Coal to Rocket Fuel using Coal Liquefaction, Over-unity Gain!

Power Plants, Energy Storage and Reliable Energy Supply. All about efficient energy production. Turning parts of your factory off. Reliable and self-repairing energy.

patrick12222010
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Coal to Rocket Fuel using Coal Liquefaction, Over-unity Gain!

I found a blueprint by Pieter van Ginkel, https://factorioprints.com/view/-L-maGtV6rlDNTQ1zQHq
I modified it a bit for 0.17. Here it is:

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Image

Image

Blueprint:

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


I need the experts here to compact this. :)

This setup is ~235% overunity / efficient.

Great for guys like me who want to build gigawatt steam power setups.

UPDATE!

Now, I created something a lot bigger. Behold:

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

Image

Image

Now, for the computations

Coal In: 5.9k/min = 98.333/s = 393.333 MJ/s
Power In: 562MW = 562 MJ/s
Total In: 955.333 MJ/s

Rocket Fuel Out: 1.2k/min = 20/s = 2000 MJ/s

Overunity: 2.09

This means Coal Liquefaction give you more energy from coal.

Still there are people who would want to push coal liquefaction to its limits. See this below post. There is a major discussion also to convert to rocket fuel or not.
viewtopic.php?f=5&t=71823

Last edited by patrick12222010 on Mon Jun 17, 2019 11:57 pm, edited 4 times in total.

Zaflis
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Re: Coal to Rocket Fuel using Coal Liquefaction, Over-unity Gain!

Post by Zaflis »

So going by kirk's calculation 4.62 rocket fuels means that we first have 33 solid fuel. I'll deal with that math later because it's same with both, but the assembling into rocket fuel means:
Energy cost of 66.2 MW + 8 beacons = 70.04 MW.
How much energy is in rocket fuels: 4.62 * 100 MJ = 462 MJ
33 solid fuels each make 12 MJ so they total 396 MJ.
Difference between rocket fuels and solid fuels is 462 MJ - 396 MJ = 66 MJ.
Now, i'm not perfect with math and physics equations, but we can match MW and MJ right? If it costs over 70 MW to convert it to rocket fuel, the gain of 66 MJ is exceeded. Therefore solid fuel would have been 4.04 MJ more efficient. That's very tiny amount though, about equal to 1 piece of coal. So if you like rocket fuel, sure it still seems worthy investment i guess at least because it's more compressed.

So how much does it cost to produce 33 solid fuels?
20 MW + 1.3 MW + 8.7 MW + 4 MW + (8+8+10+8=34) beacons
= 34 MW + 16.32 MW = 50.32 MW
So reduce the 50.32 MW from (462-70.04) or 396 to get total gain of each fuel.
Rocket fuel: 341.64 MJ (over-unity: 2.84)
Solid fuel: 345.68 MJ (over-unity: 6.87)

Edit: Oops, if you have 18 assemblers and each are affected by 8 beacons, that doesn't mean there are total 8 beacons... More like 38 or 40 maybe? That's going to swing it heavily in favor of solid fuel. mistakes

Last edited by Zaflis on Mon May 27, 2019 9:25 am, edited 4 times in total.

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Re: Coal to Rocket Fuel using Coal Liquefaction, Over-unity Gain!

Post by Zaflis »

patrick12222010 wrote: ↑

Mon May 27, 2019 3:31 am

What do you mean by heavily favor to solid fuel?

42beacon.png
42beacon.png (116.84 KiB) Viewed 5558 times

I only counted energy cost of 8 beacons, but it appears there are 42. The speed bonus of the all 42 was already count by kirkmcdonald, so that is 34 additional beacons, which means +16.32 MW. We'll replace all number 70.04 MW with 86.36 MW.

Without counting beacons power consumption, the gain of making power with rocket fuel is still 66 MJ.
But with beacons that is now 66 MJ - 86.36 MJ = -20.36 MJ , which is how much less 4.62 rocket fuels make compared to 33 solid fuel.

And i didn't even count beacons used in oil processing in making solid fuel, so i can't even tell the total gains of either fuel. Oh, laying the assemblers and beacons in "double-burger" layout may reduce number of beacons you need, but i'm done testing :P

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Re: Coal to Rocket Fuel using Coal Liquefaction, Over-unity Gain!

Post by Trific »

El_Maximo_Bango wrote: ↑

Wed Mar 24, 2021 12:50 am

I'm fairly new to all this, but how do the Assembling Machines get fed light oil?

I can't see a way to get the light oil into them?

Level 2 and 3 assembling machines have one liquid input. It doesn't show up until you choose a recipe that has a liquid component (like rocket fuel).

El_Maximo_Bango
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Re: Coal to Rocket Fuel using Coal Liquefaction, Over-unity Gain!

Post by El_Maximo_Bango »

Trific wrote: ↑

Wed Mar 24, 2021 1:07 am

El_Maximo_Bango wrote: ↑

Wed Mar 24, 2021 12:50 am

I'm fairly new to all this, but how do the Assembling Machines get fed light oil?

I can't see a way to get the light oil into them?

Level 2 and 3 assembling machines have one liquid input. It doesn't show up until you choose a recipe that has a liquid component (like rocket fuel).

Yeah, I can see the inputs, but I more meant where does the light oil come from? There doesn't seem to be enough room for any pipes to feed into the assemblers?

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Re: Coal to Rocket Fuel using Coal Liquefaction, Over-unity Gain!

Post by Vector6 »

I patched this up to work with the current version. There are now pipes running between the bottom two rows of assemblers(with the top row being mirrored against blank space). It still seems to work properly(putting in 6k coal got me 1030 rocket fuel, for 79 GJ profit if I did the math right).

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

My test run involved one rocket fuel each to the boilers and ten barrels of heavy oil for the initial catalysts. My count was based on what made it to the end of the belt, so it doesn't count the rocket fuel used for keeping the boilers running. I didn't compute the energy cost, but it probably hasn't changed appreciably.