Question

the height of the cone is 30cm. a small cone is cut off at the top by a plane parallel to the base. if its volume be 1/27th part of the volume of the given cone at what height above the best the section has been made?

Answer 1

Given: The height of cone is 30 cm. A small cone is cut off at the top by a plane parallel to the base and its volume be 1/27th of the volume of coneTo find : height above the base is the section made let the height and radius of original(big) cone be H and R

let the height and radius of cut off (small) cone be h and r

from similar triangles, we know 

H / R = h / r

h = H r / R

since H = 30

h = 30 (r /R) .......................................................(1)

Volume of big cone, V = (1/3) pi R2 H

volume of small cone,v = (1/3) pi r2 h
now dividing , we get 
V / v = (R2 H )/ (r2 h) = 27 (since volume of small cone is 1/27 of big cone)

=> R2 H = 27r2 h 

=> 30 R2 = 27r2h                     { since the H = 30 cm given }

=> h = (30R2) / ( 27 r2 )

=> h = (30 /27)(R /r)2 .................................................(2)  From equating (1) and (2)
=> 30 (r /R) = (30 /27) (R/r)2
=>(r /R)3 = 1 / 27
=> r / R = 1/3........................................................(3)

substituting eq (3) in eq (1), we get=> h = 30 (r /R)
=> h = 30 (1/3) = 10 cm

The section is made above the base is 30cm - 10cm = 20 cm Answer  

Answer 2

Answer:

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