VT · Arc Length & Sector Area

Calculator

In each set, one thing changes and everything else stays the same. Work them out in order and look for the pattern — the last line tells you what to notice.

Sector area: the angle stays 90°, the radius changeschanging: radius
Work out the area of each sector.
4 cm
Sector ()90°4 cm
=
6 cm
Sector ()90°6 cm
=
8 cm
Sector ()90°8 cm
=
10 cm
Sector ()90°10 cm
=
What happens to the area each time the radius goes up? What about when it doubles?
Sector area: the radius stays 12 cm, the angle changeschanging: angle
Work out the area of each sector.
45°
Sector ()45°12 cm
=
90°
Sector ()90°12 cm
=
135°
Sector ()135°12 cm
=
180°
Sector ()180°12 cm
=
The angle doubles from 45° to 90° to 180°. What happens to the area?
Arc length: the angle stays 120°, the radius changeschanging: radius
Work out the length of the arc of each sector.
3 cm
Sector ()120°3 cm
=
6 cm
Sector ()120°6 cm
=
9 cm
Sector ()120°9 cm
=
12 cm
Sector ()120°12 cm
=
How is the arc length changing compared with the radius?
Same sector (radius 8 cm, angle 90°): what changes is what you are asked to findchanging: what to find
For this one sector, work out:
the arc length
Sector ()90°8 cm
=
the area
Sector ()90°8 cm
=
the perimeter
Sector ()90°8 cm
=
Same numbers, three different formulas. Which parts of the working are the same?

Answers · Arc Length & Sector Area

Variation practice
① Sector area: the angle stays 90°, the radius changes
4 cm: 12.6 cm²6 cm: 28.3 cm²8 cm: 50.3 cm²10 cm: 78.5 cm²
② Sector area: the radius stays 12 cm, the angle changes
45°: 56.5 cm²90°: 113 cm²135°: 170 cm²180°: 226 cm²
③ Arc length: the angle stays 120°, the radius changes
3 cm: 6.28 cm6 cm: 12.6 cm9 cm: 18.8 cm12 cm: 25.1 cm
④ Same sector (radius 8 cm, angle 90°): what changes is what you are asked to find
the arc length: 12.6 cmthe area: 50.3 cm²the perimeter: 28.6 cm
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