Fil:ColdnessScale.svg
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BeskrivelseColdnessScale.svg |
English: Universal coldness/temperature scale in SI units, where coldness[1][2][3][4][5][6] is one possible name for reciprocal-temperature[7] in non-thermal units[8] i.e. β ≡ 1/kT ≡ 1/k dS/dE. This energy uncertainty-slope dS/dE approaches a common value for systems that randomly (or thermally) share energy E, since heat energy naturally flows from low (even negative) to high coldness (toward more "choice of open-slots" or "ways to play", and therefore clockwise) until sharing systems reach a common (equilibrium) value of this slope. Bottom line: 1 Kelvin of ambient temperature requires one to thermalize about 76.5594 picoJoules of ordered energy for every teraByte of subsystem correlation-information created, and 1 nanoJoule/Kelvin of information takes up about 13.0618 teraBytes of memory. |
Dato | |
Kilde | Eget verk |
Opphavsperson | AkanoToE |
Andre versjoner |
Own work based on: ColdnessScale.png. Description and Added Notes come from the original file's page. |
SVG utvikling InfoField | Denne vektorgrafikken ble laget med Matplotlib. This diagram uses translateable embedded text. |
Added notes
The radial lines denote key temperatures, clockwise from bottom including He evaporation (dotted cyan) around 4 K ↔ 3265 GB/nJ (just CCW from the 4732.51 GB/nJ of the 2.76 K cosmic background) and N2 evaporation (dashed cyan) around 77 K ↔ 170 GB/nJ, CO2 sublimation around −78.5 °C ↔ 67.1 GB/nJ (dot-dashed cyan), H2O liquification around 0 °C ↔ 47.8 GB/nJ and evaporation around 100 °C ↔ 35.0 GB/nJ (dot-dashed green), "red-hot" (solid red) around 500 °C ↔ 16.9 GB/nJ, rock melting around 1500 °C ↔ 7.37 GB/nJ (solid magenta), graphite sublimation (dashed magenta) around 3642 °C ↔ 3.34 GB/nJ, and the surface of the sun (dotted magenta) around 5778 K ↔ 2.26 GB/nJ ≈ 2.01 nat/eV. The dashed red lines represent the min-max European temperature range (from 0 °F ↔ 51.2 GB/nJ to 100 °F ↔ 42.0 GB/nJ) on which Fahrenheit based his scale, at top of which is also the human basal temperature at around 98.6 °F ↔ 42.1 GB/nJ. Room temperature (3 o'clock) is defined as either 20 °C = 68 °F ↔ 44.6 GB/nJ ≈ 39.6 nat/eV = 1/kT or 22 °C = 71.6 °F ↔ 44.3 GB/nJ ≈ 39.3 nat/eV = 1/kT, and therefore kTroom is about 1/40 of an electron Volt.
Inverted-population states for finite-energy systems are found on the left half of this plot. These include: (i) 1024 end-on dominoes acting like stonehenge in the earth's gravitational-field (grey-dotted) at −.001[J]/(kBln[1024]) ≈ −1.04×1019 K ↔ −1.25×10−15 GB/nJ, (ii) a mole of excited Ne atoms in a He-Ne LASER ready for stimulated-emission (grey-dashed) at −1.96 [eV]/(kBln[6×1023]) ≈ −415 K ↔ −31.5 GB/nJ, and (iii) the orientation-temperature for 500,001 up out of 1,000,000 proton-spins in a 1 Tesla field (grey) at 1.41×10−26 J/(kB(ψ[1 + 1000000 − 500001] − ψ[1 + 500001])) ≈ −1.41×10−26 J/(kBln[1000000/500001 − 1]) ≈ −255 K ↔ −51.1 GB/nJ where ψ[x] is the PolyGamma function. The dot-dashed grey lines are for 500,002 and 500,003 out of 1,000,000 protons oriented spin-up in that same 1 [Tesla] field.
This plot illustrates that you can use either temperature T or reciprocal-temperature 1/kT to predict the direction of heat-flow. When you use temperature, remember that the highest possible temperature T is minus-zero-Kelvin and the lowest possible T is plus-zero-Kelvin. With coldness 1/kT, the lowest value is minus-infinity and the highest is plus-infinity so that heat energy naturally and simply flows from numerically low to numerically high 1/kT.
unit to → ↓ from ↓ |
TF in °F |
TC in °C |
T in K |
ε ≡ kT in eV/nat |
β0 ≡ 1/kT in GiB/nJ |
β1 ≡ 1/kT in GB/nJ |
β2 ≡ 1/kT in ZB/Cal |
---|---|---|---|---|---|---|---|
TF | 1 | 5/9(TF − 32) | 5/9(TF − 32) + 273.15 | ||||
TC | 9/5TC + 32 | 1 | TC + 273.15 | ||||
T | 9/5(T − 273.15) + 32 | T − 273.15 | 1 | 8.61733×10−5T | 12165/T | 13062/T | 54650/T |
ε | 11604.5ε | 1 | 1.0483/ε | 1.1256/ε | 4.7049/ε | ||
β0 | 12165/β0 | 1.0483/β0 | 1 | 1.0737β0 | |||
β1 | 13062/β1 | 1.1256/β1 | β1/1.0737 | 1 | 4.184β1 | ||
β2 | 54650/β2 | 4.7049/β2 | β2/4.184 | 1 |
In the table of conversions above, note that the uncertainty-slope or coldness β≡1/kT in [GiB/nJ] or [GB/nJ] is nearly equal to the reciprocal of kT in [eV/nat]. Even more curiously, if we don't mind using binary-multiples i.e. gibiBytes instead of powers of ten, we can say that 1 [nat/eV] = 1.04827 [GiB/nJ] = 1.12557 [GB/nJ]. Hence room temperature coldness is about 40 [GiB/nJ] simply because kT at room temperature is about 1/40 [eV].
Python source code
The following code generated the plot above. The legend and arrowhead were added later in Inkscape.
import numpy as np
import matplotlib.pyplot as plt
kb_inv = 1/1.380649e-23/np.log(2)/8/1e18 # in GB per nJ
TAU = np.math.tau
gib_per_nj = np.array([-140, -120, *np.arange(-100, 110, 10), 120, 140])
scale = 44.3 # Defines the 3 o'clock position
angles = 2 * np.arctan(gib_per_nj/scale)
r = np.ones(len(gib_per_nj))
kelvins = np.arange(-900, 1000, 100)
k_angles = 2 * np.arctan(kb_inv/kelvins/scale)
r_k = np.ones(len(kelvins))
celsius = np.arange(-200, 600, 100)
c_angles = 2 * np.arctan(kb_inv/(273.15 + celsius)/scale)
r_c = np.ones(len(c_angles))
fahrenheit = np.arange(-400, 600, 100)
f_angles = 2 * np.arctan(kb_inv/(273.15 + 5*(fahrenheit-32)/9)/scale)
r_f = np.ones(len(f_angles))
angle_cut = TAU/36
circle_angles = np.linspace(-(TAU/2 - angle_cut), TAU/2, 2**12)
r_circ = np.ones(len(circle_angles))
semi_angles = np.linspace(0, TAU/2, 2**12)
r_semi = np.ones(len(semi_angles))
size = 'x-small'
def get_text(angles, labels, distance, color):
for i, label in enumerate(labels):
rot_angle = angles[i] * 360 / TAU
plt.text(angles[i], distance + 0.1, label, color=color, ha='center', va='center', rotation=90-rot_angle, fontsize=size)
fig = plt.figure(dpi=150)
ax = fig.add_subplot(projection='polar')
gb_distance = 1
k_distance = .8
c_distance = .6
f_distance = .4
get_text(angles, gib_per_nj, gb_distance, 'k')
get_text(k_angles, kelvins, k_distance, 'b')
get_text(c_angles, celsius, c_distance, 'g')
get_text(f_angles, fahrenheit, f_distance, 'r')
# for i, label in enumerate(gib_per_nj):
# rot_angle = angles[i] * 360 / TAU
# plt.text(angles[i], r[i]+.15, label, ha='center', va='center', rotation=90-rot_angle)
# plt.annotate(label, (angles[i], r[i]))
# Plot lines
def plot_line(angle, color, line_type):
ax.plot([angle, angle], [0,1], color=color, linestyle=line_type, lw=1)
# Helium boiling point
plot_line(2 * np.arctan(kb_inv/4./scale), 'c', ':')
# N2 boiling point
plot_line(2 * np.arctan(kb_inv/77./scale), 'c', '--')
# CO2 sublimation
plot_line(2 * np.arctan(kb_inv/(273.15-78.5)/scale), 'c', '-.')
# H20 freezing
freezing_angle = 2 * np.arctan(kb_inv/(273.15)/scale)
plot_line(freezing_angle, 'g', '-.')
# H20 boiling
boiling_angle = 2 * np.arctan(kb_inv/(373.15)/scale)
plot_line(boiling_angle, 'g', '-.')
# Liquid water range
ax.bar((boiling_angle+freezing_angle)/2, c_distance, boiling_angle-freezing_angle, color='g', alpha=0.25)
# Red hot
plot_line(2 * np.arctan(kb_inv/(273.15 + 500)/scale), 'r', '-')
# Rock melting
plot_line(2 * np.arctan(kb_inv/(273.15 + 1500)/scale), 'm', '-')
# Graphite sublimation
plot_line(2 * np.arctan(kb_inv/(273.15 + 3642)/scale), 'm', '--')
# Surface of the Sun
plot_line(2 * np.arctan(kb_inv/5778/scale), 'm', ':')
# 0 °F
plot_line(2 * np.arctan(kb_inv/(273.15+5*(0-32)/9)/scale), 'r', '--')
# 100 °F
plot_line(2 * np.arctan(kb_inv/(273.15+5*(100-32)/9)/scale), 'r', '--')
# 1024 Stonehenge dominoes
plot_line(2 * np.arctan(-1.25e-15/scale), 'darkgrey', ':')
# HeNe laser
plot_line(2 * np.arctan(-31.5/scale), 'darkgrey', '--')
# 500,001 spin-up protons out of 1 million in 1T magnetic field
mu_p = 1.410606797e-26 # proton magnetic moment
plot_line(2 * np.arctan(kb_inv/(mu_p/(1.38e-23*np.log(1000000/500001-1)))/scale), 'darkgrey', '-')
# 500,002 spin-up protons out of 1 million in 1T magnetic field
plot_line(2 * np.arctan(kb_inv/(mu_p/(1.38e-23*np.log(1000000/500002-1)))/scale), 'darkgrey', '-.')
# 500,003 spin-up protons out of 1 million in 1T magnetic field
plot_line(2 * np.arctan(kb_inv/(mu_p/(1.38e-23*np.log(1000000/500003-1)))/scale), 'darkgrey', '-.')
# Plot circles
ax.plot(circle_angles, gb_distance*r_circ, 'k-')
ax.plot(circle_angles, k_distance*r_circ, 'b-')
ax.plot(semi_angles, c_distance * r_semi, 'g-')
ax.plot(semi_angles, f_distance * r_semi, 'r-')
# Plot infinities
ax.plot([TAU/2], [gb_distance], 'k.')
plt.text(TAU/2, 0.075 + gb_distance, r'$+\infty$', ha='center', va='center', rotation = -90, fontsize=size)
ax.plot(0., k_distance, 'b.')
plt.text(0., 0.075 + k_distance, r'$\pm\infty$', color='b', ha='center', va='center', rotation = 90, fontsize=size)
# plt.annotate('$+\infty$', (TAU/2, 1.))
# plt.grid(visible=None)
plt.axis('off')
# Plot points
ax.plot(angles, gb_distance*r, 'k.')
ax.plot(k_angles, k_distance*r_k, 'b.')
ax.plot(c_angles, c_distance * r_c, 'g.')
ax.plot(f_angles, f_distance * r_f, 'r.')
# Orient plot
ax.set_theta_zero_location('N')
ax.set_theta_direction(-1)
# Set linewidths
plt.setp(ax.lines, linewidth=0.6)
plt.title('Universal coldness/temperature scale')
plt.savefig('fig/ColdnessScale-mpl.svg');
Footnotes
- ↑ Claude Garrod (1995) Statistical Mechanics and Thermodynamics (Oxford U. Press).
- ↑ J. Meixner (1975) "Coldness and Temperature", Archive for Rational Mechanics and Analysis 57:3, 281-290 abstract.
- ↑ Ingo Mueller (1972) Entropy, Absolute Temperature and Coldness in Thermodynamics: Boundary conditions in porous materials (Springer-Verlag, Wein GMBH) preview
- ↑ Ingo Müller (1971) "The coldness, a universal function in thermoelastic bodies", Archive for Rational Mechanics and Analysis 41:5, 319-332 abstract.
- ↑ Müller, I. (1971) "Die Kältefunktion, eine universelle Funktion in der Thermodynamik wärmeleitender Flüssigkeiten.", Arch. Rational Mech. Anal. 40, 1–36.
- ↑ Day, W.A. and Gurtin, Morton E. (1969) "On the symmetry of the conductivity tensor and other restrictions in the nonlinear theory of heat conduction", Archive for Rational Mechanics and Analysis 33:1, 26-32 (Springer-Verlag) abstract.
- ↑ J. Castle, W. Emmenish, R. Henkes, R. Miller, and J. Rayne (1965) Science by Degrees: Temperature from Zero to Zero (Westinghouse Search Book Series, Walker and Company, New York).
- ↑ P. Fraundorf (2003) "Heat capacity in bits", Amer. J. Phys. 71:11, 1142-1151.
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