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1000 results for “cusp_uk”
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I've always struggled with generational labels because I'm on the cusp of two generations. Most would call me GenX, but I identify with Millennials in a lot of ways.
I'm starting to see "Xennials" pop up on lists that covers the overlap. I even found a secondary label:
The Oregon Trail generation.Nailed it! Finally a generational label that 100% feels like it fits. (I am such a nerd.)
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Applause Entertainment and Zindagi Set South Asian Content Partnership: ‘We Are at the Cusp of Something Quite Dramatic’ (EXCLUSIVE)
#Variety #Asia #Global #News #Production #ApplauseEntertainment #SameerNair #Zindagi -
Applause Entertainment and Zindagi Set South Asian Content Partnership: ‘We Are at the Cusp of Something Quite Dramatic’ (EXCLUSIVE)
#Variety #Asia #Global #News #Production #ApplauseEntertainment #SameerNair #Zindagi -
Applause Entertainment and Zindagi Set South Asian Content Partnership: ‘We Are at the Cusp of Something Quite Dramatic’ (EXCLUSIVE)
#Variety #Asia #Global #News #Production #ApplauseEntertainment #SameerNair #Zindagi -
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In general, the smoothly-connecting double cusp groups with numerator k are clustered into groups where the denominator is of the form \(kn + m, m < k \); m, k co-prime.
So, for example:
- if k=4, m ϵ {1,3}
- if k=5, m ϵ {1,2,3,4}
- if k=6, m ϵ {1,5}
- if k=7, m ϵ {1,2,3,4,5,6}
- if k=8, m ϵ {1,3,5,7}There are always an even number of such sub-streams, and they come in pairs (where m=j, k-j) where the structure is similar, but complementary. For example, when k=7, the paired streams are {7n+1, 7n+6}, {7n+2, 7n+5}, {7n+3, 7n+4}.
Attached are several movies that show this effect when the numerator is 7.
- the first one, titled "7n-Smoosh", shows what a concatenation looks like that includes all denominators in order, with maximum denominator 150
- the other three are titled "7n+1", "7n+2", and "7n+3" with maximum denominator 250
As was the case for the case where the numerator is 3, the relative beauty of these videos is in the eye of the beholder, but the ones that are constrained to constant offsets of a multiple of the numerator are much more consistent to one another.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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6/
In general, the smoothly-connecting double cusp groups with numerator k are clustered into groups where the denominator is of the form \(kn + m, m < k \); m, k co-prime.
So, for example:
- if k=4, m ϵ {1,3}
- if k=5, m ϵ {1,2,3,4}
- if k=6, m ϵ {1,5}
- if k=7, m ϵ {1,2,3,4,5,6}
- if k=8, m ϵ {1,3,5,7}There are always an even number of such sub-streams, and they come in pairs (where m=j, k-j) where the structure is similar, but complementary. For example, when k=7, the paired streams are {7n+1, 7n+6}, {7n+2, 7n+5}, {7n+3, 7n+4}.
Attached are several movies that show this effect when the numerator is 7.
- the first one, titled "7n-Smoosh", shows what a concatenation looks like that includes all denominators in order, with maximum denominator 150
- the other three are titled "7n+1", "7n+2", and "7n+3" with maximum denominator 250
As was the case for the case where the numerator is 3, the relative beauty of these videos is in the eye of the beholder, but the ones that are constrained to constant offsets of a multiple of the numerator are much more consistent to one another.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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6/
In general, the smoothly-connecting double cusp groups with numerator k are clustered into groups where the denominator is of the form \(kn + m, m < k \); m, k co-prime.
So, for example:
- if k=4, m ϵ {1,3}
- if k=5, m ϵ {1,2,3,4}
- if k=6, m ϵ {1,5}
- if k=7, m ϵ {1,2,3,4,5,6}
- if k=8, m ϵ {1,3,5,7}There are always an even number of such sub-streams, and they come in pairs (where m=j, k-j) where the structure is similar, but complementary. For example, when k=7, the paired streams are {7n+1, 7n+6}, {7n+2, 7n+5}, {7n+3, 7n+4}.
Attached are several movies that show this effect when the numerator is 7.
- the first one, titled "7n-Smoosh", shows what a concatenation looks like that includes all denominators in order, with maximum denominator 150
- the other three are titled "7n+1", "7n+2", and "7n+3" with maximum denominator 250
As was the case for the case where the numerator is 3, the relative beauty of these videos is in the eye of the beholder, but the ones that are constrained to constant offsets of a multiple of the numerator are much more consistent to one another.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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6/
In general, the smoothly-connecting double cusp groups with numerator k are clustered into groups where the denominator is of the form \(kn + m, m < k \); m, k co-prime.
So, for example:
- if k=4, m ϵ {1,3}
- if k=5, m ϵ {1,2,3,4}
- if k=6, m ϵ {1,5}
- if k=7, m ϵ {1,2,3,4,5,6}
- if k=8, m ϵ {1,3,5,7}There are always an even number of such sub-streams, and they come in pairs (where m=j, k-j) where the structure is similar, but complementary. For example, when k=7, the paired streams are {7n+1, 7n+6}, {7n+2, 7n+5}, {7n+3, 7n+4}.
Attached are several movies that show this effect when the numerator is 7.
- the first one, titled "7n-Smoosh", shows what a concatenation looks like that includes all denominators in order, with maximum denominator 150
- the other three are titled "7n+1", "7n+2", and "7n+3" with maximum denominator 250
As was the case for the case where the numerator is 3, the relative beauty of these videos is in the eye of the beholder, but the ones that are constrained to constant offsets of a multiple of the numerator are much more consistent to one another.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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6/
In general, the smoothly-connecting double cusp groups with numerator k are clustered into groups where the denominator is of the form \(kn + m, m < k \); m, k co-prime.
So, for example:
- if k=4, m ϵ {1,3}
- if k=5, m ϵ {1,2,3,4}
- if k=6, m ϵ {1,5}
- if k=7, m ϵ {1,2,3,4,5,6}
- if k=8, m ϵ {1,3,5,7}There are always an even number of such sub-streams, and they come in pairs (where m=j, k-j) where the structure is similar, but complementary. For example, when k=7, the paired streams are {7n+1, 7n+6}, {7n+2, 7n+5}, {7n+3, 7n+4}.
Attached are several movies that show this effect when the numerator is 7.
- the first one, titled "7n-Smoosh", shows what a concatenation looks like that includes all denominators in order, with maximum denominator 150
- the other three are titled "7n+1", "7n+2", and "7n+3" with maximum denominator 250
As was the case for the case where the numerator is 3, the relative beauty of these videos is in the eye of the beholder, but the ones that are constrained to constant offsets of a multiple of the numerator are much more consistent to one another.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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5/
Attached are three different traces of the Maskit projection through the double-cusp groups where the numerator is 3, with a cap on the denominator at 188.
The first attached video (whose caption begins with "Smoosh") shows the result of concatenating every available cusp, sorted by increasing value of the corresponding fraction; that is, the cusp list starts with {3/188, 3/187, 3/185, 3/184 ...}. Note that there is no double-cusp group for 3/189 or 3/186 because those fractions reduce.
Unlike the movies for numerators 1 and 2, in this case the animation looks quite choppy and, although visual appeal is a matter of taste, certainly does not minimize differences between frames.
The second and third videos show the technique to generate smooth animations. Since the frames corresponding to cusps expressed as 3/(3n + 1) share an orientation, as do the cusps 3/(3n + 2), we must render two separate movies, one for each pattern, to get a smooth animation.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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5/
Attached are three different traces of the Maskit projection through the double-cusp groups where the numerator is 3, with a cap on the denominator at 188.
The first attached video (whose caption begins with "Smoosh") shows the result of concatenating every available cusp, sorted by increasing value of the corresponding fraction; that is, the cusp list starts with {3/188, 3/187, 3/185, 3/184 ...}. Note that there is no double-cusp group for 3/189 or 3/186 because those fractions reduce.
Unlike the movies for numerators 1 and 2, in this case the animation looks quite choppy and, although visual appeal is a matter of taste, certainly does not minimize differences between frames.
The second and third videos show the technique to generate smooth animations. Since the frames corresponding to cusps expressed as 3/(3n + 1) share an orientation, as do the cusps 3/(3n + 2), we must render two separate movies, one for each pattern, to get a smooth animation.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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5/
Attached are three different traces of the Maskit projection through the double-cusp groups where the numerator is 3, with a cap on the denominator at 188.
The first attached video (whose caption begins with "Smoosh") shows the result of concatenating every available cusp, sorted by increasing value of the corresponding fraction; that is, the cusp list starts with {3/188, 3/187, 3/185, 3/184 ...}. Note that there is no double-cusp group for 3/189 or 3/186 because those fractions reduce.
Unlike the movies for numerators 1 and 2, in this case the animation looks quite choppy and, although visual appeal is a matter of taste, certainly does not minimize differences between frames.
The second and third videos show the technique to generate smooth animations. Since the frames corresponding to cusps expressed as 3/(3n + 1) share an orientation, as do the cusps 3/(3n + 2), we must render two separate movies, one for each pattern, to get a smooth animation.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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5/
Attached are three different traces of the Maskit projection through the double-cusp groups where the numerator is 3, with a cap on the denominator at 188.
The first attached video (whose caption begins with "Smoosh") shows the result of concatenating every available cusp, sorted by increasing value of the corresponding fraction; that is, the cusp list starts with {3/188, 3/187, 3/185, 3/184 ...}. Note that there is no double-cusp group for 3/189 or 3/186 because those fractions reduce.
Unlike the movies for numerators 1 and 2, in this case the animation looks quite choppy and, although visual appeal is a matter of taste, certainly does not minimize differences between frames.
The second and third videos show the technique to generate smooth animations. Since the frames corresponding to cusps expressed as 3/(3n + 1) share an orientation, as do the cusps 3/(3n + 2), we must render two separate movies, one for each pattern, to get a smooth animation.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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5/
Attached are three different traces of the Maskit projection through the double-cusp groups where the numerator is 3, with a cap on the denominator at 188.
The first attached video (whose caption begins with "Smoosh") shows the result of concatenating every available cusp, sorted by increasing value of the corresponding fraction; that is, the cusp list starts with {3/188, 3/187, 3/185, 3/184 ...}. Note that there is no double-cusp group for 3/189 or 3/186 because those fractions reduce.
Unlike the movies for numerators 1 and 2, in this case the animation looks quite choppy and, although visual appeal is a matter of taste, certainly does not minimize differences between frames.
The second and third videos show the technique to generate smooth animations. Since the frames corresponding to cusps expressed as 3/(3n + 1) share an orientation, as do the cusps 3/(3n + 2), we must render two separate movies, one for each pattern, to get a smooth animation.
#kleinianlimitset #kleiniangroup #fractals #mobius #mobiustransforms #mathematicalart #mathart #mastoart #perfectloops
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Mastercard to Help Banks Offer Crypto Trading — Executive Says Crypto Is on the ‘Cusp of Really Going Mainstream’
https://news.bitcoin.com/mastercard-to-help-banks-offer-crypto-trading-executive-says-crypto-is-on-the-cusp-of-really-going-mainstream/
#mastercardcryptocurrency #Mastercardcryptocustody #Mastercardcryptoprogram #PaxosTrustCompany #mastercardcrypto #MastercardPaxos #cryptoprograms #CryptoSource #MasterCard #Finance -
https://www.europesays.com/ie/483711/ AI boom puts SK Hynix on the cusp $1 trillion market value #AI #ArtificialIntelligence #ArtificialIntelligence #Éire #HeartofAsia #IE #Ireland #MarketValue #SamsungElectronics #SKHynix #SouthKorea #StockMarket #Technology
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Cavs rally from 15 down to win in OT, on cusp of first East finals since 2018: Takeaways https://www.nytimes.com/athletic/7277856/2026/05/13/cavaliers-pistons-game-5-nba-playoffs/ Even after a slow start to the fourth quarter, Cleveland posts its first road win of the postseason. #Basketball
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https://www.fogolf.com/1248901/lucas-herbert-extends-lead-at-liv-virginia-to-be-on-cusp-of-maiden-league-victory/ Lucas Herbert extends lead at LIV Virginia to be on cusp of maiden league victory #Golf #GolfNews #Liv #LivGolf #LIVVirginia #LucasHerbert #SergioGarcia
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https://www.fogolf.com/1248901/lucas-herbert-extends-lead-at-liv-virginia-to-be-on-cusp-of-maiden-league-victory/ Lucas Herbert extends lead at LIV Virginia to be on cusp of maiden league victory #Golf #GolfNews #Liv #LivGolf #LIVVirginia #LucasHerbert #SergioGarcia
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Stop A Massive Fossil Fuel Data Center & Airshed Threat north of #SaltLakeCity #AI #DataCenter #Utah A billionaire investor is on the cusp of a major tax gift and special arrangement with the State of Utah to build an enormous data center north of the Great Salt Lake–the "Stratos Project."
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Stop A Massive Fossil Fuel Data Center & Airshed Threat north of #SaltLakeCity #AI #DataCenter #Utah A billionaire investor is on the cusp of a major tax gift and special arrangement with the State of Utah to build an enormous data center north of the Great Salt Lake–the "Stratos Project."
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Stop A Massive Fossil Fuel Data Center & Airshed Threat north of #SaltLakeCity #AI #DataCenter #Utah A billionaire investor is on the cusp of a major tax gift and special arrangement with the State of Utah to build an enormous data center north of the Great Salt Lake–the "Stratos Project."
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Stop A Massive Fossil Fuel Data Center & Airshed Threat north of #SaltLakeCity #AI #DataCenter #Utah A billionaire investor is on the cusp of a major tax gift and special arrangement with the State of Utah to build an enormous data center north of the Great Salt Lake–the "Stratos Project."
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Stop A Massive Fossil Fuel Data Center & Airshed Threat north of #SaltLakeCity #AI #DataCenter #Utah A billionaire investor is on the cusp of a major tax gift and special arrangement with the State of Utah to build an enormous data center north of the Great Salt Lake–the "Stratos Project."
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https://www.europesays.com/iran/77881/ Iran oil tanks on cusp of being full? Why Tehran can’t just turn it off #EnergyCrisis #Iran #IranOilProduction #IranOilReservoirs #IranWar #OilStorage #OilWells #PersianGulf #ProductionShutdown #Tehran #UsBlockade #UsIranWar #WestAsiaConflict
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✨🔭 Interesting news from outer space: #Cassini data plus global #MHD #simulations show that #Saturn’s cusp is not noon-centered like #Earth’s, but shifted toward the post-noon and even post-dusk sector. Xu, Yao, & Arridge et al. identify 67 cusp events and argue that rapid rotation plus internal #plasma sources fundamentally reshape Saturn’s global magnetic topology:
