Fetish-Numbers by Marie de Sade, Dr. Olaf Hoffmann (read a book txt) 📖
- Author: Marie de Sade, Dr. Olaf Hoffmann
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Prefix – Foreplay
Number Fetish
Occasionally – usually in private circles – the question is asked: 'Fancy a number?'
Positions such as 11, 22, 42, 52, 66, 69, 97 – therefore represented as sequences of numbers – are sometimes mentioned. It is probably quite common practice for sex practices to be numbered consecutively, perhaps that is why the connotation of the opening question is linked to coitus. To push a number therefore, clearly has a strong sexual component. This could be the reason for the phenomenon of the number fetish.
Also common pleasures: twos, threes, fours, fives, sixes, etc, all the way to pack-banging and group sex. Group theory, series, episodes are anyway very big topics of number space, which can quickly become a darkroom of sexual obsessions with such associations.
As fetishes in a sexual sense, objects or more generally, mostly inanimate entities are selected by interested persons, which cause sexual arousal through presence, imagination or association; an intensive turning to, occupation with these entities of desire can subsequently result in sexual satisfaction.
Fetishism does not necessarily have to be limited to inanimate entities, but can sometimes also involve parts of the body which in this context are not necessarily perceived as primary erogenous zones, such as foot fetishism, knee fetishism, pimple fetishism, corn fetishism, scar fetishism, earwax fetishism.
Occasionally interest in animals, fungi, plants and their derivatives also falls into this area: Snail, pearl, excrementophilia, yeast products in bakery products, alcoholic beverages, whole trees or parts thereof, especially in the form of a phallus or vagina, eggplant, pumpkin, cucumber, carrot, cherry, plum, fur, capnolagnia, formicophilia, melissophilia, necrophilia …
In this focus it is not necessarily about object sexuality, the fetish object can also serve as a supplement to the creation of sexual interactions with other persons, more interesting, exciting, satisfying. Thus fetishism is a special form of eroticism. Enrichment of sexual activities with all kinds of toys is widespread; with a fetish the choice is much more limited, any focus is on certain entities, whereby associations between selected entities and an erotic reference need not be generally catchy.
So fetishes can be almost arbitrary, shoes, hats, glasses, chairs, bottles, jelly, crosstip screwdrivers, drills, firearms, interferometers, accelerators, spaceships, mobile phones, cars, toy figures, dolls.
Fetishes can also become very abstract, for example money, shares, wealth, object-oriented programming, books, films, videos, audios, poetry, singing, sophilia, celophilia, pre-aprophilia. In these cases it is quasi a question of abstract sexuality.
Closely related to this is the question of what eroticism actually is or constitutes. Erotic is what is sexually stimulating, what is arousing, what is sensual attraction. Eroticism therefore has a clear relation to sexuality. Since tastes, interests and fetishes can vary considerably in this respect, it is therefore not possible to define what is generally considered erotic and what is not. Sensations are individually different.
If, for example, a fetish is present in relation to chair legs, the sight of them can be highly sexually stimulating, cause uncontrolled assaults on chairs, which are subsequently used for excessive sexual acts. Because they are merely objects, however, such use without the consent of the chair is not an abuse, and such situations of object-oriented passions can become complex due to ownership, especially when two chair leg fetishists desire the same chair leg, which in turn is owned or possessed by a third person who, due to a reluctant attitude towards sexuality, then insists on preserving the virginity of the entire chair.
With persons, eroticism can already result from a movement, a gesture, a smile, an utterance, a smell, a taste, but also in a deliberately provocative exposure of primary sexual characteristics, as well as in the observation of the same – this means of one's own or other persons of the respective preferred sex. To accuse or defame generalised specific desires or needs as unerotic would therefore be discriminatory.
Thus, in particular, dealing with numbers can also be perceived as erotic, sexually highly stimulating.
What could be concretely stimulating when dealing with numbers?
Relevant in the mathematical sense are special meanings.
0 as a right- and left-neutral element of addition has a very special meaning.
Corresponding to 1 as right- and left-neutral element of the multiplication.
The fact that applying an operation to a special number causes the identity, therefore basically nothing, highlights this number in relation to this operation.
Furthermore 0 is the only number, which does not have a finite inverse concerning the operation multiplication, but is its own inverse concerning addition.
Mathematics has opened up further numbers of particular importance to humans. For example, the circle number π, the ratio of the circumference to the diameter of a circle, is generally known. This number occurs in many other contexts, which do not necessarily have to have anything to do with the circumference and diameter of a circle.
Some decimal places from π after 3 as well as the decimal separator:
14159 26535 89793 23846 26433 83279 5028 841971 69399 37510 58209 74944 59230 78164 06286 20899 86280 34825 34211 70679 82148 08651 32823 06647 09384 46095 50582 23172 53594 08128 48111 74502 84102 70193 85211 05559 64462 29489 54930 38196 44288 10975 66593 34461 28475 64823 37867 83165 27120 19091 45648 56692 34603 48610 45432 66482 13393 60726 02491 41273 72458 70066 06315 58817 48815 20920 96282 92540 91715 36436 78925 90360 01133 05305 48820 46652 13841 46951 94151 16094 33057 27036 57595 91953 09218 61173 81932 61179 31051 18548 07446 23799 62749 56735 18857 52724 89122 79381 83011 94912 98336 73362 44065 66430 86021 39494 63952 24737 19070 21798 60943 70277 05392 17176 29317 67523 84674 81846 76694 05132 00056 81271 45263 56082 77857 71342 75778 96091 73637 17872 14684 40901 22495 34301 46549 58537 10507 92279 68925 89235 42019 95611 21290 21960 86403 44181 59813 62977 47713 09960 51870 72113 49999 99837 29780 49951 05973 17328 16096 31859 50244 59455 34690 83026 42522 30825 33446 85035 26193 11881 71010 00313 78387 52886 58753 32083 81420 61717 76691 47303 59825 34904 28755 46873 11595 62863 88235 37875 93751 95778 18577 80532 17122 68066 13001 92787 66111 95909 21642 01989 …
Another exciting, stimulating number, either potent or impotent, depending on the point of view, which is also closely linked to π, is the Euler number e.
Together with the complex number i (this means square root of -1 without negative sign) a connection with π is quickly mentioned:
-1 = eiπ
Furthermore, the following applies to the function y(x) := e x when forming the derivative:
dy/dx = y
The derivation is therefore identical with the function, which can therefore neither be reduced by derivation nor changed by integration.
First digits after 2 and the decimal separator:
71828 18284 59045 23536 02874 71352 66249 77572 47093 69995 95749 66967 62772 40766 30353 54759 45713 82178 52516 64274 27466 39193 20030 59921 81741 35966 29043 57290 03342 95260 59563 07381 32328 62794 34907 63233 82988 07531 95251 01901 15738 34187 93070 21540 89149 93488 41675 09244 76146 06680 82264 80016 84774 11853 74234 54424 37107 53907 77449 92069 55170 27618 38606 26133 13845 83000 75204 49338 26560 29760 67371 13200 70932 87091 27443 74704 72306 96977 20931 01416 92836 81902 55151 08657 46377 21112 52389 78442 50569 53696 77078 54499 69967 94686 44549 05987 93163 68892 30098 79312 77361 78215 42499 92295 76351 48220 82698 95193 66803 31825 28869 39849 64651 05820 93923 98294 88793 32036 25094 43117 30123 81970 68416 14039 70198 37679 32068 32823 76464 80429 53118 02328 78250 98194 55815 30175 67173 61332 06981 12509 96181 88159 30416 90351 59888 85193 45807 27386 67385 89422 87922 84998 92086 80582 57492 79610 48419 84443 63463 24496 84875 60233 62482 70419 78623 20900 21609 90235 30436 99418 49146 31409 34317 38143 64054 62531 52096 18369 08887 07016 76839 64243 78140 59271 45635 49061 30310 72085 10383 75051 01157 47704 17189 86106 87396 96552 12671 54688 95703 50354 …
Also very well known are two numbers, which are connected with each other by the golden ratio.
Φ = 1 + 1/Φ
The second number is 1/Φ = Φ -1.
By calculating you will quickly get:
Φ = (51/2 + 1) / 2
1/Φ = (51/2 - 1) / 2
First digits after 1, respectively 0 and the decimal separator:
61803 39887 49894 84820 45868 34365 63811 77203 09179 80576 28621 35448 62270 52604 62818 90244 97072 07204 18939 11374 84754 08807 53868 91752 12663 38622 23536 93179 31800 60766 72635 44333 89086 59593 95829 05638 32266 13199 28290 26788 06752 08766 89250 17116 96207 03222 10432 16269 54862 62963 13614 43814 97587 01220 34080 58879 54454 74924 61856 95364 86444 92410 44320 77134 49470 49565 84678 85098 74339 44221 25448 77066 47809 15884 60749 98871 24007 65217 05751 79788 34166 25624 94075 89069 70400 02812 10427 62177 11177 78053 15317 14101 17046 66599 14669 79873 17613 56006 70874 80710 13179 52368 94275 21948 43530 56783 00228 78569 97829 77834 78458 78228 91109 76250 03026 96156 17002 50464 33824 37764 86102 83831 26833 03724 29267 52631 16533 92473 16711 12115 88186 38513 31620 38400 52221 65791 28667 52946 54906 81131 71599 34323 59734 94985 09040 94762 13222 98101 72610 70596 11645 62990 98162 90555 20852 47903 52406 02017 27997 47175 34277 75927 78625 61943 20827 50513 12181 56285 51222 48093 94712 34145 17022 37358 05772 78616 00868 83829 52304 59264 78780 17889 92199 02707 76903 89532 19681 98615 14378 03149 97411 06926 08867 42962 26757 56052 31727 77520 35361 39362 …
Another special number is the Euler-Mascheroni constant γ = 0.57721 56649 01532 86060 65120 90082 40243 10421 59335 93992 35988 05767 23488 48677 26777 66467 09369 47063 29174 67495 …
Linked to the Riemann ζ function is the Apéry constant ζ(3) = 1.20205 69031 59594 28539 97381 61511 44999 07649 86292 34049 88817 92271 55534 18382 05786 31309 01864 55873 60933 52581 46199 15 …
Chaos research with Feigenbaum constants is also a fascinating subject area:
δ = 4.66920 16091 02990 67185 32038 20466 20161 72581 85577 47576 86327 45651 34300 41343 30211 31473 71386 89744 02394 80138 1716 …
α = 2.50290 78750 95892 82228 39028 73218 21578 63812 71376 72714 99773 36192 05677 92354 63179 59020 67032 99649 74643 38341 2959 …
Numbers from pure mathematics can still be deduced from this alone, but the secret becomes even greater in the field of physics, where the value of a constant will inevitably never be known exactly due to always finite measuring accuracies.
In physics, the fine structure constant in particular is known as the enthralment: 1/137.035999084(21), with their uncertainty relative to the last two digits in brackets.
π, e, Φ etc are all irrational numbers. In decimal representation, these are of course per se an inexhaustible source of joy for number fetishists.
There are people who memorise these sequences of digits to hundreds or even thousands of digits, and they are not even irritated that such sequences of digits would be completely different in non-decimal representation, for example as binary cipher or octal cipher or hexadecimal cipher.
Besides irrational numbers, there are also some significant integers with special meaning. Thus there are some numbers of which the number of ciphers is known, but by no means their ciphers themselves, and some of which have only estimates about the number of ciphers. For some, only leading ciphers are known, for others only last ciphers.
An example of this is the Meyer number, named in honour of Bertine Meyer. Of this positive integer, only the last 1024 digits are
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