An acquaintance recently asked us if we remembered the famous goroga attacks in the mahāmleccha lands. We had to confess that they were hardly the top thing on our mind, though we had repeatedly thought of those attacks at the beginning of the pandemic. He said that he had seen a recent presentation on it by the journalist Harivana, who had helped the momentous revelations of Himaguha see the light of day. He wondered if we might rethink our position on the Wuhan disease after seeing it. We told him that while the Wuhan corruption had become a matter of personal faith for many, we did think there was something of a “conspiracy” with regard to the goroga incident. Harivana is not a good guy from the H perspective but has exposed mleccha evildoing on several occasions. Hence, we went and watched Harivana’s presentation on the goroga scare and felt the urge to put down a few words regarding that sordid episode which we experienced from close quarters.
It was the time when the duṣṭa-s Gucchaka and Vakrās held sway over the mleccha-s with a court of mahāśaṭha-s known as the neocons. Then, as the summer of 2001 was drawing to a close, their former friends, the marūnmatta-s, turned against them and literally struck them out of the blue, killing nearly 3000 people. Even the mighty Yamato’s bombers had only reached the distant outpost of Hawaii, but the shaikhs literally hit the rājadhāni-s of the mahāmleccha on that day. It was a landmark moment in the history of our age and signaled that the lokapraśamanam the mahā-mleccha had achieved after the overthrow of the Soviet Rūs empire had been challenged. Barely a week had passed since the marūnmatta assault on the mleccha heartland when a new round of terror swept through the country. Mysterious letters spiked with a powder bearing the gorogānābhika were sent to many addresses, mostly on the East Coast of Madhyamleccha-varṣa, over a period of around two months. The end result was the death of 5 people, with 17 others taken ill — several with lingering aftereffects. Some believe that this is the official count, but several more were probably infected and affected by it. As Harivana correctly stated, we clearly recall that it resulted in a period of immense terror. At least the marūnmatta attacks were directed at specific sites, but here the agent of death was coming right to people’s homes via the mail. Thus, no one felt safe as the reports of those attacks started spreading around. People were very gingerly in collecting their mail with gloves on as the information spread that residues of the rogānābhika were found not far from where they lived or worked. Then, almost exactly an year after the goroga terror, a new marūnmatta terror broke out at the mahāmleccha rājadhānī in the form of the two kṛṣṇa gunners.
The net result of all these was to make the mahāmleccha public acquiesce to any plan their mahāśaṭha court might have in terms of military campaigns in far-away lands. Indeed, the goroga attacks were accompanied by handwritten notes that made them appear as if they had been launched by marūnmatta-s from West Asia. Just after the 9/11 attacks, we recall that a duṣṭa-āṅglaka online operative, whom several stupid H mistook to be a friend, was priming people on online forums about the possibility of biowarfare by the marūnmatta-s and dropping hints about Eye-rack. We wondered how he knew what the rākṣasa-sādhaka-s’ intentions were, even before the dust of the towers had settled. Thus, when the goroga attacks began, we had the first hints that something strange might be afoot. Not surprisingly, we soon saw misinformation deliberately fed by the court to their “journalist” puppets pinning the attacks on Saddam Hussein of Iraq, whom the mleccha-s had been long wanting to overthrow and kill. Most of the mleccha populace naively believed this claim. However, from early in the attack, some microbiologists were pointing out that this was likely an inside job. Despite the journalistic “leaks” screaming “Sadaaam” and “WMD”, even the mahāmleccha-praṇidhi-s could not hide the truth for long — it was their own strain of goroga — something they had been developing for long as a biowarfare agent. This was distinct from the strain the Mahāmleccha had given Saddam when they were still friends. Hence, they tried to frame one of their own physician-researchers. While he was a person with some dubious or even fraudulent tendencies, he was entirely exonerated of any role in the goroga attack and paid reparations. Subsequently, after many years of fruitless investigations, they pinned the crime on another of their own men, Ivins, whom they had earlier recruited to study the gorogānābhika behind the attacks. He conveniently committed suicide just before they were to arrest him, and no autopsy was performed on his corpse.
We lost track of this case after it became clear that their earlier man was not responsible. Our interest was briefly revived after we heard that Ivins had committed suicide — this sounded so fishy that many possible scenarios could be constructed around it. In any case, we had no good evidence to favor one or the other. Moreover, the press made sure that it dropped out of the news cycle rather quickly. In essence, it was not a marūnmatta attack and a thing of the past; hence, it did not deserve time on air. Interestingly, a little before that, a former student and a mūlavātūla wanted our assistance in studying the gorogānābhika for the latter’s commercial venture as he was flush with the money that was being doled out for such things in the aftermath of the attacks. Due to the bindings on us and our lack of interest in things that would not lead to published research, we declined to participate. However, a few years later, the said mūlavātūla came to ask us to mentor a relative. At that point, I asked him about his gorogānābhika venture. He responded that he had made some money out of it though his product was never commercialized, and our former student had moved on with that expertise to study rogāṇu-s, such as the C-harimāṇa-rogāṇu and the dreadful vīparīta-granthi-rogāṇu that periodically breaks out in Kṛṣṇadvīpa. He then added that he had been consulted by a mūlavātūla-vṛddha (also our acquaintance) on a report on the antaḥ praṇidhi’s claims that Ivins was their man. He went on to describe that Ivins had some serious graha-roga that triggered his svahatyā, but in no way could he be uncontroversially implicated by the data of the praṇidhi-s and daṇḍaka-s as the perpetrator.
Piqued by this, we examined the report and since then have spoken to some of its authors. While we are not in a position to paraphrase what they said, and several years have elapsed since the first of those conversations, what we can say is that they did not seem convinced by the case. The evidence that the antaḥ praṇidhi-s had gotten their man was slim at best and likely false. Indeed, as Harivana, a lawyer, said in his presentation, it might simply not have survived in court. Hence, we have to plainly fall back on one of the “conspiracy theories”: (1) We all know that śaṭha-sabhā, with the evil Vakrās as their titular head, was long wanting to wage war on a number of nations and overthrow their leaders. One of these was Iraq, and the other is the Rūs. (2) They believed that with the fall of Rūs power, they had no challengers for their adventures. Thus, they began their ventures with support for the marūnmatta-s against the Rūs ally, the Serbs, and saw that the weakened Rūs could simply do nothing. They had been itching to do the same in West Asia — the idea was that they could protect their prathamonmatta guru-s and allies by “taking out at least seven countries” and redrawing the map of that region. (3) The śaṭha-sabhā was willing to come up with outrageous plans. These included ridiculous ideas (though this was not put into action) of bombing places in South America in response to 9/11, evidently as a signal to those in West Asia. This meant that there was always the danger of outrageous action from a small motivated band within their gang. This is an important point for developing a hypothesis for what happened. (4) They were waiting for an excuse to exert near-total control on the American population to play along with their plans.
Given this background, the marūnmatta attack on 9/11 was the perfect opportunity for the mahā-śaṭha-sabhā that surrounded Gucchaka. However, they knew that even on the eve after the attacks (as we saw ourselves), people were still going to restaurants and enjoying a good meal and going about with their lives. They wanted to impress on them a real sense of fear so that they would play along with their plans in West Asia. The way out was to imprint the terror in the minds of the populace — what could be better for that than the goroga attack? Hence, it is not impossible that a deep insider of the śaṭha-sabhā with a psychopathic streak or a rogue but deep-state-backed praṇidhi let the attacks happen either by deliberately green-lighting them or by prematurely lifting an inhibitory check on plans that were already in place. We would reiterate that the operation was probably intended more to cause mass fear than mass death. If this were the case, then it would not be in the interest of the śaṭha-sabhā (=deep state) to let the public know the truth about this. In fact, in such a scenario, the events would have likely unfolded along the lines they did.
We know this sounds outrageous, but this is why we are willing to entertain it as a possibility: (1) While we are not an expert on this matter, the weaponization of the amount of gorogānābhika used in the attack was no ordinary task for a microbiologist. After all, it was a very fine-grade powder in the league of the best mahāmleccha or Rūs weaponizations. There is no evidence that the accused was directly handling such weaponized samples that could not be easily reproduced by other experts post facto. (2) The packages were sent in such a way as to limit damage rather than produce a larger number of casualties (e.g., clearly stating what the agent was) while at the same time producing terror in the population. (3) The number of “leaks” claiming a link to Saddam and his bentonite, well before the long investigation concluded, was striking (a point also emphasized by Harivana). This went along with an extensive discussion of Saddam’s “germ labs.” (4) The inept leak implicating the “person of interest” who was then exonerated. (5) The number of years spent on the case without a conclusive identification of the perpetrator. This is particularly strange given the resources and the capabilities of the antaḥ praṇidhi-s in other cases. (6) The general disinterest on the part of the antaḥ praṇidhi-s and daṇḍaka-s in following up and vigorously defending their choice of the suspect in the media. Given the significance of the case and the terror that arose from it, one would have expected more, especially if it had been a real domestic vibhīṣaka. In conclusion, the real and full story was likely purposely hidden from the public.
Like our interlocutor above, one may ask, if we are willing to allow this much with the goroga case, why not do the same for the Middle Kingdom corruption? Hence, before going on with more significant things, we will briefly repeat our position on it with the hindsight of 3.5 years. We still believe that the evidence in favor of the Wuhan condition being caused by a virus designed or deployed as a biowarfare agent is weak. Hence, we continue to look at it as a zoonosis. It is notable that the Cīna researchers themselves had mentioned in print in their pre-pandemic studies on coronaviruses that they expected other zoonoses like SARS to emerge in their midst. However, certain things are clear. First, the Cīna-s have a poor track record of laboratory safety, as was seen with the first SARS itself. Second, we cannot entirely rule out the possibility that the Cīna-s had brought infected animals to their institute or had already managed to cultivate the virus there as part of their well-known ongoing research on coronaviruses. Therefore, it cannot be ruled out that the infection began from their lab personnel or improperly disposed non-human lab animals. That said, as we have repeatedly pointed out, Galtonism played a major role in how the pandemic played out thereafter. It is this Galtonism that has been covered up, bringing memories of the goroga incident. It is clear that the mahāmleccha academics and also a section of their security state have deep-rooted Galtonistic impulses going back to the mahāpāpin mūlagrasta Cumbaka. This meant that they were more than happy to contract out, encourage and participate in virological studies with the Wuhan and other Cīna labs. They were confident that they would be treated well in return for this generous help. However, what they received in return was typical Cīna perfidy.
That apart, we think that the handling of the pandemic, the overthrow of the Picchilaka and the subsequent war between the Rūs and the Mahāmleccha have some underlying thematic connections to the way the goroga incident was handled. We can see a parallel of the plot to confuse the public and make it forget momentous incidents on multiple occasions. The first was that of Vyādhapiṇḍaka’s saṃkalanaka, which revealed serious damaging facts about their man Piṇḍaka. The Nāriṅgapuruṣa would have almost certainly edged past him had that not been covered up. Not only did the antaḥ praṇīdhi-s and bahiḥ praṇidhi-s cover it up, but they also imputed the blame of faking it on the Rūs, thus connecting the two strands of their action. This deprived the Picchilaka of a potent heti to put the duṣṭa-s in place while simultaneously taking the sheen off him as a Rūs agent. Even after Vyādhapiṇḍaka’s antics were shown to be real, the mainstream media quickly took it out of the news cycle, just as with the supposed perpetrator of the goroga affair. The revelations coming from Bhūtipiṇḍakī’s writing were squelched even more quickly by the action of the antaḥ praṇidhi-s. Finally, when the investigative report was published showing the faking by the antaḥ praṇidhi-s (some of the same guys involved in the goroga affair), that too was quickly buried by the MSM along with all the śīśśabdakāra-s.
This closely relates to the duṣkarmāṇi of the śaṭha-cakra centered on Ṣiḍgapatnī in sparking the war with the Rūs. Just like the stories about the legendary WMDs, the Niger yellow cake, “bioterror” labs, and deadly gases (in part supplied by the Āṅglaka-s) of Saddam Hussein, they now started circulating stories about the evils of the Rūs and the Rūsrāṭ. Not just that they presented the Rūs as controlling the mahāmleccha population via their asset (the Picchilaka) in the Śvetālaya itself. The facilitators of this program were some of the same guhyacakra involved in the Eye-rack fiasco and the goroga messaging. The same thing came up in the śyāmajīva and kālāmukha rebellions that they incited to bring down Vijayanāma-vyāpārin. In certain satellite countries of the mahāmlecca world, where nālika-s are not widespread, they used a similar tactic to enforce public containment during the pandemic.
When one compares these actions with the goroga and Eye-rack incidents, one sees a striking commonality. It typically involves the following steps: (1) creation of a favored narrative they wish to plant among the people. It typically goes against the instinct of the masses or aims to incite a deep fear or division in them. (2) It is given an official guise via “leaks” that appear to come from the sources the mleccha-s were trained to respect. When the hastin-s ruled the roost, the masses and also the judges and prosecutors were trained to become cop-/soldier-worshiping zombies who would readily violate their own constitution at the first sight of a uniform and an officially issued nālika in the upholster. This was the mleccha world that the śaṭha-cakra had in hand to manipulate through diverging messaging. Thus, by leaking via one of the “uniformed” praṇidhi institutions, they knew they could get a sizable part of the masses to believe. (3) This is then repeated ad nauseum by their outward-facing network — politicians and MSM entirely — or taken out of the new cycle by the latter, depending on what they want. For instance, the phrase that the Nāriṅgapuruṣa was “a Russian asset” or “dangerous” or as bad as the “hādi-śūlapuruṣa” was repeated non-stop by everyone from ṣiḍgapatnī down to the lowest MSM operative all through the day. On the other hand, if it was Vyādhapiṇḍaka-s machine or the condition of Paḍbīśapuruṣa or of Piṇḍaka himself, then they enforce pin-drop silence. (4) At the higher level, this enforcement is handed over to their newfound allies, the mahāduṣṭa-s like guggulu, mukhagiri, bejha-khalvāṭa, jāketyādi on the tech side and kṛṣṇādri-phuka, agrabhaṭa, sora and the like on the monetary side. (5) On the ground, it is handed over to the chagnyamukha-s and the pogaṇḍasenā. This in essence, is the 
Thus, the incidents of the past are relevant to our times because they help us understand the śaṭha-cakra running the mahāmleccha state. One should have no delusions about its destructive intentions not just among the mleccha-s but all around the world. Its old objectives, such as the destruction of the Rūs, now dovetail with its “spiritual” pursuit — the spreading of navyonmāda throughout the world. The zeal here is in every way comparable to the zeal with which they pushed pretonmāda earlier and the marūnmatta-s pushed their cult. They would also not shy away from comparable brutality in that endeavor, albeit cloaked in the pieties befitting the current world. H as svabhāvavairin-s of their Weltanschauung will unsurprisingly be one of their biggest external targets after the Rūs. Hence, no efforts will be spared to drive in the largest explosive charges through the big open gates in the Indian constitution manned by a pliant judiciary even as the election draws near. This will align with the increasingly desperate measures by the dūṣita-māśa to provoke an attack by the Rūs.
, RV7: 
, RV8: 
). Given that it is almost entirely absent in the core family books of the RV, despite arising from the same root as yajña, it might not be closely linked to the above-discussed developments. Similarly, it is not frequently found in the Yajurveda collections associated with the ādhvaryava tradition either; e.g., Taittirīya-saṃhitā 
; Taittirīya-brāhmaṇa 
; AV-Paippalāda 
. Interestingly, these instances in the AV saṃhitā-s closely parallel the cognate occurrences in the Yašt layer of the Avestan corpus. This formula was finally incorporated into the later synthetic elaboration of the yajña in the form of the famous preamble incantation of the hotṛ before he recites the ṛk for the offering: “ye3 yajāmahe”. From these observations, we may infer that: (1) After the initial reformulation of the old IE śrauta-class ritual as the yajña in the ancestral I-Ir tradition, it underwent several temporally and focally distinct developments. (2) However, these developments tended to interact with each other repeatedly resulting in synthetic reformulations. (3) One development was the reformulation of the yajña among the Kauśika-s and probably their Iranian counterparts (the Sparśa-s mentioned by Baudhāyana? With regard to the possible Ir-Kauśika interaction one may also point to the special place of Mitra for both) gave rise to one form of the ritual. This provided the ground for the rise of the ādhvaryava tradition. Another, which probably rose in the Atharvan tradition and its Iranic counterpart was the sacrificial offering with the formula “yajāmahe”. (4) The above two developments came together in a synthesis even before the Indo-Iranians split up. Hence, we argue that even though further synthesis might have happened both on the IA and Ir sides after they split, much of their branch of the IE religion developed prior to their split. A corollary to this, contrary to the mainstream reconstruction, is that the original core of much of the Vedic (and Avestan) scripture was composed not in their final destinations but much earlier on the steppe.
1750-1450 BCE), started expanding from the Ural Mountains to the East and Southeast reaching all the way to what is today Mongolia and China. The Andronovo phenomenon did not show prominent chariot burials of the Sintashta elite; however, their occupation sites are associated with an extensive body of petroglyphs that depict the chariot (or a quadriga) in a peculiar “bird’s eye view” fashion (Figure 1). In this regard, we have to quote the doyenne of chariot studies, M.A. Litauer: “One cannot help wondering if, no matter what other ends it may eventually have served, this type of rendering of a vehicle was not first suggested to the artist by looking down into a tomb…” Indeed, the idea that this depiction emerged from funerary contexts is supported by the fact that it appears on Andronovan grave stelae at the Tamgaly and Samara Cemeteries in Kazakhstan and the Akdzilgi grave sites in the Pamirs associated with Andronovan and/or a related southern successor of the Sintashta. In Mongolia, they are sometimes seen on the “Deer Stones”, which, as we saw before, were likely versions of 
Figure 3
1 following the famed philologist, Martin West. Similar euhemerism is seen with respect to this association in the Germanic world (the tale of Gudrun) and the Iranic world (the Ossetian solar goddess Aziruxs = Daylight). Given that the Aśvin-class deities were already associated with horses from PIE times, we believe that the tricakra motif with the chariot of the solar goddess drawn by a pair of horses (potentially signifying the Aśvin-s themselves) would have been easily adopted by other IE branches as chariot technology was introduced to them.
package. We corrected that in order to let it compile. Other than that, we have not attempted to improve the rest of the code.
s who resurrected the lion? Several, including Muṣkavān Kasturī, have rung the alarm bell and called for a moratorium on training, much like on nuclear testing. Even the OpenAI CEO Altman, otherwise a techno-optimist (belief in cheap and abundant energy in the near future is an indicator) with a utopianist streak, acknowledges that there is potential for great downsides from his golem. We completely agree with the general sentiment here though we fully realize the cat is out of the box now. In our opinion, one of the more interesting thinkers on this matter is Yudkowski (yes, we realize some may have a visceral reaction when we say this). While we have a major point of disagreement with him, we realized that we have converged on some ideas. Hence, we consider some of his positions along with our agreements, disagreements and independent views on the matter at hand.
DR6 interaction might be a figment arising from the sticky low-complexity region in the former rather than being a true ligand for the latter. This sparked a lengthy back-and-forth with her advisor, who felt that she was literally not wanting to collect the diamonds lying on her path because she just wanted to graduate and leave. However, things changed on the last day of the week when Touchstone sent them some of his raw data, and Vrishchika was able to show her advisor that the key images in support of his claim had been fraudulently produced. With this staring in his face, Vrishchika’s advisor had to fall in line with her reluctance to touch this project. However, in the process, Vrishchika had lost much of the week that could have been spent on more productive experiments.
et al. that the great Cretaceous-Paleogene extinction was likely caused by the impact of a massive asteroid. This jibed well with our developing sense of meteoritic catastrophism, and we became instant converts to that hypothesis. Thus, we were dragged into the debates of asteroid impacts versus various alternative hypotheses. Hence, it was a matter of considerable excitement to us when we read of the discovery of the Chicxulub Crater in the Yucatan peninsula as a possible candidate for the K-Pg impact. Since then, it has become one of the best-supported cases of a meteoritic impact triggering a mass extinction.
is the orbital period of Jupiter then: (1) The Hungarias are concentrated at a period of 
days followed by an exclusion gap at 
days. (2) The inner and the central belt are separated by the resonance of 
days. (3) The 
days and 
days resonances respectively bound the Psyche peak from the central and outer belts. (4) The outer belt is bounded by the 
days resonance and the Cybeles are concentrated by the 
days resonance. (5) The Hildas are concentrated by the 
days resonance. (6) Finally, we could see the Trojans as being in a 1:1 resonance. What we learned from these resonances was to help us understand the structure of chaotic maps we discovered later in our life and the generality of this principle in various Hamiltonian-like maps.
to energy (bottom right panel of Figure 4):
is in 
, i.e., megatons of TNT; in turn 
in standard physical units. For comparison, the biggest American and Russian nuclear weapons were approximately in the 10-50 mT range. From the above, figure it is apparent that the modal energy of the impactors in this dataset will be 1000-10000 mT range. Even if the above formula is overestimating the energy by a factor of 10, the modal impact would be 100-1000 mT, which would be 10-100 times the most powerful nuclear weapons. Thus, while such impacts will not have global consequences for life, unlike the rare right-tail events, they definitely could negatively affect an organized civilization by taking out a city or two. Even a Tunguska-like event over a populated center could have wiped out a city like Delhi — indeed, people have remarked that a delay of a few hours might have taken out the Russian city of St. Petersburg or some other one in Europe.
. It was easy to track given its proximity to 
Aurigae. Below 
. Below is a long exposure image captured by our friend’s camera that illustrates the position and the view close to what saw through our 
segments. The same is also mentioned by Śrīkaṇṭha-sūri in his Ratnatrayaparīkṣa thus: 
2 31. vyāpin 
times yields magical powers. Both the early saiddhāntika and Brahmayāmala traditions speak of the 9 observances (e.g., japa of specific mantra-s wearing clothes and turbans of various colors) that seem to map to the nine-fold structure of the Navātman-mantra. On the Bhairava side, in the root Dakṣiṇa-śaiva tradition, the Svacchanda-tantra teaches the Vidyārāja, which is called ekāśitipadāḥ (81 segmented, just like the Vyomavyāpin):
-segmented mantra is taught. In the Pūrvāṃnāya (Trika), we see different formulations with Navātman-bhairava: (i) in the Siddhayogeśvarī-mata, he is the central deity of the maṇḍala of the kha-vyoman, known as the Kha-cakra-vyūha, where he is surrounded by a retinue of yoginī-s and vīra-s. (ii) in one formulation of the Tantrasadbhāva his 81 segmented Vidyārāja is presented similarly to that in the Svacchandatantra. (iii) In the classic formulation of the Tantrasadbhāva (followed by Abhinavagupta), there is an ascending series of Bhairavī-s and Bhairava-s starting with Aparā with Navātman-bhairava, Parāparā with Ratiśekhara-bhairava and Parā with Bhairava-sadbhāva. Notably, the visualization of the Rudra deity of the Vyomavyāpin conjoined with the kavaca and the astra in the Pāśupata-tantra is quite similar to that of Navātman in the Paścimāṃnāya.
(1) Ananta 
Figure 1.
the side 
of an inscribed regular polygon of 
sides is 
. Thus, if one does not insist on a compass and straightedge construction, one can easily draw any polygon as long as one has a sine table. The Hindus have had a long history of generating sine tables as well as algebraic functions that approximate the sine function to varying degrees of accuracy. Thus, one would expect that this was the most likely route they took. This still leaves us with the question of how exactly they did it in practice. A likely answer for this comes from Bhāskara-II’s Līlāvatī though this knowledge appears to have been lost in some parts of India in the late medieval period.
for 
. We compare these to the actual values in the below table:
:
, the length of the given arc 
and 
its chord. Then the above can be written in modern notation as:
fraction of the circumference, 
. By plugging this into the above equation, we get:
:
with 
to infuse the image with consciousness:
Avicephalous and therocephalous Kaumāra goddesses from Kuśana age Mathurā
, etc. hybridization happens. I know that these distributions have some weird humps but how do we get those shapes exactly?’’
is the radial distance variable, we can write the shape of the wave functions thus. Of course, these are to be normalized by factors of 
, where 
is the atomic number, and we set the Bohr radius 
But for our purposes just the shape matters:
, where 
is your desired orbital. Lootika could you draw these out on your tablet for her? So all you need for this exam are the above 5 equations.’’
.’’![\sqrt[3]{2}](https://s0.wp.com/latex.php?latex=%5Csqrt%5B3%5D%7B2%7D&bg=ffffff&fg=333333&s=0&c=20201002)
to 5 places after the decimal point.’’
’’
— this is a ridiculous question – are they out of their senses? ’’
’’
and squaring of a circle
. Use that segment to construct a circle with diameter 
.
. Use that to construct a segment of length 
. With that segment construct a circle of diameter 
(Figure 1).
. This is very close to Āryabhaṭa’s approximation: 
. People have claimed that Āryabhaṭa arrived at his value by using polygons to approximate a circle. There is absolutely no evidence for this claim making one wonder if he had somehow arrived at a formula like that of Ramanujan. It remains unknown to me if Ramanujan had found some special connections relating to this value. The same value is also recommended as a correction to the very approximate Bronze Age values by Dvārakānātha Yajvan, a medieval śrauta ritualist and commentator on the Śulbasūtra of Baudhāyana. This value is somewhat less accurate than another ancient value 
recorded by Vīrasena and in some Bhāskara-II manuscripts (
defines the alternate odd numbers: 1, 5, 9, 13, 17, 21, 25, 29, 33, 37…
defines the remaining odd numbers absent in the above sequence: 3, 7, 11, 15, 19, 23, 27, 31, 35, 39…
(including the complex plane) that Ramanujan discovered for himself:
, i.e., the ratio of the derivative of the gamma function to the gamma function:
is Euler’s constant.
, cubes of triangular numbers and 
. We can ask the converse question of how close is 
to 10 (Figure 2). Ramanujan discovered an interesting answer for this.
, are the sums of successive integers up to 
: 1, 3, 6, 10… Then,
:
so on). However, the question of the sum of the reciprocals of the squares of integers defied attempts of brilliant mathematicians, such as the Bernoulli clan (hence, the Basel problem), until it fell to Leonhard Euler in 1734 CE. Thus, the zeta function can be defined as a generalization of such sums for any number 
. Euler subsequently established that the reciprocal of 
gives the probability of two integers drawn at random from the interval between 
and 
being mutually prime (i.e., having GCD=1). This suggested the link between the zeta function and primality, and finally, three years after solving the Basel problem Euler showed the explicit link between prime numbers and the zeta function by his product formula:
,
(found in his first notebook and communication with Godfrey H. Hardy) — this was essentially his auto-discovery of the value of 
. He also discovered for himself the connection between the zeta function and prime numbers. He discovered that the zeta function displays an oscillatory behavior on the negative real line, taking the value 0 at all even negative numbers (-2, -4, -6…). He used these zeros to derive the distribution of primes, paralleling the work of Riemann. However, he overestimated the accuracy of his results for he was unaware of further zeros discovered by Riemann on the complex plane that he only learnt of from Hardy when he went to England. From his notebooks, we learn that during the Indian phase of his career, like Chebyshev, he also explored the values of the zeta function on the real line beyond 2. Thus, Ramanujan discovered a general formula, one of whose special cases is a series specifying 
, where 
are constants specific to each sum:
of the digamma derivative-based series formula we established that this can be expressed in a rather compact form with the tetragamma function, i.e., the second derivative of 
:
. By analogy to the factorial product, one can define the primorial as the product of successive primes:
is an odd integer. This holds for the below values of 
then for 
:
The sum of the 4th powers is given by 
.
then,
is quite trivial. For the equation 
, using Ramanujan’s parametrization one can obtain several sets of tetrads. Below is an example where we take 
to be 1 more than 
(first column) are the 
. The sequence defined by 
, while 
(Figure 5).
and 
. Remarkably, this sequence appears in multiple geometric contexts. One is the Euler (Venn) diagram problem. It is an analog of the problem of the maximum number of bounded areas obtained with triangles. What is the maximum number of bounded compartments you can represent using circles (Figure 7)? The answer is this sequence.
, the second side is 
and the angle between these two sides is 
. Then the squares on the third sides of this sequence of triangles will have an area equal to the sequence 
and 
at a given point in time in a population. Under the selective pressure acting on it, in the next generation, it will become 
. Thus, the selective pressure can be conceived as a function that brings about the transformation 
. Thus, iterating this function with its prior value with give us the trajectory of the measure of the said trait in the population. While it might be difficult to establish the exact function 
for a real-life biological trait under selection, we can imagine it as being any common function for a simplistic analogical model. This led us to the geometric representation of the process — the cobweb diagram.
(point B in Figure 1) eventually leads to convergence to a fixed point that can be determined by obtaining the intersection between 
and the line 
. In this case, one can prove that it will be 0.6823278…, the only real root of the equation 
. Thus, 0.6823278… can be described as the attracting fixed point or attractor of this functional iteration.
, 
. These two points draw the iterates towards themselves but the competition between them results in the outcome being chaos unless 
, which shows a gradual convergence to 0. The gradual convergence in cases like this is related to their limit as 
; e.g., 
. In the below catalog, 
denotes the Golden Ratio and 
its reciprocal.
: 
: 
: 
; This attractor also extends to the complex plane.
: 
: 
: 
: symmetric sawtooth chaos: 
are repellors.
: sawtooth chaos: 
(Chebyshev 2): chaotic (-1,1)
(Chebyshev 3): chaotic (-1,1)
) is the attractor for all real values. On the complex plane, other than those values in the white region (Figure 5), all values within a fractal boundary converge at different rates (indicated by coloring) to the same attractor.
from different starting points.
scale in the figure). See our 
: 0.94774713351699
Figure 7. Distribution of the functional iterates of 
with certain exclusion zones. The most prominent exclusion zone contains the primary repellor 0.514933264661… (solution of the equation 
; red point in Figure 7).In the negative part of real line, the exclusion begins at 
(purple point in Figure 7). The points of the other exclusions zones (black points) are more mysterious.
: chaotic
: -1.25872817749268
: 1.2587281774927
: bicycle: -0.83019851706782, 1.41279458572762; These attractors are also valid in the complex plane.
in the complex plane
: While it is chaotic on the real line, on the complex plane it converges to either 
depending on the initial point.
: 1.1141571408719
. The light-yellow regions converge to the attractor indicated as a blue point
or divergence to 
: chaotic
for convergence or divergence to 
: The attractor on the real line is 
. On the complex plane, the points within a fractal boundary (Figure 11) converge to the same point at different rates (the contours in Figure 11).
: 0.69481969073079
: 1.5570858155247
: -0.99990601241267
: 0.97678326638014
: 0.44604767999913 (root of the equation 
) it the attractor both on the real line and the complex plane.
: 
is the attractor both of the real line and the complex plane depending on the starting point defined by (root of the equation 
: bicycle: 0.013710961966803, 1.55708579436399; These values are remarkably close to but not identical to the solution of the equation 
, i.e., 
and 
. Thus, the sum of these two values is close to 
.
: bicycle: 0.013710102886935, 0.999906006233481; These values are remarkably close to but not identical to the solution of the equation 
, i.e., 
and 
.
: octocycle: 0.366798375086067, -0.938273127439933, 0.324922488718667, -0.999958528842272, 0.373119965761099, -0.921730305866654, 0.310327826505175, -0.991153343837468; this cycle appears to be associated with oscillations close to 
and 
: converges to either 
(solutions of the equation 
) depending on the starting point.
: 0.7650100
: 
depending on the starting point.
: 0.5671433; remarkably this is 
, where 
is the function discovered by the polymath Johann Heinrich Lambert, in the 1700s. This value can be computed using the below definite integral:
latex
: 0.64118574450499; comparable behavior as above in the complex plane. The closed form for this fixed point can be derived from the Lambert function: 
:
: 0.54522571736464
or divergence to 
. We can again find a closed form for this fixed point using 
reflected about the real axis (Figure 13).
: 0.7384324007018
: 0.63654121332649
: This function is interesting in that it is chaotic on the real line with a repellor at 1.4215299358831… As the iterates approach 1 from below they are prone to negative explosions; if they do so from above, they undergo a positive explosion. The distribution of the iterates shows a preponderance of small values but when extreme values occur they are very large (explosions). Interestingly, in the complex plane, it converges to -0.32447650840966+0.31470495550992i (Figure 14). The number of iterations to convergence reveals a fractal pattern of interlocking circles.
-Persei (Algol) had changed its brightness. In his own words:
Cephei. The former two will take the center-stage in this note, while the latter was covered in an 
(solar masses) and 2.90 
(solar radii); the dimmer star is of spectral type K2IV of 0.81 
magnitude star near Canopus.
Tauri and the EB 
then the stars are typically EAs. A morphology parameter greater than 
etc). The contours being 2D distribution densities
, we start seeing the emergence of two populations belonging to distinct period bands.
. However, for values 
it shows an interesting trifurcation with 3 distinct bands corresponding to those with a period of 1 day or lesser; with a period of 10s of days; with a period in the 100 days range. Given that the morphology parameter captures the shape of the light curve, this trifurcation evidently reflects the separation between the EWs and the different populations of EBs in the traditional classification.
, which indicates the inclusion of hotter stars. This seems consistent with this morphology range being enriched in EBs. The last morphology peak as a color profile similar to the first but at a lower period range. This would be consistent with it being primarily composed of EW stars, which in the Russian eclipsing binary dataset was enriched in G-G pairs.
in the 
plane with the origin in rectangular coordinates, 
, at the center of the more massive of the two stars. We then take the distance of the center of the less massive star from the more massive one 
. Then the magnitude of the position vectors to a point on this 
of the two stars from the origin will be:
is the gravitational constant and the first two terms are the gravitational potentials from the two stars respectively. The third term is the centrifugal force, which needs to be accounted for as the two stars are revolving around their common center of mass 
is the magnitude of the position vector from 
in a dimensionless form in 
units on the 
a given potential value (Figure 16):
for which the equipotential curve first takes on a real value, i.e., it appears as just two points, define the two Lagrangian points 
. These can also be found using the equilateral triangle with the two stellar centers. From these two points, the equipotential curves expand as two disjoint lobes lying on either side of the X-axis. Finally, the two lobes intersect at a point on the X-axis to the left of the star with the larger mass. This point of intersection defines the point 
(Figure 16). The equipotential curves then become closed curves with two inflection points that advance towards each other. They finally meet on the X-axis to the right of the lower mass star. This point of intersection is the point 
. After this, the curve becomes two loops, with an inner loop with two inflections and an outer loop that tends towards a circle (Figure 15). The inflections in the inner loop then intersect at a point on the X-axis between the two stars. This point is 
. After this intersection, the curve becomes 3-looped, with two oval loops around the two stars and the outer loop surrounding both of them. At these points, 
, the gravitational forces exerted by the two stars cancel each other. Based on the potential equation one can derive an equation whose solution gives the 
(Figure 16):