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705-805 (Hard)|   Geometry|      
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Hoozan
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal Updated on: 17 Jan 2021, 04:50
Originally posted by Hoozan on 10 Sep 2020, 22:34.
Last edited by Hoozan on 17 Jan 2021, 04:50, edited 2 times in total.
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C
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50% (02:52) correct 50% (02:52) wrong based on 172 sessions

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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tall is to be filled to maximum capacity with identical barrels that are right circular cylinders. The barrels have a radius of 2 feet, a height of 6 feet, and can be both stacked and aligned in perfect rows. Which of the following is the closest approximation of the total capacity, in cubic feet, of the barrels that are to be placed in the storage container?

(A) 19,000
(B) 101,000
(C) 115,000
(D) 144,000
(E) 450,000
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C
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 10 Sep 2020, 23:08
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It works out pretty well because the Dimensions of the Box are Multiples of the Dimensions of Each Cylinder.

The Diameter of 1 Cylinder = 4 ft

Across the Length, we can put: 120/ 4 = 30 Cylinders to a Row

Across the Width, we can put: 40/4 = 10 Cylinders to a Column

30 * 10 = 300 Cylinders can be placed on the Bottom Stack.

Since each Cylinder is 6 ft in Height and the Height of the Box is 30 ft, we can Stack: 30/6 = 5 Levels of 300 Cylinders = 1500 Cylinders can be stacked in the Box


What is the Volume/Capacity of these 1500 Cylinders?


Volume of 1 Cylinder = (pi) * (2)^2 * 6 = 24(pi)

Volume of 1500 Cylinders = 1, 500 * (24 (pi)) = 36, 000 (pi)

Approximating (pi) as around 3 (which is an UNDERESTIMATE, so the Actual Answer should be a SLIGHTLY HIGHER VALUE)

36, 000 * 3 = 108 , 000

-B- is too low and -D- is too high

Answer -C-
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 11 Sep 2020, 07:17
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If you put each cylinder perfectly in a rectangular box with height 6, and length and width 4 (the diameter of the cylinder), those boxes would fit perfectly into the cargo container with no unused space (because the height is divisible by 6, and the other dimensions by 4). A cylinder only takes up less space than a box that perfectly contains it because of the area outside of the circular circumference of the cylinder, but inside the square confines of the box. Since a circle inscribed in a square takes up π/4 of the area of that square, all of our cylinders will occupy π/4 of the total volume of the cargo container. If we estimate π/4 to be 3/4, we'll get an answer slightly too small, so the answer here will be slightly bigger than (3/4)(40)(30)(120) = 108,000, and C must be right.
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 11 Sep 2020, 07:37
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We need to look at how many cylinders are to be stacked together. Both vertically and in a row.

So, starting with the base, we have the Length where we can put = 120/ 4 = 30 cylinders (4 is nothing but the diameter of the cylinder)
Similarly, across the Width we can put = 40/4 = 10 cylinders
In total, we have completely occupied the base with 30 cylinders along length and 10 along width, which equals to 300 on the base.

Now we stack them vertically, so we know height of cylinder as 6 and the container is 30, so 30/6 = 5 levels of 300 cylinders = 1500 cylinders can be stacked in the Box

Volume of 1 cylinder = \((pi) * r^2 * h = 24*(pi)\)

Volume of 1500 cylinders = \(1500*24*(pi) = 36000 (pi) = 113000(approx) \)

Hence OPTION [C] is right.
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 23 Dec 2020, 01:25
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IanStewart
If you put each cylinder perfectly in a rectangular box with height 6, and length and width 4 (the diameter of the cylinder), those boxes would fit perfectly into the cargo container with no unused space (because the height is divisible by 6, and the other dimensions by 4). A cylinder only takes up less space than a box that perfectly contains it because of the area outside of the circular circumference of the cylinder, but inside the square confines of the box. Since a circle inscribed in a square takes up π/4 of the area of that square, all of our cylinders will occupy π/4 of the total volume of the cargo container. If we estimate π/4 to be 3/4, we'll get an answer slightly too small, so the answer here will be slightly bigger than (3/4)(40)(30)(120) = 108,000, and C must be right.
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This is a really cool approach <3

IanStewart
Could you please show the calculation that lands up with "a circle inscribed in a square takes up π/4 of the area of that square"
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 23 Dec 2020, 03:30
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Volume of cylinder = pi*r^2*h = 24pi

Now we need to find how many cylinders can be kept.
Length = 120
So 120/4 = 30 cylinders across it
Width = 40
So 40/4 = 10 cylinders
Height = 30
So 30/6 = 5 cylinders

Hence total = 30*10*5 = 1500 cylinders

Total capacity = 1500*24*3.14 = 113040

Answer - Option C

Posted from my mobile device
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 23 Dec 2020, 06:59
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Hoozan

This is a really cool approach <3

IanStewart
Could you please show the calculation that lands up with "a circle inscribed in a square takes up π/4 of the area of that square"
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If you draw a circle of radius 1, its area is πr^2 = π(1^2) = π. If you inscribe that circle in a square, the diameter of the circle with be the length of a side of the square. The diameter of the circle is 2, so the area of the square is 2^2 = 4, and the ratio of the area of the circle to that of the square is π/4.

I've chosen a number for the radius, because the answer will be the same no matter what the radius is, but anyone unsure of that could instead do the above using a radius of 'r', and will get the same answer; the 'r' will cancel out when you find the ratio of the two areas.
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 17 Feb 2021, 21:31
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Wondering here if my approach is correct.

r = 2, h = 6 --> V = πr^2 = 24π ---> diameter = 4

Given the dimensions of the container, then we can fit this many boxes
h ---> 5
w ---> 10
l ---> 30

So 30 x 10 x 5 = 1500 boxes

1500 x 24π = ~ 1500 x 25 x 3 = 1500 x 75

15 x 75 = 1125

So C.
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A cargo container that is 120 feet long, 40 feet wide, and 30 feet tal 12 Apr 2022, 12:20
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