a is what I call the 'acceleration factor', how fast the function approaches m
10
Expression 11: "a" equals 69a=69
00
250250
11
s is what I call the 'stealing factor', it adjusts the curve of the stealing EQ (2nd deriv/concavity)
12
Expression 13: "s" equals 90s=90
00
200200
13
note: every x unit = 1MW/tick, every y unit = 1 credit/tick
14
Expression 15: "y" equals 10 to the 6th powery=106
equals=
10000001000000
15
Expression 16: "y" equals left parenthesis, left parenthesis, StartFraction, left parenthesis, 4 times "b" "z" , right parenthesis Over 4 "z" plus "b" , EndFraction , right parenthesis plus StartFraction, 2 "n" "z" Over 2 "z" plus "n" "a" , EndFraction , right parenthesis times 12.5 times "t" left brace, 0 less than "x" less than 10 to the 4th power , right bracey=4·bz4z+b+2nz2z+na·12.5·t0<x<104
