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Trigonometry — Build a Clinometer and Measure a Tree's Height
Mark

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Mark

2. Juli 2026FI
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Trigonometry — Build a Clinometer and Measure a Tree's Height

A hands-on maths project: make a simple clinometer from a protractor, a straw and a weighted string, use it to measure the angle to the top of a tree or building, and then calculate the height you cannot reach. A Python cell does the trigonometry, and a compendium shows why sine waves run through all of science.
Anfänger
30 minutes

Anweisungen

1

Turning an angle into a height

Ancient astronomers invented trigonometry to turn the ANGLES they measured into the LENGTHS of triangles. You will use it to measure the height of something too tall to reach.
2

Build a clinometer

Tape a drinking straw along the straight edge of a protractor to sight through. Tie a short string to the centre of the protractor with a small weight on the end, so it hangs down and shows the angle. That is a clinometer -- it measures how steeply you are looking up.

Materialien für diesen Schritt:

Cardstock Assorted Pack (50 sheets)Cardstock Assorted Pack (50 sheets)1 Stück
Cotton Kitchen StringCotton Kitchen String1 Stück
Stainless Steel Straw Set (8-Pack)Stainless Steel Straw Set (8-Pack)1 Stück

Benötigte Werkzeuge:

ProtractorProtractor
3

Sight the treetop and measure

Stand back from a tree or building and look through the straw at its very top. Read the angle the hanging string marks on the protractor (this tells you the angle above horizontal). Then measure your distance from the base with a tape measure. Write down the angle and the distance.

Benötigte Werkzeuge:

Measuring Tape 3mMeasuring Tape 3m
4

Calculate the height

Loading Jupyter Notebook...

Benötigte Werkzeuge:

Desktop ComputerDesktop Computer
CalculatorCalculator
5

Compendium: the mathematics of waves

What your clinometer teaches. (1) In a right triangle the sine, cosine and tangent are ratios of the sides that depend ONLY on the angle, so a single table of them works for every triangle -- Ptolemy tabulated them around 150 AD, and Indian mathematicians shaped them into the 'sine' we use (the word comes from Sanskrit jya). (2) The tangent turns an angle you can see into a length you cannot reach -- the everyday tool of surveyors and sailors. (3) As an angle turns full circle, sine and cosine trace smooth repeating WAVES. (4) Those sine waves describe sound, light, radio, tides and alternating current, and underlie GPS, music synthesis and the Fourier analysis that compresses every image and song on your phone.

Materialien

3

Benötigte Werkzeuge

4

You can swap these in

Can't get one of the materials? Swap it for an equivalent — these work just as well.

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