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| | | title = Equations | | | title = Equations |
| | | image = equations.png | | | image = equations.png |
| − | | titletext = All electromagnetic equations: The same as all fluid dynamics equations, but with the 8 and 23 replaced with the permittivity and permeability of free space, respectively. | + | | titletext = All electromagnetic equations: The same as all fluid dynamics equations, but with the 8 and 23 replaced with the permittivity and permeability of free , respectively. |
| | }} | | }} |
| | + | |
| | ==Explanation== | | ==Explanation== |
| | + | {{incomplete|Created by a BOT - Please change this comment when editing this page. Do NOT delete this tag too soon.}} |
| | + | {| class="wikitable" |
| | + | !style="width:20%"|Equation |
| | + | !style="width:20%"|Field |
| | + | !style="width:60%"|Explanation |
| | + | |- |
| | + | |<math>E = K_0t + \frac{1}{2}\rho vt^2</math> |
| | + | |All kinematics equations |
| | + | |Energy equals a constant <math>K_0</math> multiplied by time plus half of density multiplied by speed multiplied by time squared |
| | + | |- |
| | + | |<math>K_n = \sum_{i=0}^{\infty}\sum_{\pi=0}^{\infty}(n-\pi)(i-e^{\pi-\infty})</math> |
| | + | |All number theory equations |
| | + | |Taken literal the equation says: "The nth K-number is equal to for all i in 0 to infinity, for all pi in 0 to infinity; subtract pi from n and multiply it with i minus e (to the power of pi minus infinity)". A twofold misconception can be seen here. The first is the reassignment of pi as a variable instead of the constant (3.14). This might be a jab at how in number theory letters and numbers are used interchangeably, but where some letters are all of a sudden fixed constants. The second misconception is the use of infinity in the latter part of the formula. Naively this would signify that (with the reassigned pi values) the part in the power would range from minus infinity to zero. However infinity is not a number and cannot be used as one without using a limit construct. |
| | + | |- |
| | + | |<math>\frac{\partial}{\partial t}\nabla\cdot p = \frac{8}{23} |
| | | | |
| − | This comic gives a set of mock equations. To anyone not familiar with the field in question they look pretty similar to what you might find in research papers or on the relevant Wikipedia pages. Most of the jokes are related to the symbols or "look" of most equations in the given field.
| + | \int\!\!\!\!\!\!\!\!\!\;\;\bigcirc\!\!\!\!\!\!\!\!\!\;\;\int |
| − | | + | \rho\,ds\,dt\cdot \rho\frac{\partial}{\partial\nabla} |
| − | The comic makes jokes about the fields of kinematics, number theory, fluid dynamics, quantum mechanics, chemistry, quantum gravity, gauge theory, cosmology, and physics equations. Of course, all of the equations listed are not real equations (<math>\pi-\infty</math> and H<sub>2</sub>EAT are clearly jokes and making a mockery of the given field). As always, Randall is just having a laugh.
| + | </math> |
| − | | + | |All fluid dynamic equations |
| − | :<math>E=K_{0}t+\frac{1}{2}\rho{}vt^2</math>
| + | |- |
| − | ;All {{w|kinematics}} equations
| + | |<math>|\psi_{x,y}\rangle = A(\psi) A(|x\rangle \otimes |y\rangle)</math> |
| − | Most kinematics equations tend to make heavy use of constants, addition, powers, and multiplication. This specific equation resembles the actual kinematics equation d = vt + 1/2at^2, but replaces a (acceleration) with v (velocity) times <math>\rho{}</math> (density) and replaces velocity with "K<sub>0</sub>", which is not a term used in kinematics.
| + | |All quantum mechanic equations |
| − | | + | | |
| − | :<math>K_{n}=\sum_{i=0}^{\infty}\sum_{\pi=0}^{\infty}(n-\pi)(i+e^{\pi-\infty})</math>
| + | |- |
| − | ;All {{w|number theory}} equations
| + | |<math>\mathrm{CH}_4 + \mathrm{OH} + \mathrm{HEAT} \rightarrow \mathrm{H}_2\mathrm{O} + \mathrm{CH}_2 + \mathrm{H}_2 \mathrm{EAT}</math> |
| − | Randall jokes about how number theory often involves the use of summations. The use of ''π'' as an integer variable in the double summation is a joke, as ''π'' is essentially always used for the well-known constant 3.14159..., not a variable. The use of ''i'' as a summation variable '''is''' common, though it can also be confused with the imaginary unit √-1. The constants ''e'', ''i'', and ''π'', as well as the theoretical upper bound <math>\infty</math>, often appear in number theory equations.
| + | |All chemistry equations |
| − | | + | | A modification of the combustion of methane. The correct form is often taught and a good example problem but obviously there are more chemistry problems.<math>HEAT</math> is normally shorthand for {{w|activation energy}}, but in Randall's version it's jokingly used as a chemical ingredient and becomes <math>H_2EAT</math>, taking the hydrogen atom freed by the combustion equation shown. To deliver the punchline while maintaining proper stoichiometry, <math>\mathrm{OH}</math> (which should be <math>\mathrm{OH}^-</math>, since the oxygen keeps a free electron when it combines with a single hydrogen) is shown instead of <math>\mathrm{O}_2</math>. The proper methane combustion equation would be: <math>\mathrm{CH}_4 + 2 \mathrm{O}_2 \rightarrow 2 \mathrm{H}_2\mathrm{O} + \mathrm{CO}_2</math> |
| − | :<math>\frac{\partial}{\partial{t}}\nabla\!\cdot\!\rho=\frac{8}{23}\int\!\!\!\!\int\!\!\!\!\!\!\!\!\!\subset\!\!\supset\rho\,{ds}\,{dt}\cdot{}\rho\frac{\partial}{\partial\nabla}</math>
| + | |- |
| − | ;All {{w|fluid dynamics}} equations
| + | |<math>SU(2)U(1) \times SU\left(U(2)\right)</math> |
| − | Fluid dynamics equations often involve copious integrals, especially those over closed contours as done here, which are often the main telling factors of those equations to an outsider. The time derivative and gradient operator <math>\nabla</math> are common in fluid dynamics, mostly via the Navier-Stokes equation, and the fluid density <math>\rho</math> is one of the functions of central importance. The fraction 8/23 is a comically weird choice, but various unexpected fractions do pop up in fluid dynamics. The ds and dt go with the double contour integral (s is probably distance, t is time), but the derivative with respect to <math>\nabla</math> at the end is very much not allowed.
| + | |All quantum gravity equations |
| − | | + | | |
| − | :<math>|\psi_{x,y}\rangle=A(\psi)A(|x\rangle\otimes|y\rangle)</math>
| + | |- |
| − | ;All {{w|quantum mechanics}} equations
| + | |<math>S_g = \frac{-1}{2\bar{\epsilon}}i\eth \hat{\big(} \zeta_0 \dotplus p_\epsilon \rho_v^{abc}\cdot \eta_0 \hat{\big)} f_a^0 a\lambda(\xi) \psi(0_a)</math><br> |
| − | Quantum mechanics often involves some of the foreign-looking symbols listed, including {{w|Bra–ket notation|bra-ket notation}}, the {{w|Tensor product|tensor product}}, and the Greek letter Psi for a quantum state. Specifically, the left side of the equation is a ket state labeled Psi that depends on x and y (probably positions), while the right-hand side may be an operator A that depends on the state Psi (it is very unusual to have such a dependence) acting on what looks like another copy of that operator which depends on the outer product of states labeled by x and y (again strange). A charitable interpretation could be that the second A is the eigenfunction A of the operator A. Normally this is clearly indicated by giving the operator a “hat” (^ symbol) or making the eigenfunction into a ket eigenstate, but since the equation is intentionally nonsense both A’s are left ambiguous. Also note that the bra-ket math is inconsistent here, as the left side is a ket, but the right side is just two A’s, which are either operators or functions but are definitely not kets.
| + | |All gauge theory equations |
| − | | + | | |
| − | :<math>CH_4+OH+HEAT\rightarrow{}H_2O+CH_{2}+H_2EAT</math>
| + | |- |
| − | ;All {{w|chemistry}} equations
| + | |<math>H(t) + \Omega + G \cdot \Lambda \, \dots \begin{cases} \dots > 0 & \text{(HUBBLE MODEL)} \\ \dots = 0 & \text{(FLAT SPHERE MODEL)} \\ \dots < 0 & \text{(BRIGHT DARK MATTER MODEL)} \end{cases} |
| − | Chemistry equations use formulas of chemical compounds to describe a chemical reaction. Such equations show the starting chemicals on the left side and the resulting products on the right side, as displayed. Sometimes such an equation might optionally indicate that an {{w|activation energy}} is required, for the reaction to take place in a sensible timeframe, e.g. by heating. A reaction requiring heating is usually indicated by a Greek capital letter Delta (''Δ'') or a specified temperature above the reaction arrow, however this comic uses the "+ HEAT" term on the left side instead. The joke is that Randall interprets "HEAT" to be another chemical, possibly the nonsensical helium-monastatide, which reacts with Hydrogen (H) to H<sub>2</sub>EAT, which is nonsensical, as heat is transferred energy here, not added matter. Regardless of this, Randall gets the {{w|stoichiometry}} of this equation correct, with the same number of all types of 'atoms' on each side of the equation.
| + | </math> |
| − | | + | |All cosmology equations |
| − | :<math>SU(2)U(1)\times{}SU(U(2))</math>
| + | | |
| − | ;All {{w|quantum gravity}} equations
| + | |- |
| − | Quantum gravity uses mathematical {{w|Group (mathematics)|groups}} denoted by uppercase letters, as shown. {{w|Special unitary group|SU(2)}}, {{w|Unitary group|U(1)}}, and {{w|Unitary group|U(2)}} are all well-studied groups, though 'SU(U(2))' makes no sense. The lack of relator means this expression isn't an equation.
| + | |<math>\hat H - u_{0} = 0</math> |
| − | | + | |All truly deep physics equations |
| − | :[[File:All gauge theory equations.png]]
| + | | |
| − | ;All {{w|gauge theory}} equations
| + | |<math>\hat H</math> it the hamiltonian operator which is the operator which wen applied to a system returns the total energy. In this context U would usually be the potential energy. However there is also a subscript 0 and a diacritic making indicating some other variable. Much of physics is based on Lagrangian and Hamiltonian mechanics the Lagrangian is defined as <math>\hat L = \hat K - \hat U </math> with K being the kinetic energy and U the potential. Hamiltonian mechanics uses the equation <math>\hat H = \hat K + \hat U </math>. the Hamiltonian mus be conserved so taking the time derivative and setting it equal to zero is a powerful tool. The principle of least action says allows most modern physics to be derived by setting the time derivative of the lagrangian to zero. |
| − | Gauge theory is a subset of field theory. Most gauge theory equations appear to have many strange-looking constants and variables with odd labels. However, almost none of the symbols used here are found or applicable to gauge theory.
| + | |<math>\frac{\partial}{\partial t}\nabla\cdot p = \frac{\epsilon_0}{\mu_0} |
| − | | + | \int\!\!\!\!\!\!\!\!\!\;\;\bigcirc\!\!\!\!\!\!\!\!\!\;\;\int |
| − | :<math>H(t)+\Omega+G\!\cdot\!\Lambda...\begin{cases}...>0\mathrm{\ (Hubble\ model)}\\
| + | \rho\,ds\,dt\cdot \rho\frac{\partial}{\partial\nabla} |
| − | ...=0\mathrm{\ (Flat\ sphere\ model)}\\
| + | </math> |
| − | ...<0\mathrm{\ (Bright\ dark\ matter\ model)}
| + | |All electromagnetic equations |
| − | \end{cases}</math> | + | |This equation has superficial resemblance to portions of [//en.wikipedia.org/wiki/Maxwell%27s_equations Maxwell's Equations], but just miscellaneous bits, some from the integral forms and some from the differential forms. |
| − | ;All {{w|cosmology}} equations
| + | |} |
| − | Cosmology is the science of the development and ultimate fate of the universe. The joke here may be pertaining to the different models accepted in the field of cosmology. H is the {{w|Hubble's law#Time-dependence of Hubble parameter|Hubble parameter}}, Ω is the universal {{w|Friedmann equations#Density parameter|density parameter}}, G is the {{w|gravitational constant}}, and Λ is the {{w|cosmological constant}}.
| |
| − | | |
| − | :[[File:All truly deep physics equations.png]]
| |
| − | ;All truly deep {{w|physics}} equations
| |
| − | The joke about the "truly deep physics equations" is that most of the universal physics equations are simple, almost exceedingly so. In general, many of these equations are types of [https://en.wikipedia.org/wiki/Conservation_law conservation law] equations, which reflect some of the basic truths of the universe. A hallmark of conservation laws is that the total amount of some physical value does not change, and so one side of the equation is zero, as shown in the example. One example is Einstein's ''E = mc²'', which shows conservation of mass-energy. Noether's theorem shows that conservation laws have a one-to-one correspondence with a symmetry of nature, making these equations truly 'deep'.
| |
| − | | |
| − | The title text is referencing the fact that the {{w|magnetic field|electric and magnetic fields}} are often explained to physics students using an analogy with fluid dynamics, as well as the fact that they do share some similarities (only in terms of mathematical description as three-dimensional vector fields) with fluids. The permittivity constant (represented with ''ε''<sub>0</sub>) and the permeability constant (represented with ''μ''<sub>0</sub>) are coefficients that relate the amount of charge required to cause a specific amount of electric flux in a vacuum and the ability of vacuum to support the formation of magnetic fields, respectively. They appear frequently in Maxwell's equations (the equations that define the electric and magnetic fields in classical mechanics), so Randall is making the joke that any surface integral with them in it automatically is an electromagnetism equation.
| |
| | | | |
| | ==Transcript== | | ==Transcript== |
| − | :[Nine equations are listed, three in the top row and two in each of the next three rows. Below each equation there are labels:] | + | {{incomplete transcript|Do NOT delete this tag too soon.}} |
| − | | + | [TODO: Avoid using math markup here because the images of these equations isn't helpful in a transcript. Sigh.] |
| − | :E=K<sub>0</sub>t+1/2 ρvt<sup>2</sup>
| + | [Nine equations are listed and labeled as followed:] |
| − | :All kinematics equations
| + | <br><br> |
| − | | + | E = K<sub>0</sub>t + 1/2 pvt<sup>2</sup><br> |
| − | :K<sub>n</sub>=∑<sup>∞</sup><sub>i=0</sub>∑<sup>∞</sup><sub>π=0</sub>(n-π)(i-e<sup>π-∞</sup>) [K sub n = the summation from i = 0 to infinity of the sum from pi = 0 to infinity of (n - pi) * (i-e^(pi-infinity))]
| + | ALL KINEMATICS EQUATIONS<br> |
| − | :All number theory equations
| + | <br> |
| − | | + | <math>K_n = \sum_{i=0}^{\infty}\sum_{\pi=0}^{\infty}(n-\pi)(i-e^{\pi-\infty})</math><br> |
| − | :∂/∂t ∇⋅ρ=8/23 (∯ ρ ds dt ⋅ ρ ∂/∂∇)
| + | ALL NUMBER THEORY EQUATIONS<br> |
| − | :All fluid dynamics equations
| + | <br> |
| − | | + | ∂/∂t ∇ ⋅ p = 8/23 (∯ ρ ds dt ⋅ ρ ∂/∂∇)<br> |
| − | :|ψ<sub>x,y</sub>〉=A(ψ)A(|x〉⊗|y〉)
| + | ALL FLUID DYNAMIC EQUATIONS<br> |
| − | :All quantum mechanics equations
| + | <br> |
| − | | + | <math>|\psi_{x,y}\rangle = A(\psi) A(|x\rangle \otimes |y\rangle)</math><br> |
| − | :CH<sub>4</sub>+OH+HEAT→H<sub>2</sub>O+CH<sub>2</sub>+H<sub>2</sub>EAT
| + | ALL QUANTUM MECHANIC EQUATIONS<br> |
| − | :All chemistry equations
| + | <br> |
| | + | CH<sub>4</sub> + OH + HEAT → H<sub>2</sub>O + CH<sub>2</sub> + H<sub>2</sub>EAT <br> |
| | + | ALL CHEMISTRY EQUATIONS<br> |
| | + | <br> |
| | + | SU(2)U(1) × SU(U(2)) <br> |
| | + | ALL QUANTUM GRAVITY EQUATIONS<br> |
| | + | <br> |
| | + | <math>S_g = \frac{-1}{2\epsilon}i\eth \hat{\big(} \zeta_0 \dotplus p_\epsilon \rho_v^{abc}\cdot \eta_0 \hat{\big)} f_a^0 a\lambda(\zeta) \psi(0_a)</math><br> |
| | + | ALL GAUGE THEORY EQUATIONS<br> |
| | + | <br> |
| | + | <math>H(t) + \Omega + G \cdot \land \, ... \begin{cases} ... > 0 & \text{(HUBBLE MODEL)} \\ ... = 0 & \text{(FLAT SPHERE MODEL)} \\ ... < 0 & \text{(BRIGHT DARK MATTER MODEL)} \end{cases} |
| | + | </math><br> |
| | + | ALL COSMOLOGY EQUATIONS<br> |
| | + | <br> |
| | + | Ĥ - u̧<sub>0</sub> = 0<br> |
| | + | ALL TRULY DEEP PHYSICS EQUATIONS |
| | + | <br> |
| | | | |
| − | :SU(2)U(1)×SU(U(2))
| |
| − | :All quantum gravity equations
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| − |
| |
| − | :S<sub>g</sub>=(-1)/(2ε̄) ið(̂ ξ<sub>0</sub> ⨢ p<sub>ε</sub> ρ<sub>v</sub><sup>abc</sup>⋅η<sub>0</sub>)̂ f̵<sub>a</sub><sup>0</sup> λ(<span style="display:inline-block; -ms-transform:rotate(180deg); -webkit-transform:rotate(180deg); transform:rotate(180deg);">ξ</span>) ψ(0<sub>a</sub>)
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| − | :All gauge theory equations
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| − |
| |
| − | :H(t)+Ω+G⋅Λ ...
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| − | :[There is a brace linking the three cases together.]
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| − | :... > 0 (Hubble model)
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| − | :... = 0 (Flat sphere model)
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| − | :... < 0 (Bright dark matter model)
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| − | :All cosmology equations
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| − |
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| − | :Ĥ - u̧<sub>0</sub> = 0
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| − | :All truly deep physics equations
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| | | | |
| | {{comic discussion}} | | {{comic discussion}} |
| − |
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| − | [[Category:Science]]
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| − | [[Category:Physics]]
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| | [[Category:Math]] | | [[Category:Math]] |
| − | [[Category:Chemistry]]
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| − | [[Category:Cosmology]]
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