Difference between revisions of "2021 WSMO Accuracy Round Problems/Problem 6"
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+ | ==Problem== | ||
+ | Roy is baking a circular three tier cake. All of the tiers are centered around the same point. Each tier's radius is <math>\frac{3}{4}</math> of the radius of the tier below it, but the height of each tier stays constant. Roy wants to ice the cake, but only on the curved surfaces of the cake and the top of the smallest tier. The diameter of the lowest tier is <math>128</math> centimeters and its height is <math>10</math> centimeters. If the surface area that is iced can be expressed as <math>m\pi,</math> find <math>m.</math> | ||
+ | ==Solution 1== | ||
+ | We will consider the three tiers separately. The bottom tier has a diameter of 128 and and a height of 10. Therefore, the surface area of the iced part of the bottom tier is <math>128\pi\cdot10=1280\pi.</math> The middle tier has a diameter of <math>128\cdot\frac{3}{4}=96</math> and a height of 10. Therefore, the surface area of the iced part of the middle tier is <math>96\pi\cdot10=960\pi.</math> The top tier has a diameter of <math>96\cdot\frac{3}{4}=72</math> and a height of 10. Therefore, the surface area of the iced part of the side of the top tier is <math>72\pi\cdot10=720\pi.</math> Also, the radius of the top tier is <math>\frac{72}{2}=36.</math> Thus, the surface area of the iced part of the top of the top tier is <math>36^2\pi=1296\pi.</math> We conclude that the final answer is <cmath>1280\pi+960\pi+720\pi+1296\pi=4256\pi\Longrightarrow\boxed{4256}.</cmath> | ||
+ | ~pinkpig | ||
+ | ==Solution 2== | ||
So there is a 3 tier cake i.e. 3 cylinders of the same height but different radii stacked over each other. | So there is a 3 tier cake i.e. 3 cylinders of the same height but different radii stacked over each other. | ||
The LOWERMOST Tier: Given Diameter = 128 => Radius = 64 and Height = 10 | The LOWERMOST Tier: Given Diameter = 128 => Radius = 64 and Height = 10 | ||
Line 10: | Line 16: | ||
The Top Layer of TOPMOST Tier : Radius = 36 | The Top Layer of TOPMOST Tier : Radius = 36 | ||
− | So Surface Area Iced = πr^2 = π*36*36 = | + | So Surface Area Iced = πr^2 = π*36*36 = 1296π |
− | Thus Total Surface Area Iced = 1280π+960π+720π+ | + | Thus Total Surface Area Iced = 1280π+960π+720π+1296π = 4256π |
SO m=5552 | SO m=5552 | ||
~AshutoshVerma | ~AshutoshVerma |
Latest revision as of 10:04, 11 July 2022
Problem
Roy is baking a circular three tier cake. All of the tiers are centered around the same point. Each tier's radius is of the radius of the tier below it, but the height of each tier stays constant. Roy wants to ice the cake, but only on the curved surfaces of the cake and the top of the smallest tier. The diameter of the lowest tier is centimeters and its height is centimeters. If the surface area that is iced can be expressed as find
Solution 1
We will consider the three tiers separately. The bottom tier has a diameter of 128 and and a height of 10. Therefore, the surface area of the iced part of the bottom tier is The middle tier has a diameter of and a height of 10. Therefore, the surface area of the iced part of the middle tier is The top tier has a diameter of and a height of 10. Therefore, the surface area of the iced part of the side of the top tier is Also, the radius of the top tier is Thus, the surface area of the iced part of the top of the top tier is We conclude that the final answer is ~pinkpig
Solution 2
So there is a 3 tier cake i.e. 3 cylinders of the same height but different radii stacked over each other. The LOWERMOST Tier: Given Diameter = 128 => Radius = 64 and Height = 10 So Surface Area Iced = 2πrh = 2*π*64*10 = 1280π
The MIDDLE Tier : Radius = 3/4*64 = 48 and Height = 10 So Surface Area Iced = 2πrh=2*π*48*10 = 960π
The TOPMOST Tier : Radius = 3/4*48 = 36 and Height = 10 So Surface Area Iced = 2πrh=2*π*36*10 = 720π
The Top Layer of TOPMOST Tier : Radius = 36 So Surface Area Iced = πr^2 = π*36*36 = 1296π
Thus Total Surface Area Iced = 1280π+960π+720π+1296π = 4256π
SO m=5552
~AshutoshVerma