1.52189038686423 - RIES (RILYBOT Inverse Equation Solver)
RIES command: ./ries --wide -l1 -s 1.52189038686423
Your target value: T = 1.52189038686423 mrob.com/ries
|
equation | root of equation | distance from your target
| accurate to within | complexity
|
x = pi-phi |
x = 1.5235586648399 |
= T + 0.00166828 |
1 part in 912 |
58
|
x = ln((pi-1)^2) |
x = 1.52309956576179 |
= T + 0.00120918 |
1 part in 1259 |
66
|
x = 2^(1/sqrt(e)) |
x = 1.5225933261741 |
= T + 0.000702939 |
1 part in 2165 |
66
|
x = 3^(1/phi^2) |
x = 1.52140241938065 |
= T - 0.000487967 |
1 part in 3119 |
70
|
x = 5ⁿ√(3 e) |
x = 1.52153920557185 |
= T - 0.000351181 |
1 part in 4334 |
74
|
x = e/pi+1/x |
x = 1.52219991367793 |
= T + 0.000309527 |
1 part in 4917 |
76
|
tanpi(1/x) = pi-5 |
x = 1.52175501286757 |
= T - 0.000135374 |
1 part in 11242 |
74
|
x = sqrt(phi)+1/4 |
x = 1.52201964951407 |
= T + 0.000129263 |
1 part in 11774 |
69
|
x = piⁿ√sqrt(2*7) |
x = 1.52199050224992 |
= T + 0.000100115 |
1 part in 15201 |
80
|
x = sqrt(4ⁿ√3+1) |
x = 1.52186530709931 |
= T - 2.50798e-05 |
1 part in 60682 |
76
|
tanpi(ln(x)) = sqrt(e^e) |
x = 1.52190474445952 |
= T + 1.43576e-05 |
1 part in 105999 |
82
|
x = ln(2^e-2) |
x = 1.52189242723798 |
= T + 2.04037e-06 |
1 part in 745888 |
81
|
x = piⁿ√3/e+1 |
x = 1.52188874425128 |
= T - 1.64261e-06 |
1 part in 926506 |
86
|
tanpi(1/e^x) = 1/2+1/pi |
x = 1.52189005500922 |
= T - 3.31855e-07 |
1 part in 4586010 |
96
|
x = sqrt(atan2(5,-2))+1/8 |
x = 1.52189036932297 |
= T - 1.75413e-08 |
1 part in 86760605 |
100
|
atan2(x,e^2) = (1-ln(sqrt(3)))^2 |
x = 1.52189039991549 |
= T + 1.30513e-08 |
1 part in 1.166e+08 |
110
|
x = (1+pi)/(1/ln(4)+2) |
x = 1.52189039528231 |
= T + 8.41808e-09 |
1 part in 1.808e+08 |
108
|
atan2(x,(1/sqrt(e))) = 2-atan2(pi,3) |
x = 1.5218903835533 |
= T - 3.31093e-09 |
1 part in 4.597e+08 |
112
| |
Legend and Statistics:
atan2(y,x) = Angle of ray from origin through point (y,x) pi = 3.14159...
e = base of natural logarithms, 2.71828... tanpi(X) = tan(pi * x)
ln(x) = natural logarithm or log base e sqrt(x) = square root
phi = the golden ratio, (1+sqrt(5))/2 Aⁿ√B = Ath root of B
--LHS-- --RHS-- -Total-
max complexity: 62 56 118
dead-ends: 803490 1210842 2014332 Time: 0.134
expressions: 55628 75050 130678
distinct: 33881 29175 63056 Memory: 4480KiB
Total equations tested: 988478175 (9.885e+08)
For a more thorough search and many runtime options,
get the RIES source code and compile your own!
mrob.com/ries
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the Inverse Symbolic Calculator
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This page was written in the "embarrassingly readable" markup language RHTF, and was last updated on 2013 Feb 09. s.27