A cone has a height of #5 cm# and its base has a radius of #5 cm#. If the cone is horizontally cut into two segments #3 cm# from the base, what would the surface area of the bottom segment be?
1 Answer
# SA_("frustum") = (14+21sqrt(2))pi#
# " " ~~ 137.28 \ cm^2#
Explanation:
Consider a cross section:
We want to calculate the surface area of the base (after a cone section is remove), also known as a frustum .
Here we have
Firstly we can calculate the curved surface area of the original cone
# SA_(AED) = pi * DF * AD #
We can calculate
# AD^2 = AF^2+DF^2 #
# " " = 5^2+5^2 #
# " " = 25+25 #
# " " = 50 => AD = sqrt(50)=5sqrt(2)#
And so returning to the curved Surface Area, we get:
# SA_(AED) = pi * 5 * 5sqrt(2) #
# " " = 25sqrt(2)pi #
We can perform a similar calculation for the upper cone
# AB^2=BG^2+AG^2 #
We are not given the upper radius if the frustum, we can however use similar triangles to calculate it:
# triangle AEF# is similar to#triangle ACG#
# :. (AF)/(EF) = (AG)/(CG) #
# :. (5)/(5) = (2)/(CG) => CG=BG=2#
Therefore returning to our Pythagorean equation we have:
# AB^2=2^2+2^2 #
# " "=4+4 #
# " "=8 => AB=sqrt(8)=2sqrt(2)#
And so we can calculate the curved surface area of the upper cone
# SA_(ABC) = pi * BG * AB #
# " " = pi * 2 * 2sqrt(2) #
# " " = 4sqrt(2)pi #
And so the curved surface area of the frustum is the difference between these calculation:
# SA_(BDCE) = SA_(AED) - SA_(ABC) #
# " " = 25sqrt(2)pi - 4sqrt(2)pi #
# " " = 21sqrt(2)pi#
And the total surface are would also include the circular base and top of frustum (using
# SA_(base) = 2pi*DF#
# " " = 2pi*5#
# " " = 10pi#
# SA_(top) \ \ \ = 2pi*BG#
# " " = 2pi*2#
# " " = 4pi#
Hence the complete surface are of the remaining frustum is:
# SA_("frustum") = SA_(BDCE) + SA_(base) + SA_(top) #
# " " = 21sqrt(2)pi + 10pi+4pi#
# " " = 21sqrt(2)pi + 14pi#
# " " = (14+21sqrt(2))pi#
# " " ~~ 137.28 \ cm^2#
