What You Will Learn Today
- Know the circumference formula
and identify each variable - Know the area formula
and identify each variable - Compute circumference and area — exact and approximate forms
- Explain informally why
using the definition of π - Solve real-world problems involving circumference and area
- Tell circumference (linear) apart from area (square) and choose correctly
Where Do You Already See Circles?
A bicycle wheel rolls forward. A pizza gets sliced. A clock marks the hours.
- Radius (
): distance from center to edge - Diameter (
): distance across the circle — - Today's question: how do we measure the distance around and the space inside?
What Happens When We Measure C ÷ d?
| Object | Diameter |
Circumference |
|
|---|---|---|---|
| Coin | 2.4 cm | 7.5 cm | ≈ 3.14 |
| Lid | 8.0 cm | 25.1 cm | ≈ 3.14 |
| Plate | 22.0 cm | 69.1 cm | ≈ 3.14 |
| Tape roll | 5.0 cm | 15.7 cm | ≈ 3.14 |
The Ratio That Never Changes — π
The Circumference Formula Comes from π
- π ≈ 3.14159... — irrational; 3.14 is an approximation
- Exact: leave as π (e.g.,
cm) - Approximate: substitute 3.14 (e.g., ≈ 43.96 cm)
Worked Example 1: Circumference from Diameter
Problem: A circle has diameter
- Exact:
cm - Approximate:
cm - Units: centimeters — circumference is a distance (not cm²)
Worked Example 2: Circumference from Radius
Problem: A circle has radius
- Exact:
in (Approximate: in) - Radius given →
. Diameter given → .
Worked Example 3: Finding Diameter from Circumference
Problem: A circular track has circumference
- Strategy: divide
by π to find diameter - Check:
m ✓
Check: Find the Exact Circumference
A circle has radius
- Which formula do you use?
- Find the exact circumference (in terms of π)
- Find the approximate circumference (use π ≈ 3.14)
Answer:
cm
Practice: Five Circumference Calculation Problems
Find the circumference. Give exact and approximate answers (π ≈ 3.14).
cm m ft in- Inverse:
cm → find the radius
Answers: Check Your Circumference Practice
cm m ft in cm
Watch for: using diameter directly in C = 2πr, or forgetting units.
Sector Rearrangement — Building a Rectangle
The Rectangle Dimensions Reveal the Formula
- Length ≈ half the circumference
- Width ≈ the radius
Use radius only — square the radius first, then multiply by π
Worked Example 1: Area from Radius
Problem: A circle has radius
- Exact:
cm² - Approximate:
cm² - cm² — area is a 2D region, always square units
Worked Example 2: Area from Diameter
Problem: Circular tabletop,
Step 1:
Given diameter: find
Worked Example 3: Finding Radius from Area
Problem: A circle has area
Check:
Strategy: divide by π first, then take the square root
Check: Finding Area from Diameter
A circle has diameter
- What is the radius?
- Find the exact area
- Find the approximate area (use π ≈ 3.14)
Answer:
; cm²
Practice: Five Area Calculation Problems
Find the area. Give exact and approximate answers (π ≈ 3.14).
cm m ft in- Inverse:
m² → find the radius
Answers: Check Your Area Practice
cm² m² ; ft² ; in² ; m
Watch for: using diameter without halving (3–4), skipping the square root (5), writing cm not cm².
Two Formulas — When Do You Use Each?
- Circumference → linear units (cm, m, ft)
- Area → square units (cm², m², ft²)
- Key question: Am I measuring around the edge or filling the inside?
Formula Selector: Going Around or Covering Inside?
- Going around / border / perimeter →
- Covering / filling / inside →
Sorting Scenarios — Circumference or Area?
| Scenario | C or A? |
|---|---|
| Trim around a circular rug | C |
| Paint inside a circular logo | A |
| Distance a bike wheel travels in one rotation | C |
| Grass seed for a circular flower bed | A |
| Cable to wrap around a circular post | C |
| Material for a circular tablecloth | A |
"around / border / distance" → C. "Fill / cover / material" → A.
Same Garden, Two Different Questions
| Question | Formula | Answer |
|---|---|---|
| Fencing (going around) | ||
| Grass seed (covering inside) |
Check: One Bicycle Wheel Rotation
A bicycle wheel has diameter
- Circumference or area?
- Set up the equation.
- Give exact and approximate answers.
Answer: Circumference;
in
Practice: Choose Formula and Solve
Label C or A, then solve (π ≈ 3.14):
- Mirror trim:
cm - Rug area:
ft - Track arc:
m - Sprinkler coverage:
m - Clock face area:
cm - Hot tub border:
ft
Answers: Check Formula Selection Practice
| # | Type | Setup | Answer |
|---|---|---|---|
| 1 | C | ≈ 188.4 cm | |
| 2 | A | ≈ 50.3 ft² | |
| 3 | C | ≈ 251.2 m | |
| 4 | A | ≈ 153.9 m² | |
| 5 | A | ≈ 706.5 cm² | |
| 6 | C | ≈ 31.4 ft |
When the Shape Is Not a Full Circle
Real problems often involve partial circles or combined shapes.
- Semicircle: half a circle —
- Composite figure: circle combined with a polygon
- Strategy: break into parts; apply formulas to each; add or subtract
Applied Problem 1: Fencing Cost
Problem: Pool with
Step 1: Circumference (fencing = boundary)
Step 2: Cost
Applied Problem 2: Semicircular Window
Problem: A semicircular window has
Step 1: Radius:
Step 2: Semicircle =
Semicircle area = half the full-circle area
Applied Problem 3: Composite Figure
Problem: Room 10 × 8 m; rug
Practice: Four Applied Circle Problems
Label C or A, show all steps. (π ≈ 3.14)
- Sprinkler,
m — area watered? - Semicircular rug,
ft — area? - Pool
ft — rope halfway around, length? - Square tile 20×20 cm, circle
cm inside — unpainted area?
Answers: Check Your Applied Practice
m² ; ft² ft cm²
Watch for: treating problem 3 as area (it's a distance — linear units); skipping the halve-the-diameter step in problem 2.
Summary: Key Takeaways and Warnings
→- Sector rearrangement →
- Going around → C · Covering inside → A
Area formula uses
, not — find firstC gives linear units · A gives square units
Exact: leave π · Approx: use 3.14
What's Next: Cylinders and Volume
In 7.G.B.6, you'll apply circle formulas to 3D solids:
- Surface area:
(2 circles + a rectangle) - Volume:
(circle area × height)