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Area and Circumference of Circles

Area and Circumference of Circles

To work with circles, you need to know three important parts:

  • Radius (rr): The distance from the center to the edge.
  • Diameter (dd): The distance across the circle through the center. The diameter is always twice the radius (d=2rd = 2r).
  • Pi (ฯ€\pi): A special mathematical constant representing the ratio of a circle's circumference to its diameter. We usually approximate ฯ€โ‰ˆ3.14\pi \approx 3.14 or 227\frac{22}{7}.

Circumference: The Distance Around

The circumference is the perimeter, or the distance around the outside edge of the circle.

Formulas: C=ฯ€dC = \pi d or C=2ฯ€rC = 2 \pi r

Example: Find the circumference of a circle with a diameter of 14. Since d=14d = 14, use the formula C=ฯ€dC = \pi d: C=14ฯ€โ‰ˆ14ร—3.14=43.96C = 14\pi \approx 14 \times 3.14 = 43.96

Area: The Space Inside

The area measures the total flat space inside the circle.

Formula: A=ฯ€r2A = \pi r^2 (Remember: Always square the radius first, then multiply by ฯ€\pi!)

Example: Find the area of a circle with a radius of 5. A=ฯ€(5)2A = \pi (5)^2 A=25ฯ€โ‰ˆ25ร—3.14=78.5A = 25\pi \approx 25 \times 3.14 = 78.5

Semicircles (Half Circles)

A semicircle is exactly half of a circle.

Area of a Semicircle: Just find the area of a full circle and divide by 2. A=12ฯ€r2A = \frac{1}{2} \pi r^2

Perimeter of a Semicircle: The perimeter includes the curved edge (which is half the circumference) plus the straight bottom edge (which is the diameter). P=ฯ€r+dP = \pi r + d

Example: Find the area and perimeter of a semicircle with a radius of 6.

  • Area: A=12ฯ€(62)=12ฯ€(36)=18ฯ€โ‰ˆ56.52A = \frac{1}{2} \pi (6^2) = \frac{1}{2} \pi (36) = 18\pi \approx 56.52
  • Perimeter: The diameter is 2ร—6=122 \times 6 = 12. The curved part is ฯ€ร—6=6ฯ€\pi \times 6 = 6\pi. P=6ฯ€+12โ‰ˆ(6ร—3.14)+12=18.84+12=30.84P = 6\pi + 12 \approx (6 \times 3.14) + 12 = 18.84 + 12 = 30.84