Let r = radius, h = vertical height, d = length along the side. The lateral surface area = integral from 0 to 2*pi {r * sqrt[d^2 cos^2(x) + h^2 sin^2(x)] dx}, which is the complete Elliptical Integral of the 2nd Kind.
No, the formula is far from simple - requiring elliptical integrals.
Surface Area = 2(pi r 2) + (2 pi r)* h
archimedes
the circumfrance of the base x the height of the cylinder
Archimedes
False. The surface area formula for a right cone is not the same as the surface area formula for an oblique cone.
No, the formula is far from simple - requiring elliptical integrals.
True. This is because the slant height of an oblique cone cannot be defined.
Surface area of a cylinder = (pi) x (diameter of the circular end) x (length)
Surface Area = 2(pi r 2) + (2 pi r)* h
a run by dop mahine
archimedes
the circumfrance of the base x the height of the cylinder
Archimedes
The formula for surface area of a cylinder is (2pi * r^2) + (2pi * r * h). Substituting your values in, the surface area would be 170pi.
The surface area of a cylinder can be found using the following formula - SA = 2(Pi*r2) + (2*Pi*r)*(H) Pi = Approximately 3.14 r = Radius of the base of the cylinder H = Height of the cylinder
Total surface area of a cylinder in square units = (2*pi*radius2)+(2*pi*radius*height)