The area of the entire surface of a truncated cone with the radius of the lower base R = 15, with the radius of the upper base r = 14, and the generative L = 1 equal to 1413.675

A truncated cone is a part of a cone located between its base and a secant plane parallel to the base.
The formula for the area of the entire surface of the cone where R is the radius of the lower base,r is the radius of the upper base, L is the length of the generatrix.

Solution:

S = π·(R²+(R+r)L+r²)

= π·(15²+(15+14)1+14²)

= π·(225+29·1+196)

= π·(225+29+196)

= 450·π

1413.675

a: The area of the entire surface of a truncated cone with the radius of the lower base R = 15, with the radius of the upper base r = 14, and the generative L = 1 equal to 1413.675