Pythagoras Applications
Draw a diagram, spot the right angle, and solve any real-world problem.
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A rectangular paddock is 60 m long and 80 m wide. A farmer wants to walk diagonally across it from one corner to the opposite corner. Without calculating, estimate the distance. Is it more or less than 100 m?
Any real-world problem that contains a right angle can be solved with Pythagoras. The key skill is finding and drawing the right triangle hidden inside the problem.
Step 1: Draw a diagram. Step 2: Mark all known lengths. Step 3: Identify the right angle and the unknown side. Step 4: Apply $c^2 = a^2 + b^2$ or $a = \sqrt{c^2-b^2}$. Key clue words: vertical, horizontal, diagonal, direct distance, straight-line.
Know
- Key clue words that signal a right triangle in word problems
- The diagonal formula: $d = \sqrt{l^2 + w^2}$
- How to find grid distances using horizontal and vertical legs
Understand
- Why drawing a diagram is the most important first step
- How to extract the right triangle from a real-world scenario
Can Do
- Solve navigation, rectangle, grid and roof-rafter problems
- Handle multi-step problems that require intermediate calculations
- State answers with appropriate units and rounding
Wrong: Adding the two travel distances: $12 + 9 = 21$ km direct distance.
Right: $d = \sqrt{12^2 + 9^2} = \sqrt{225} = 15$ km — the path, not the direct distance, adds to 21.
Wrong: Using the slant side as both a leg and a hypotenuse in roof problems.
Right: The rafter (slant) is always the hypotenuse; the height and half-width are the legs.
Most applications hide a right triangle. Use these clue words to spot it: vertical, horizontal, diagonal, direct distance, shortest path, straight-line distance.
Common setups:
- Navigation: N/S and E/W legs form a right angle at the turn.
- Rectangle diagonal: Length and width are legs; diagonal is hypotenuse.
- Grid points: Horizontal and vertical gaps are legs.
- Roof rafters: Height above ridge and half-span are legs.
A diagonal splits a rectangle into two congruent right-angled triangles. The length and width become the legs; the diagonal is the hypotenuse.
Formula: $d = \sqrt{l^2 + w^2}$
Example: A 5 m × 12 m rectangle.
$d = \sqrt{5^2 + 12^2} = \sqrt{25 + 144} = \sqrt{169} = 13$ m
Note: 5-12-13 is a Pythagorean triple — recognise it to save time.
On a coordinate grid, the horizontal and vertical gaps between two points are the legs of a right triangle. Their hypotenuse is the direct distance.
To find distance from $(x_1, y_1)$ to $(x_2, y_2)$:
- Horizontal gap: $|x_2 - x_1|$
- Vertical gap: $|y_2 - y_1|$
- Distance: $d = \sqrt{(\Delta x)^2 + (\Delta y)^2}$
Example: $(0,0)$ to $(3,4)$: $d = \sqrt{9 + 16} = 5$
Some problems need an intermediate length before you can find the final answer. Complete each calculation fully before moving to the next.
Strategy:
- Draw a diagram and label everything.
- Identify which right triangle to solve first.
- Calculate the intermediate length (keep full precision).
- Use that result in the next calculation.
- Round only the final answer.
Never round intermediate values — rounding errors compound!
Application Strategy
- Draw a diagram first
- Label all known lengths
- Mark the right angle
- Identify the unknown side
Key Formulas
- Rectangle diagonal: $d = \sqrt{l^2+w^2}$
- Grid distance: $d = \sqrt{(\Delta x)^2+(\Delta y)^2}$
- Navigation: legs are N/S and E/W distances
Clue Words
- vertical / horizontal
- diagonal / direct distance
- straight-line / shortest
- north/south + east/west
Multi-step Rule
- Solve intermediate triangle first
- Keep full precision
- Round only the final answer
- State units in the answer
How are you completing this lesson?
Watch Me Solve It · 3 examples
- 1Draw and labelNorth leg $a = 12$ km, East leg $b = 9$ km, $c =$ direct distanceN and E are perpendicular, forming the two legs of a right triangle.
- 2Apply Pythagoras$c^2 = 12^2 + 9^2 = 144 + 81 = 225$
- 3Square root$c = \sqrt{225} = 15$ km9-12-15 is a ×3 multiple of the 3-4-5 triple.
- 1Identify legs$a = 5$ m, $b = 12$ m, $c =$ diagonalThe diagonal splits the rectangle into a right triangle.
- 2Apply Pythagoras$c^2 = 5^2 + 12^2 = 25 + 144 = 169$
- 3Square root$c = \sqrt{169} = 13$ m5-12-13 is a Pythagorean triple — exact answer.
- 1Identify the right triangleHeight $= 2.4$ m, half-width $= 7 \div 2 = 3.5$ m, rafter $= c$The rafter spans from ridge to eave — hypotenuse of the half-roof triangle.
- 2Apply Pythagoras$c^2 = 3.5^2 + 2.4^2 = 12.25 + 5.76 = 18.01$
- 3Square root$c = \sqrt{18.01} \approx 4.24$ mEach rafter is approximately 4.24 m long.
Brain Trainer · 4 problems
Apply Pythagoras to each scenario. Draw a diagram, then calculate.
1 A ship sails 5 km north then 12 km east. Find the direct distance from start.
$c^2 = 25 + 144 = 169$ → $c = 13$ km2 Rectangle 8 m × 15 m. Find the diagonal.
$c^2 = 64 + 225 = 289$ → $c = 17$ m3 Grid distance from $(0,0)$ to $(3,4)$.
$d = \sqrt{9+16} = \sqrt{25}$ → $d = 5$ units4 Square with side 6 cm. Find the diagonal (to 1 decimal place).
$d = \sqrt{36+36} = \sqrt{72}$ → $d \approx 8.5$ cm
Quick Check · 5 questions
Show Your Working · 3 questions
Q6. A telephone pole is 6 m tall. A wire runs from its top to a point 4.5 m from its base. (a) Find the wire length to 2 decimal places. (b) If wire costs $3/m, find the total cost.
Q7. A square has a diagonal of 10 cm. Find the side length. Give your answer to 2 decimal places.
Q8. A rectangular park is 80 m long and 60 m wide. (a) Find the diagonal path length. (b) A person walks around two sides (length + width) vs the diagonal path. How much shorter is the diagonal route?
Quick Check
1. B — $\sqrt{5^2+12^2} = \sqrt{169} = 13$ km.
2. C — $\sqrt{8^2+15^2} = \sqrt{289} = 17$ m.
3. A — $\sqrt{3^2+4^2} = \sqrt{25} = 5$ units.
4. B — $\sqrt{6^2+6^2} = \sqrt{72} \approx 8.5$ cm.
5. B — Vertical diff $= 4$ m, horizontal $= 4$ m. $\sqrt{16+16} = \sqrt{32} \approx 5.66 \approx 5.7$ m.
Model Answers
Q6 (3 marks): (a) Wire $= \sqrt{6^2 + 4.5^2} = \sqrt{36+20.25} = \sqrt{56.25} = 7.5$ m. (b) Cost $= 7.5 \times \$3 = \$22.50$.
Q7 (2 marks): Each side satisfies $s^2 + s^2 = 10^2$, so $2s^2 = 100$, $s^2 = 50$, $s = \sqrt{50} \approx 7.07$ cm.
Q8 (4 marks): (a) Diagonal $= \sqrt{80^2+60^2} = \sqrt{6400+3600} = \sqrt{10000} = 100$ m. (b) Two-sides route $= 80+60 = 140$ m. Difference $= 140 - 100 = 40$ m shorter via diagonal.
Multi-Leg Navigation
A helicopter flies 12 km north, then 16 km east. (a) How far is it from the start? (b) It then flies 9 km south. Find the new straight-line distance from the original start point. Show all working with diagrams.
Reveal solution
(a) $d = \sqrt{12^2+16^2} = \sqrt{144+256} = \sqrt{400} = 20$ km. (b) After flying 9 km south, the helicopter is $12-9=3$ km north of start and 16 km east. New distance $= \sqrt{3^2+16^2} = \sqrt{9+256} = \sqrt{265} \approx 16.28$ km.
Always draw first
A diagram reveals the right triangle hidden in every word problem.
Clue words
Vertical, horizontal, diagonal, direct distance, straight-line — these signal a right triangle.
Rectangle diagonal
$d = \sqrt{l^2+w^2}$ — length and width are the legs.
Grid distance
$d = \sqrt{(\Delta x)^2+(\Delta y)^2}$ — horizontal and vertical gaps are the legs.
Half-width for roofs
Use half the total width when the ridge is centred — the right triangle covers one side only.
Round last
Keep full calculator precision through all intermediate steps. Round only the final answer.
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