Math, asked by adi1423tya, 7 months ago

A right circular cone, with radius to height ratio as 12:5, is cut parallel to its base to get a smaller cone and a frustum. If height of smaller cone to the height of the frustum are in the ratio 3:1, by what percentage is the combined total surface area of the smaller cone and frustum more with respect to the original cone?​

Answers

Answered by amitnrw
0

Given :  A right circular cone, with radius to height ratio as 12:5, is cut parallel to its base to get a smaller cone and a frustum.

height of smaller cone to the height of the frustum are in the ratio 3:1,

To Find : By what percentage is the combined total surface area of the smaller cone and frustum more with respect to the original cone?​

Solution:

Original cone Radius  = 12k

Height  = 5k

Lateral height = √(5k)² + (12k)² =  13k

Original cone total surface area = πr² + πrL

= π (12k)² + π12k(13k)

=  300πk²

height of smaller cone to the height of the frustum are in the ratio 3:1,

Height of smaller cone = (3/4)5k = (15/4)k

radius of smaller cone = r

r/12k  =   (15/4)k / 5k

=> r = 9k

Additional surface area added -  base of new smaller cone  and upper base of frustum shape.  

Surface area added = 2 * π (9k)²  = 162πk²

combined total surface area of the smaller cone and frustum more with respect to the original cone = 100 x  162πk²  / 300πk²

=  54 %

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