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New Gas Storage
GE gasstorage

Gas Storage

Details:Edit

Gas Storage:

  • Once you've upgraded your Gas Mine , you'll soon run out of storage capacity gas reserves grow beyond their limitations at the Gas Mine.
  • To alleviate this. You will need to build a Gas Storage unit on your planet to keep the flow of the Gas Mine production going.
  • Building Requirements: None
  • Tech Requirements: None
  • You do not need gas to build a Gas Storage.


Costs to build a Gas Storage
Level
GE metal icon
GE crystal icon
Storage Capacity
Level 1 1000 1000 20000
Level 2 2000  2000 40K
Level 3 4000 4000 74K
Level 4 8000 8000 140K
Level 5 16K 16K 255K
Level 6 32K 32K 470K
Level 7 64K 64K 865K
Level 8 128K 128K 1.59M
Level 9 256K 256K 2.92M
Level 10 512K 512K 5.35M
Level 11 1.02M 1.02M 9.81M
Level 12 2.04M 2.04M 18.0M
Level 13 4.09M 4.,09M 33M
Level 14 8.19M 8.19M 60.5M
Level 15 16.38M 16.38M 111M
Level 16 32.7M 32.7M 203M
Level 17 65.5M 65.5M 373M
Level 18 131M 131M 683M
Level 19 262M 262M 1.25B
Level 20 525M 525M 2.30B
Level 21 4.21B
Level 22
Level 23
Level 24
Level 25
  • Tips: 
  • When you build the Gas Storage unit it will take up your building space on your planet that you do have. So remember this when you are upgrading.
  • Some that play Galaxy Empire say you should not upgrade the Gas Storage unit past Level 5.

Build / Upgrade TimeEdit

  • Rows: Goal Upgrade Level
  • Columns: Robotics Facility Level
  • Result: Upgrade Time
  • Note: Times recorded using a Commander Lv1. which confers a construction time -10%
Time for each Upgrade Level (U) for each Robotics Facility Level (R)
R0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25
U1
2 15s 15s
3 43m 12s 21m 36s 14m 24s 10m 48s 8m 38s 7m 12s
4 17m 16s 10m 48s
5 34m 33s 21m  36s
6
7
8 4h 36m 28s
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25

FormulasEdit

Time to BuildEdit

The time to build formula is:
t=(1-d)\cdot \frac { A }{ (r+1) } \cdot { e }^{ B\cdot l }
with the following variables:
  • t = time [seconds]
  • d = Bonus Discount [%]
  • r = Robotics Facility Level
  • l = Upgrade Level
And the following constants
As derived from the following Equations:
Solve for B
B\quad =\quad \frac { \ln { \left( \frac { { t }_{ 2 }({ r }_{ 2 }+1)(1-{ d }_{ 1 }) }{ { t }_{ 1 }(1-{ d }_{ 2 })({ r }_{ 1 }+1) }  \right)  }  }{ \left( { l }_{ 2 }-{ l }_{ 1 } \right)  }
And Solve for Constant A
A=\frac { t(r+1) }{ { e }^{ Bl }(1-d) }



(Best Value as of Apr 25, 2014)
  • A = Constant = 360
  • B = Constant = 0.693147180559945