Eric Jacob - Polynomial sequences of integers, reals or physical objects which then lead to the laws of physics- EJ Sciences

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EJS_P1P3_P1P1
Linear Recurrence Equation:
a(0)=1 a(1)=3
a(n)=1.a(n-2) + 1.a(n-1)

1, 3, 4, 7, 11, 18, 29, 47, 76, 123, 199, 322, 521, 843, 1364, 2207, 3571, 5778, 9349, 15127, 24476, 39603, 64079, 103682, 167761, 271443, 439204, 710647, 1149851, 1860498, 3010349, 4870847, 7881196, 12752043, 20633239, 33385282, 54018521, 87403803, 141422324, 228826127, 370248451, 599074578, 969323029, 1568397607, 2537720636, 4106118243, 6643838879, 10749957122, 17393796001, 28143753123, 45537549124, 73681302247, 119218851371, 192900153618, 312119004989, 505019158607, 817138163596, 1322157322203, 2139295485799, 3461452808002, 5600748293801

\(EJSGF(x) = hidden\)

First derivative sequence of EJS_P1P3_P1P1 (by sum of 2 elements starting in 3):
1, 3, 3, 4, 4, 7, 7, 11, 11, 18, 18, 29, 29, 47, 47, 76, 76, 123, 123, 199, 199, 322, 322, 521, 521, 843, 843, 1364, 1364, 2207, 2207, 3571, 3571, 5778, 5778, 9349, 9349, 15127, 15127, 24476, 24476, 39603, 39603, 64079, 64079, 103682, 103682, 167761, 167761, 271443, 271443, 439204, 439204, 710647, 710647, 1149851, 1149851, 1860498, 1860498, 3010349, 3010349, 4870847, 4870847, 7881196, 7881196, 12752043, 12752043, 20633239, 20633239, 33385282, 33385282, 54018521, 54018521, 87403803, 87403803, 141422324, 141422324, 228826127, 228826127, 370248451, 370248451, 599074578, 599074578

EJS_P1P3_P1P1 (chart roots 2, -1, 3, -4, 7, -11, 18, -29, 47, -76, 123, -199, 322, -521, 843, -1364, 2207, -3571, 5778)

EJS_P1P3_P1P1 (chart roots 2, -1, 3, -4, 7, -11, 18, -29, 47, -76, 123, -199, 322, -521, 843, -1364, 2207, -3571, 5778)

The 2 roots are :

Root(0) = 0.618033988749895
Root(1) = -1.618033988749895

Some examples

Fibonacci numbers Fn
EJS_P1P1_P1P1
Linear Recurrence Equation:
a(0)=1 a(1)=1
a(n)=1.a(n-2) + 1.a(n-1)

1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, 1597, 2584, 4181, 6765, 10946, 17711, 28657, 46368, 75025, 121393, 196418, 317811, 514229, 832040, 1346269, 2178309, 3524578, 5702887, 9227465, 14930352, 24157817, 39088169, 63245986, 102334155, 165580141, 267914296, 433494437, 701408733, 1134903170, 1836311903, 2971215073, 4807526976, 7778742049, 12586269025, 20365011074, 32951280099, 53316291173, 86267571272, 139583862445, 225851433717, 365435296162, 591286729879, 956722026041, 1548008755920, 2504730781961

\(EJSGF(x) = hidden\)

Lucas numbers Ln
EJS_P1P3_P1P1
Linear Recurrence Equation:
a(0)=1 a(1)=3
a(n)=1.a(n-2) + 1.a(n-1)

1, 3, 4, 7, 11, 18, 29, 47, 76, 123, 199, 322, 521, 843, 1364, 2207, 3571, 5778, 9349, 15127, 24476, 39603, 64079, 103682, 167761, 271443, 439204, 710647, 1149851, 1860498, 3010349, 4870847, 7881196, 12752043, 20633239, 33385282, 54018521, 87403803, 141422324, 228826127, 370248451, 599074578, 969323029, 1568397607, 2537720636, 4106118243, 6643838879, 10749957122, 17393796001, 28143753123, 45537549124, 73681302247, 119218851371, 192900153618, 312119004989, 505019158607, 817138163596, 1322157322203, 2139295485799, 3461452808002, 5600748293801

\(EJSGF(x) = hidden\)

Pell numbers Pn
EJS_P0P1_P1P2
Linear Recurrence Equation:
a(0)=0 a(1)=1
a(n)=1.a(n-2) + 2.a(n-1)

0, 1, 2, 5, 12, 29, 70, 169, 408, 985, 2378, 5741, 13860, 33461, 80782, 195025, 470832, 1136689, 2744210, 6625109, 15994428, 38613965, 93222358, 225058681, 543339720, 1311738121, 3166815962, 7645370045, 18457556052, 44560482149, 107578520350, 259717522849, 627013566048, 1513744654945, 3654502875938, 8822750406821, 21300003689580, 51422757785981, 124145519261542, 299713796309065, 723573111879672, 1746860020068409, 4217293152016490, 10181446324101389, 24580185800219268, 59341817924539925, 143263821649299118, 345869461223138161, 835002744095575440, 2015874949414289041, 4866752642924153522, 11749380235262596085, 28365513113449345692, 68480406462161287469, 165326326037771920630, 399133058537705128729, 963592443113182178088, 2326317944764069484905, 5616228332641321147898, 13558774610046711780701, 32733777552734744709300

\(EJSGF(x) = hidden\)

Pell-Lucas numbers Qn
EJS_P2P2_P1P2
Linear Recurrence Equation:
a(0)=2 a(1)=2
a(n)=1.a(n-2) + 2.a(n-1)

2, 2, 6, 14, 34, 82, 198, 478, 1154, 2786, 6726, 16238, 39202, 94642, 228486, 551614, 1331714, 3215042, 7761798, 18738638, 45239074, 109216786, 263672646, 636562078, 1536796802, 3710155682, 8957108166, 21624372014, 52205852194, 126036076402, 304278004998, 734592086398, 1773462177794, 4281516441986, 10336495061766, 24954506565518, 60245508192802, 145445522951122, 351136554095046, 847718631141214, 2046573816377474, 4940866263896162, 11928306344169798, 28797478952235758, 69523264248641314, 167844007449518386, 405211279147678086, 978266565744874558, 2361744410637427202, 5701755387019728962, 13765255184676885126, 33232265756373499214, 80229786697423883554, 193691839151221266322, 467613464999866416198, 1128918769150954098718, 2725451003301774613634, 6579820775754503325986, 15885092554810781265606, 38350005885376065857198, 92585104325562912980002

\(EJSGF(x) = hidden\)

Padovan numbers Pn
EJS_P1P1P1_P1P1P0
Linear Recurrence Equation:
a(0)=1 a(1)=1 a(2)=1
a(n)=1.a(n-3) + 1.a(n-2) + 0.a(n-1)

1, 1, 1, 2, 2, 3, 4, 5, 7, 9, 12, 16, 21, 28, 37, 49, 65, 86, 114, 151, 200, 265, 351, 465, 616, 816, 1081, 1432, 1897, 2513, 3329, 4410, 5842, 7739, 10252, 13581, 17991, 23833, 31572, 41824, 55405, 73396, 97229, 128801, 170625, 226030, 299426, 396655, 525456, 696081, 922111, 1221537, 1618192, 2143648, 2839729, 3761840, 4983377, 6601569, 8745217, 11584946, 15346786

\(EJSGF(x) = hidden\)

Perrin Fn numbers
EJS_P3P0P2_P1P1P0
Linear Recurrence Equation:
a(0)=3 a(1)=0 a(2)=2
a(n)=1.a(n-3) + 1.a(n-2) + 0.a(n-1)

3, 0, 2, 3, 2, 5, 5, 7, 10, 12, 17, 22, 29, 39, 51, 68, 90, 119, 158, 209, 277, 367, 486, 644, 853, 1130, 1497, 1983, 2627, 3480, 4610, 6107, 8090, 10717, 14197, 18807, 24914, 33004, 43721, 57918, 76725, 101639, 134643, 178364, 236282, 313007, 414646, 549289, 727653, 963935, 1276942, 1691588, 2240877, 2968530, 3932465, 5209407, 6900995, 9141872, 12110402, 16042867, 21252274

\(EJSGF(x) = hidden\)

Sequence with real numbers Pi, e, γ
EJS_P3.14159P0.5772156000000001P2.7182818_P3.14159P0.5772156000000001P2.7182818
Linear Recurrence Equation:
a(0)=3.14159 a(1)=0.5772156000000001 a(2)=2.7182818
a(n)=3.14159.a(n-3) + 0.5772156000000001.a(n-2) + 2.7182818.a(n-1)

3.14159, 0.5772156000000001, 2.7182818, 17.5918215211946001, 51.2019376868716762, 157.8752960734686318, 513.9703917419812401, 1649.0999407770219462, 5275.3695348382877314, 16906.5114495936476811, 54182.4838491411179463, 173615.0100531509316920, 556322.8242636984231880, 1782674.6497530686334581, 5712357.4479790846951659, 18304523.1249765925782012, 58654546.7529704566505316, 187951128.2591425416397494, 602265757.4372319678060892, 1929884908.0072846938274474, 6184073597.0971022409026911, 19816086464.8631892638318495, 63498158064.6031151337622361, 203471865410.9060442108528429, 652000015041.8197004613376011, 2089252087758.3566303185621993, 6694745683304.1649942302617756, 21452470971196.1986070940750348, 68741746518847.5507582098522938, 220274285456729.7845468019580597, 705841257905358.0336271588926889, 2261779582343864.7209314600595474, 7247588351931532.5875835009777898, 23223985807060737.1311871263054248, 74418343120000346.6731416416989596, 238464225681810791.7591369608179527, 764128634768579686.9933979170268979, 2448554154418101113.2068731926589512, 7846083989423960473.4611399708221923, 25141789842800103627.5661774279256918, 80563705072692490788.8402540785648157, 258156265549187864701.4196604138507474, 827229301112324002696.6025322423083447, 2650752307572403923022.6135640952219802, 8494002553647871719402.1555905148883714, 27217963434482789206162.2884309397414762, 87216542359371836065514.0112802595421125, 279474446331537185307531.7949520467428156, 895540731602121321286190.0101179619024766, 2869647699407436258796303.8412394634301362, 9195425320277956182229445.5492311009896009, 29465584516966730804638900.6746993612543300, 94418761578313296792062970.2388048578060695, 302553052455111998378389937.8300539103736717, 969493223801516840019837265.7126993723983155, 3106619164374512284154899005.5308587898444120, 9954770590985427349551733151.7425510489371567, 31898810982549471562414391900.2969004136148230, 102215729915649679228811767208.1958722607451571, 327537457364938852878058350704.3707031431630152, 1049552608640756525464508176568.8688303833571034

\(EJSGF(x) = hidden\)

A299277 - OEIS
EJS_P2P2P4P10P16P28P48P76P110P144P182_P1N3P4N4P4N4P4N4P4N4P3
Linear Recurrence Equation:
a(0)=2 a(1)=2 a(2)=4 a(3)=10 a(4)=16 a(5)=28 a(6)=48 a(7)=76 a(8)=110 a(9)=144 a(10)=182
a(n)=1.a(n-11) -3.a(n-10) + 4.a(n-9) -4.a(n-8) + 4.a(n-7) -4.a(n-6) + 4.a(n-5) -4.a(n-4) + 4.a(n-3) -4.a(n-2) + 3.a(n-1)

2, 2, 4, 10, 16, 28, 48, 76, 110, 144, 182, 222, 264, 310, 356, 408, 468, 536, 610, 684, 762, 842, 924, 1010, 1096, 1188, 1288, 1396, 1510, 1624, 1742, 1862, 1984, 2110, 2236, 2368, 2508, 2656, 2810, 2964, 3122, 3282, 3444, 3610, 3776, 3948, 4128, 4316, 4510, 4704, 4902, 5102, 5304, 5510, 5716, 5928, 6148, 6376, 6610, 6844, 7082

\(EJSGF(x) = hidden\)