A cone has a height of $6 c m$ $6 cm$ and its base has a radius of $6 c m$ $6 cm$ . If the cone is horizontally cut into two segments $3 c m$ $3 cm$ from the base, what would the surface area of the bottom segment be?

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A cone has a height of $6 c m$ $6 cm$ and its base has a radius of $6 c m$ $6 cm$ . If the cone is horizontally cut into two segments $3 c m$ $3 cm$ from the base, what would the surface area of the bottom segment be?

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Answer 1 · 2016-04-27T12:17:38

Yosief you answer is great but you just subtracted the original cone and the top cone. While that will give you a complete solution for the volume for the surface area you have three parts you need to consider:
1) The Base Area => this area of the circle
2) The side Area, that is the one you got by $π s (R - r)$ $pis(R-r)$ that you have right
3) Because you cut it now you have a smaller circle on top so you need to this area.

So using your terms
$S A_{F} = BA + Side Area + Top Area$ $SA_F = "BA + Side Area + Top Area"$
$S A_{F} = π R^{2} + π s (R - r) + π r^{2} = π (R^{2} + r^{2}) + π s (R - r)$ $SA_F = piR^2 + pis(R-r) + pir^2 = pi(R^2+r^2) + pis(R-r)$

What changed? Well in your formula the first is the sum of squares instead the difference of squares. You were not that far you were a sign away from the correct answer. Make that change and voila you got it...

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Answer 2 · 2016-05-02T19:09:10

Surface area of bottom shape = $9 π (4 + \sqrt{18})$ $9pi(4 + sqrt18)$

Explanation:

Let's start off by writing down what is already known and then finding some of the values we will need later.

The BIG cone and the small cone are similar figures.
R = 6cm ; r = 3cm
H = 6cm ; h = 3cm
L = $\sqrt{72}$ $sqrt72$ ; $l$ $l$ = $\sqrt{18}$ $sqrt18$ ( $l$ $l$ is the slant height, found by Pythagoras)

Small cone:
surface area = area base + curved surface
s.a. = $π r^{2}$ $pi r^2$ + $π r l$ $pi r l$ = $π {(3)}^{2} + π (3) \sqrt{18}$ $pi(3)^2 + pi (3)sqrt18$

Factorise to make it easier: s.a. = $3 π (3 + \sqrt{18})$ $3pi(3 + sqrt18)$

In similar figures, the areas are in the same ratio as the square of the sides, length, radius etc.

$\frac{3^{2}}{6^{2}}$ $3^2/6^2$ = $\frac{3 π (3 + \sqrt{18})}{S A}$ $(3pi(3 + sqrt18))/(SA)$ $\Rightarrow$ $rArr$ $\frac{1}{4}$ $1/4$ = $\frac{3 π (3 + \sqrt{18})}{S A}$ $(3pi(3 + sqrt18))/(SA)$

BIG CONE: Surface area = $4 \times 3 π (3 + \sqrt{18})$ $4 xx 3pi(3 + sqrt18)$
= $12 π (3 + \sqrt{18})$ $12pi(3 + sqrt18)$

Surface area of fustrum (bottom segment);

BIG AREA - small area

= $12 π (3 + \sqrt{18})$ $12pi(3 + sqrt18)$ - $3 π (3 + \sqrt{18})$ $3pi(3 + sqrt18)$

= $9 π (3 + \sqrt{18})$ $9pi(3 + sqrt18)$

However, the circular cut surface must be included as well.

Total Surface area = $9 π (3 + \sqrt{18})$ $9pi(3 + sqrt18)$ + $π {(3)}^{2}$ $pi(3)^2$
= $9 π (3 + \sqrt{18})$ $9pi(3 + sqrt18)$ + $9 π$ $9pi$
= $9 π (3 + \sqrt{18} + 1)$ $9pi(3 + sqrt18 +1)$
= $9 π (4 + \sqrt{18})$ $9pi(4 + sqrt18)$

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A cone has a height of $6 c m$ $6 cm$ and its base has a radius of $6 c m$ $6 cm$ . If the cone is horizontally cut into two segments $3 c m$ $3 cm$ from the base, what would the surface area of the bottom segment be?

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Explanation:

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A cone has a height of 6 cm6cm6 cm and its base has a radius of 6 cm6cm6 cm. If the cone is horizontally cut into two segments 3 cm3cm3 cm from the base, what would the surface area of the bottom segment be?

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A cone has a height of $6 c m$ $6 cm$ and its base has a radius of $6 c m$ $6 cm$ . If the cone is horizontally cut into two segments $3 c m$ $3 cm$ from the base, what would the surface area of the bottom segment be?