Show if the total surface area of a sphere is same that of the total lateral surface of a right circular cylinder and if that is enclosed.
Answers
Proved !!
Let the radius of the sphere be r cm.
Then,
Surface area of the sphere = 4πr² cm² ...(i)
The radius and height of a right circular cylinder that just encloses the sphere of radius r and 2r respectively.
Surface area of the cylinder = 2πr x 2r
= 4πr² cm² ...(ii)
From (i) and (ii), we have
Surface area of the sphere is equal to the surface area of the cylinder that just encloses the sphere.
Answer:
Hello mate..
here is your desired answer..
Step-by-step explanation:
circumference of the base = 2πr = 88 cm.
2πr = 88
r = 88*7/2*44
r = 14 cm.
T.s.a = 2π r(r+h)
6512= 2*22/7*14(14+h)
6512= 88(14+h)
6512= 1232+88h
6512-1232=88h
5280 = 88h
h = 5280/88
h = 60 cm
vol. of cylinder = π*r^2*h
= 22/7*(14)^2*60
= 22/7*196*60
= 36960 cm^2
Hope this helped