Core Chapter 6: Measurement Flashcards
State and apply for the formulas for area and circumference of a circle
Circumference = 2πr
Area = π(r)²
Define an arc and find arc length
(when θ is in both degree and radian)
Arc: Part of circle joining 2 points subtended by θ
Arc length (when θ is in deg)
= θ/360 x 2πr
Arc length (l) (when θ is in rad)
= rθ
Define a sector and find area and perimeter of a sector
Sector: Region between 2 radii and an arc
Perimeter = 2r + rθ [rad] OR 2r +θ/360 x 2πr [deg]
Area = 1/2 (r²θ) [rad] OR θ/360 x πr² [deg]
Find the surface area of both solids with plane surfaces and solids with curved surfaces
Surface area of solids with plane faces: sum of the area of all the faces of a solid (area of the net)
Solids with curved faces: cylinder, sphere and cone
- Surface area of a cylinder = 2πrh (area of the curved surface) + 2πr² (area of the 2 circular bases)
- Surface area of a sphere = 4πr²
- Surface area of a cone = πrs (area of the curved surface) + πr² (area of the circular base)
Find the volume of both solids with uniform cross-section and tapered solids
Volume of solids with uniform cross section: area of base x height
- Eg. Volume of cylinder = πr²(volume of base) x h (height)
Volume of tapered solids: 1/3 x (area of base x height)
- Eg. Volume of sphere = 4/3πr³
