how to figure out water volume on a hexagonal fish tank?

[saltyESQ]

the tank is 48 x 48 x 36tall

 

[bromion]

Guess no geometry in law school? : )

I assume it's a perfect hexagon (all sides equal in size)? Easiest way is to get the area of the hexagon footprint:
48x48 - 4*1/2*16*16 = 1792 sq in
(that is the area of the 48x48 square minus the area of the four triangular corners that are cut out)

Multiply by the height
1792*36 = 64512 cu in

Which is 279.27 gallons

 

[dacoolguychris]

geez that's a big tank... 4ft by 4ft by 3ft.. nice show tank somewhere..

SaltyESQ: you currently own it or thinking about getting it?

 

[Bigmike]

Bromion's calculations would be correct if it was 48 from corner to corner, but Im guessing its 48 from flat to flat? Then its not so easy, but it would be about 311 gallons.

 

[Scissorhand]

*pfftt**

just use 5 gallon jugs as measurement and start counting up.

 

[anthias_lover]

Just get a one gallon empty milk container, fill it with water, and keep dumping all the water into the tank. Count how many times this takes until the tank is full. That's how many gallons…j/k

bromion, your footprint calculation is not right. The volume of four triangular corners are not 4*16*16. 16 is the base, not the side length. The formula for the area of the hex base is (3/2)r^2*sqrt(3).

or A = (3/2)16^2*sqrt(3) = 665.1 in square

so V = 665.1 * 36 = 23943.9 in cube

Which is 103.65gal of water.

You can double check by typing the numbers in this link:

http://www.reefwaves.com/volume_calc.php

 

[gps]

All of these complicated math give me a big headache....

How about the old fashion way of putting in the water, one gallon at a time, to find out....

 

[Bigmike]

<a href=showthread.php?s=&postid=11662010#post11662010 target=_blank>Originally posted</a> by anthias_lover


bromion, your footprint calculation is not right. The volume of four triangular corners are not 4*16*16. 16 is the base, not the side length. The formula for the area of the hex base is (3/2)r^2*sqrt(3).

http://www.reefwaves.com/volume_calc.php

Bromion is correct in his calculations, you used 16 as the side length where the sides should be aroudn 27.7 inches not 16. Type 27.7 into the website you provided and you will see that it is exactly what I said earlier. 48 from flat to flat and it would be 311

 

[BurntOutReefer]

my head just imploded.....
3checkmark3 over 2, s2h,where s is length....

 

[Scissorhand]

Just think of the implications if calculations were off:

# of livestock could exceed the fish-per-gallon golden rule

incorrect amount of B-Ionic dosing will OD the tank

Floor will collapse due to excessive amount of weight

The Earth slowing down causing unsuspecting reefers to eject into the bottomless pits of space!

 

[GreshamH]

Here's another volume calculator done by jdieck. He's the same one that did the Reef Chemistry Calculator which is the second link

http://reef.diesyst.com/volcalc/volcalc.html

http://reef.diesyst.com/chemcalc/chem_calc3.html

 

[anthias_lover]

I assume it's a perfect hexagon (all sides equal in size)? Easiest way is to get the area of the hexagon footprint:
48x48 - 4*1/2*16*16 = 1792 sq in
(that is the area of the 48x48 square minus the area of the four triangular corners that are cut out)

Bigmike, can you explain how he has a correct calculation about his hex area? and how you came up with 27.7 inches?

The way I see in his calculation is incorrect. If he has the area of the four triangular corners, according to his calculated 4*1/2*16*16, that means the other four lengths must be 48 - (2x16) = 16 in. But it is incorrect in hex case. You can draw a pic and see what I mean.

My result was base on 16 in of size length, to response to bromion's result. The original question/given is not clear about the lengths. My given formula to calculate the hexagon area (3/2)r^2*sqrt(3) is correct.

There are many ways to calculate the hex area, but most people don’t care about how volume calculator comes from on web. They just type numbers in and have an answer…avoid the headache I guess.

 

[bromion]

Sorry... I thought OCTAgon (8 sides) not HEXAgon (6 sides)!

Is it a regular hexagon (all sides equal) or is there one long side?

For a regular hex, given the length of one side (L) in inches the volume is:
2.6*L*L*H (cubic inches)

 

[dacoolguychris]

and stioll i ask.. PICS!!!!

 

[dacoolguychris]

and still i ask.. PICS!!!!

 

[bromion]

Bigmike's is right if it's 48" from flat side to flat side. 311 g

You can find the length of a side in that case by trigonometry:
side length = (48/2)/sin(60deg) = 27.71" (about)

Of course, it could be 48" from point to point. In that case, the length of a side is 24", meaning the volume is 233.4 gallons

 

[dacoolguychris]

i know math would help one day.. yeay law of sines... either way.. it's a big tank..

 

[saltyESQ]

Not to make things more complicated, but I finally got the tank and here are the exact measurements. It's a perfect hexagon, diameter is 42" (measuring from the 2 opposite flat sides) and 48" (measuring from longest points of the hexagon), 29.5" tall, and each of the flat hex sides are 24" across (from edge to edge of the hexagon). Can someone recalculate the tank volume for us liberal arts majors? The guy who sold it to me said it was a 200g. I think he's close, but I'd like to know for sure so I can buy the right skimmer. Here's some pics for those who need to visualize. It's still pretty dirty, but you get the idea.

I have another question: how big should the holes be for the overflow and return? They seem a little small to me. Take a look at the pic of the inside overflow and let me know what you think.

Thanks much.

 

[anthias_lover]

Are you kidding me? all the numbers above are given. It's about 191 gal. Try to figure it out bud...

 

[saltyESQ]

dude, i didn't want to decipher the debate among the scientists, thought you guys could hash it out and let me know when you came to a resolution LOL