A cone has a height of #36 cm# and its base has a radius of #9 cm#. If the cone is horizontally cut into two segments #12 cm# from the base, what would the surface area of the bottom segment be?

1 Answer
Oct 20, 2017

Total surface area of bottom segment is #950.46# sq.cm

Explanation:

The cone is cut at 12 cm from base, So upper radius of the frustum

of cone is #r_2=(36-12)/36*9=6# cm ; slant height of the frustum

is #l=sqrt(12^2+(9-6)^2)=sqrt(144+9)=sqrt 153=12.37# cm

Top surface area #A_t=pi*6^2=113.1# sq.cm

Bottom surface area #A_b=pi*9^2=254.47#sq.cm

Slant area #A_s=pi*l*(r_1+r_2)=pi*12.37*(9+6)=582.89#sq.cm

Total surface area of bottom segment

#=A_t+A_b+A_s=113.1+254.47+582.89=950.46 (2dp)# sq.cm [Ans]