 3.09 ≈ 1.90 — NOT exactly 2. Sine is not linear: doubling the angle roughly doubles sin θ only for small angles. As angles grow, sin θ grows more slowly.

1.5 — Slope: 50 m walked, 8 m up

sin θ = opp/hyp = 8/50 = 0.16. θ = sin⁻¹(0.16) ≈ 9° (to nearest degree).

1.6 — Two-section slide

Section 1 length = 6 m.
Section 2 length = 2 / sin 60° ≈ 2 / 0.8660 ≈ 2.31 m.
Total ≈ 6 + 2.31 = 8.31 m.

2 — Find the mistake

(a) The mistake is on Line 3.
(b) From sin 40° = 9 / hyp, the student multiplied both sides by sin 40° instead of by hyp. To isolate hyp, you must first multiply both sides by hyp (giving sin 40° × hyp = 9) and THEN divide by sin 40°. The correct rearrangement is hyp = 9 / sin 40°, not 9 × sin 40°.
(c) Corrected from Line 3:
hyp = 9 / sin 40°
≈ 9 / 0.6428
≈ 14.00 m.
Sense-check: hyp (14.00) > opp (9), which matches the rule "hyp is the longest side". The student's answer of 5.79 m was shorter than opp — a clear red flag.

3 — Wheelchair ramp design (sample solutions)

Within 4° ≤ θ ≤ 7°, the ramp length L = 1.2 / sin θ. Smaller θ → longer ramp.

Option A: θ = 4°. L = 1.2 / sin 4° ≈ 1.2 / 0.0698 ≈ 17.19 m ✓ (within 18 m). Gentlest possible angle within the standard, but uses almost all the available space.

Option B: θ = 6°. L = 1.2 / sin 6° ≈ 1.2 / 0.1045 ≈ 11.48 m ✓. Still gentle, much shorter, leaves room for landings or a turn at the top.

Recommendation: Option B is the better trade-off — it meets the standard with margin and saves over 5 m of footprint, which could be used for a level rest landing or for tree planting alongside.

Marking: 1 mark per valid option (angle in range, L computed correctly, L ≤ 18 m verified); 1 mark for any sensible recommendation with reasoning; 1 mark for clear setup using hyp = opp/sin θ.