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PLANCK'S CONSTANT

Text: Chapter 3. Planck's Constant http://209.68.37.190/unituniv/c03.htm#Chapter%203.%20%20Planck's%20Constant Although many people believe that Planck's constant, h, was the first-discovered universal constant, in reality, it follows four others, as explained in Chapter 2. Also, it was invented, not discovered. If you are already acquainted with Planck's constant, no doubt you learned that it is a fundamental, universal physical constant of nature (FUPCON). This description seems to mean that it has existed in nature from time immemorial, and Planck just happened to discover it at the opportune time--during the birth of quantum theory. In reality, he invented it so that he could convert a particular proportion into an equation. Therefore, the term, fundamental, universal physical constant of nature, or FUPCON, is a misnomer for constant of proportionality, which, itself, is a misnomer for collection of quantum-attribute factors. A. Planck's Constant, Historically Late in the nineteenth century, Planck sought to solve the problem of determining an equation for cavity radiancy (see Chapter 16). Many physicists before Planck had tried in this quest and failed. Finally, after Wilhelm Wien had produced an equation that almost fit the empirical data, Planck modified it in a simple way so that it did. However, the equation still contained Wien's two constants of proportionality, c1 and c2, whose values Wien had set to make the equation work. Planck separated both constants into more-basic factors, which included ¼, c, k, and a heretofore unknown factor. Amazingly, this unknown factor occurred in both constants. It became known as Planck's constant, h. Its SI value is: h = 6.6 ? 10-34 kg·m2·s-1 (11 The units, kg·m2·s-1, signify that h possesses dimensions of mass, M, multiplied by length squared, L2, divided by time, T, which is ML2T-1. When using the SI of unit measures, the numerical value of Planck's constant seems small and arbitrary. Some people have speculated about what the world would be like if the value of Planck's constant were zero. That is meaningless because, to make it zero, at least one of its units of measure must be zero, which is impossible--the value of a unit of measure cannot be equal to zero. We can make the magnitude of Planck's constant seem huge or take on any positive value desired--but not zero. The magnitudes of the units of measure determine the values of FUPCONs. All depends upon the system of measures being used. Planck never realized the true significance of his constant. It appears again in Einstein's equations concerning the photoelectric effect. It is the centerpiece in Heisenberg's formulation of his Uncertainty Principle. Yet, Einstein, and Heisenberg too, never discovered the real nature of Planck's constant. To date, I believe that no one has because, after searching the physical literature, I have found no mention of the real meaning of Planck's constant. Until now, no one has realized that by knowing the true nature of Planck's constant and of the other FUPCONs, one is mentally enabled to grasp many loose ends of the description of the physical world and to tie them together into a more-logical, coherent whole. This book describes that tying process and presents a new, more-symmetrical model of Our Dual Universe than was, heretofore, possible to conceive. B. Planck's Constant, Exposed We expose Planck's constant for what it really is. First, we wonder, how can Planck's constant be a FUPCON when it is multidimensional? Then, it seems to occur mostly as a factor in equations that pertain to electrons and photons; therefore, we can consider it to be an electrophotonic constant. Plausibly, Planck's constant is composed of a combination of the already-known, quantum attributes of the electron. Hence, we try to break it down along dimensional lines into these more-elementary electronic attributes. C. Planck's Constant in SE Units We determine the value of h in terms of the quantum attributes of the electron. See Equations 6 through 10 in Chapter 2. Substituting appropriate SE values for the SI units in h , gives: h = 6.6 ? 10-34 kg·m2·s-1 (12 h = 6.6 ? 10-34 (1.1 ? 1030 me)(4.1 ? 1011 ?e)2 ? (1.2 ? 1020 te)-1 (13 h = 1 me·?e2·te-1 (14 Therefore, h is not a true FUPCON and, actually, is composed of factors that are the electron's quantum attributes, which, in the SE of unit measures, are each equal to one. Factors that are equal to one do not change the value of an equation and can be removed from it. In essence, they do not exist. You might ask: "What about the dimensions? Even if the SE value of h is equal to one, the dimensions, as represented by the SE units, me·?e2·te-1, remain. If we remove unity-valued h from an equation, the units on either side of the equal sign no longer equal each other as the equal sign implies. Can we get away with this?" Accepting the precedence set by historical convention, yes we can. In Appendix C, we notice that the equation, (F = m a), does not contain a FUPCON even though the newton (N), the SI unit of force, is equivalent to, but not actually equal to, kg·m·s-2. D. Role of Planck's Constant Now that we know what Planck's constant really is, let us put it in its proper place in the world of physics: 1) Planck's constant is not an independent FUPCON of primary importance in quantum physics. 2) Planck's constant is a factorial composite of three attributes of the electron arranged in accordance with its dimensions of ML2T-1, and, probably, most significantly, 3) Planck's constant is inserted into a proportion when transformed into an equation, if the difference in dimensions between the left and right sides of the proportion is ML2T-1. No other meaning to Planck's constant exists. 4) In any case, however, Planck's constant need never be used in an equation. Its quantized electronic-attribute components can be used instead. 5) If the magnitude of Planck's constant were zero, light would not move, electrons would be massless, and the wavelength of an electromagnetic beam would be zero. In sum, Planck's constant is not an important, all-pervading, fundamental, universal physical constant of nature (FUPCON). In reality, it does not exist as such. If we purged our physics books of all mention of Planck's constant, it would not be missed except by those interested in the nostalgic history of quantum physics. Actually, its absence clarifies our understanding of physical phenomena. E. Comments about Planck's Constant In the past, whenever Planck's constant showed up in yet another equation that dealt with quantized phenomena, many were quick to state that this reconfirmed the central importance of Planck's constant. With benefit of hindsight, we can now look with amusement at some quotations from various books and journals about the subject of Planck's constant. Without this hindsight, the following, historical statements only lead to confusion: 1) Planck's constant proves to have a very small value. 2) Planck's constant, h, is centrally involved in the Compton effect. 3) The quantity, h, is the central constant of quantum physics. 4) In a universe in which h = 0, there would be no quantum physics and classical physics would be valid in the sub-atomic domain. 5) [for the Bohr model of the hydrogen atom, in the equation of the angular momentum of the electron] ... Planck's constant appears again in a fundamental way. 6) Planck's constant, h, probably appears nowhere that has more, deep-seated significance than in the Uncertainty Principle. 7) We can always tell whether a particular theory is a classical or a quantum theory by inspecting its results to see whether Planck's constant, h, enters. If it contains h, either explicitly or hidden in a numerical factor with other constants, the theory is a quantum theory; if it does not, the theory is classical. 8) The fact that the constant, h, is, like the speed of light, a universal constant serves to explain that ... . 9) If Planck's constant were zero, there would be no indeterminacy because we could predict both momentum and position with the utmost accuracy. 10) Heisenberg's equation is the second one [after cavity radiancy] that contains this mysterious Planck's constant.

See Also: See "Our Unitary Universe"

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