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update ceph source to reef 18.1.2
[ceph.git] / ceph / src / boost / libs / math / test / bessel_k_int_data.ipp
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FG		 1// Copyright (c) 2007 John Maddock
2// Use, modification and distribution are subject to the
3// Boost Software License, Version 1.0. (See accompanying file
4// LICENSE_1_0.txt or copy at http://www.boost.org/LICENSE_1_0.txt)
1e59de90 5 static const std::array<std::array<typename table_type<T>::type, 3>, 481> bessel_k_int_data = {{
7c673cae
FG		 6 {{ SC_(0.0), SC_(0.177219114266335964202880859375e-2), SC_(0.6451475930592273598846015135698055330078e1) }},
7 {{ SC_(0.0), SC_(0.22177286446094512939453125e-2), SC_(0.6227212142001190939808570915268231760654e1) }},
8 {{ SC_(0.0), SC_(0.7444499991834163665771484375e-2), SC_(0.5016294646816679195434588077252051358532e1) }},
9 {{ SC_(0.0), SC_(0.1433600485324859619140625e-1), SC_(0.4361188048817122598222684820956136285199e1) }},
10 {{ SC_(0.0), SC_(0.1760916970670223236083984375e-1), SC_(0.4155666670689396106825982497779831275659e1) }},
11 {{ SC_(0.0), SC_(0.6152711808681488037109375e-1), SC_(0.2907904688572973437220285912023264651352e1) }},
12 {{ SC_(0.0), SC_(0.11958599090576171875e0), SC_(0.2251245456228397094716239150833833783688e1) }},
13 {{ SC_(0.0), SC_(0.15262925624847412109375e0), SC_(0.2013151217079277922721039040650374928823e1) }},
14 {{ SC_(0.0), SC_(0.408089816570281982421875e0), SC_(0.1097070466164341232251948278975330916289e1) }},
15 {{ SC_(0.0), SC_(0.6540834903717041015625e0), SC_(0.7111296101768869724219672824880816154124e0) }},
16 {{ SC_(0.0), SC_(0.1097540378570556640625e1), SC_(0.3668587200933656003255821289886727335553e0) }},
17 {{ SC_(0.0), SC_(0.30944411754608154296875e1), SC_(0.3115344887529544812621292520040581803004e-1) }},
18 {{ SC_(0.0), SC_(0.51139926910400390625e1), SC_(0.325805941096065330441380826151925706171e-2) }},
19 {{ SC_(0.0), SC_(0.95070552825927734375e1), SC_(0.2983575249299677934623174911041338567643e-4) }},
20 {{ SC_(0.0), SC_(0.24750102996826171875e2), SC_(0.4469793219985647671692938809730755521561e-11) }},
21 {{ SC_(0.0), SC_(0.637722015380859375e2), SC_(0.3154890666025357981487513910165521100024e-28) }},
22 {{ SC_(0.0), SC_(0.1252804412841796875e3), SC_(0.4365986153732310357450484955539750321993e-55) }},
23 {{ SC_(0.0), SC_(0.25554705810546875e3), SC_(0.8155212353606568575514680314443449984517e-112) }},
24 {{ SC_(0.0), SC_(0.503011474609375e3), SC_(0.1959094651632950581341362431434333187503e-219) }},
25 {{ SC_(0.0), SC_(0.10074598388671875e4), SC_(0.1153834312978712202246739136605238163053e-438) }},
26 {{ SC_(0.0), SC_(0.1185395751953125e4), SC_(0.5626632279469502957817365401058836530616e-516) }},
27 {{ SC_(0.0), SC_(0.353451806640625e4), SC_(0.2005335541692877275070776095045572408221e-1536) }},
28 {{ SC_(0.0), SC_(0.80715478515625e4), SC_(0.5198552672839385593247348234265735246569e-3507) }},
29 {{ SC_(0.0), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5238258665687646932029547633274667132227e-7050)) }},
30 {{ SC_(0.0), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.4586477351514513511787402593637142120047e-13928)) }},
31 {{ SC_(0.0), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.261839521735852199886433084148333502408e-15796)) }},
32 {{ SC_(0.1e1), SC_(0.177219114266335964202880859375e-2), SC_(0.5642670589050394493876757991354791444425e3) }},
33 {{ SC_(0.1e1), SC_(0.22177286446094512939453125e-2), SC_(0.4509043336519153776882032141395071321111e3) }},
34 {{ SC_(0.1e1), SC_(0.7444499991834163665771484375e-2), SC_(0.134306823034307382114643500755390513023e3) }},
35 {{ SC_(0.1e1), SC_(0.1433600485324859619140625e-1), SC_(0.6971959660478877278042038844910522107511e2) }},
36 {{ SC_(0.1e1), SC_(0.1760916970670223236083984375e-1), SC_(0.5674760507791176149484792894248541539452e2) }},
37 {{ SC_(0.1e1), SC_(0.6152711808681488037109375e-1), SC_(0.1614820987046735392831380358603921129883e2) }},
38 {{ SC_(0.1e1), SC_(0.11958599090576171875e0), SC_(0.8197998310985025401124448473235927713019e1) }},
39 {{ SC_(0.1e1), SC_(0.15262925624847412109375e0), SC_(0.6360645272530455596559051797225101283072e1) }},
40 {{ SC_(0.1e1), SC_(0.408089816570281982421875e0), SC_(0.2132196083017461631334167216825680193136e1) }},
41 {{ SC_(0.1e1), SC_(0.6540834903717041015625e0), SC_(0.1156576280544243110905012085298289192381e1) }},
42 {{ SC_(0.1e1), SC_(0.1097540378570556640625e1), SC_(0.5118042111815067840711185047380239515098e0) }},
43 {{ SC_(0.1e1), SC_(0.30944411754608154296875e1), SC_(0.3587084607310022256777513946093825420136e-1) }},
44 {{ SC_(0.1e1), SC_(0.51139926910400390625e1), SC_(0.3563402139499414445927612094054750431128e-2) }},
45 {{ SC_(0.1e1), SC_(0.95070552825927734375e1), SC_(0.3136737811772098452264479387949931309609e-4) }},
46 {{ SC_(0.1e1), SC_(0.24750102996826171875e2), SC_(0.4559214298385623744840433425339909113277e-11) }},
47 {{ SC_(0.1e1), SC_(0.637722015380859375e2), SC_(0.3179530807904064450989433716351000642288e-28) }},
48 {{ SC_(0.1e1), SC_(0.1252804412841796875e3), SC_(0.4383376507619551733740470932900485417799e-55) }},
49 {{ SC_(0.1e1), SC_(0.25554705810546875e3), SC_(0.8171153185119733731907215700781324087313e-112) }},
50 {{ SC_(0.1e1), SC_(0.503011474609375e3), SC_(0.1961041051464076987061687841817509806692e-219) }},
51 {{ SC_(0.1e1), SC_(0.10074598388671875e4), SC_(0.1154406816332980455168031108997781743075e-438) }},
52 {{ SC_(0.1e1), SC_(0.1185395751953125e4), SC_(0.5629005093195648507075346585433996324305e-516) }},
53 {{ SC_(0.1e1), SC_(0.353451806640625e4), SC_(0.2005619200413067947685927551685795058075e-1536) }},
54 {{ SC_(0.1e1), SC_(0.80715478515625e4), SC_(0.5198874692343800657182245260803672831532e-3507) }},
55 {{ SC_(0.1e1), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5238420046465533380647381293479454296805e-7050)) }},
56 {{ SC_(0.1e1), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.4586548866666827230215894859840049327748e-13928)) }},
57 {{ SC_(0.1e1), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2618431215775737825097728016673681678693e-15796)) }},
58 {{ SC_(0.4e1), SC_(0.177219114266335964202880859375e-2), SC_(0.4866299979081122714121229096210700191518e13) }},
59 {{ SC_(0.4e1), SC_(0.22177286446094512939453125e-2), SC_(0.1984300471606527742059001282352526315267e13) }},
60 {{ SC_(0.4e1), SC_(0.7444499991834163665771484375e-2), SC_(0.1562777308081462787649352118638441640974e11) }},
61 {{ SC_(0.4e1), SC_(0.1433600485324859619140625e-1), SC_(0.1136373878031891372753785993664350977306e10) }},
62 {{ SC_(0.4e1), SC_(0.1760916970670223236083984375e-1), SC_(0.4991999111548545244274999181282075933079e9) }},
63 {{ SC_(0.4e1), SC_(0.6152711808681488037109375e-1), SC_(0.3348404754435542940391088463548015493779e7) }},
64 {{ SC_(0.4e1), SC_(0.11958599090576171875e0), SC_(0.2344242859197388683851101586642876973144e6) }},
65 {{ SC_(0.4e1), SC_(0.15262925624847412109375e0), SC_(0.882769652248796999251835414827424137219e5) }},
66 {{ SC_(0.4e1), SC_(0.408089816570281982421875e0), SC_(0.1706913744135878990186254129470637633145e4) }},
67 {{ SC_(0.4e1), SC_(0.6540834903717041015625e0), SC_(0.2531380187689981167427802188655172652219e3) }},
68 {{ SC_(0.4e1), SC_(0.1097540378570556640625e1), SC_(0.2998821965908379171336639130797038553785e2) }},
69 {{ SC_(0.4e1), SC_(0.30944411754608154296875e1), SC_(0.2600800540545786927103321191355308119242e0) }},
70 {{ SC_(0.4e1), SC_(0.51139926910400390625e1), SC_(0.1310113816036379606520481730426498313864e-1) }},
71 {{ SC_(0.4e1), SC_(0.95070552825927734375e1), SC_(0.6590536459344845745057389826071914812742e-4) }},
72 {{ SC_(0.4e1), SC_(0.24750102996826171875e2), SC_(0.6133030556661369892325048452149519811279e-11) }},
73 {{ SC_(0.4e1), SC_(0.637722015380859375e2), SC_(0.3572958141609371155661279310848429937317e-28) }},
74 {{ SC_(0.4e1), SC_(0.1252804412841796875e3), SC_(0.4652677436708263229732006683514849916063e-55) }},
75 {{ SC_(0.4e1), SC_(0.25554705810546875e3), SC_(0.8414034107282798661333568860302936388064e-112) }},
76 {{ SC_(0.4e1), SC_(0.503011474609375e3), SC_(0.1990470027325467302112278177698801722237e-219) }},
77 {{ SC_(0.4e1), SC_(0.10074598388671875e4), SC_(0.1163028521762409349244231951145594725638e-438) }},
78 {{ SC_(0.4e1), SC_(0.1185395751953125e4), SC_(0.5664717578847921482243142747309256970705e-516) }},
79 {{ SC_(0.4e1), SC_(0.353451806640625e4), SC_(0.2009878898832100717589398352424725806132e-1536) }},
80 {{ SC_(0.4e1), SC_(0.80715478515625e4), SC_(0.5203707379166988887861124229263216602351e-3507) }},
81 {{ SC_(0.4e1), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5240841354827504548639257799260351864794e-7050)) }},
82 {{ SC_(0.4e1), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.4587621727772824151475167382626737854669e-13928)) }},
83 {{ SC_(0.4e1), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2618971251427177592957235690575280827847e-15796)) }},
84 {{ SC_(0.7e1), SC_(0.177219114266335964202880859375e-2), SC_(0.8393410852610954393527641216972580532522e24) }},
85 {{ SC_(0.7e1), SC_(0.22177286446094512939453125e-2), SC_(0.1746439477339240202017380879835593298264e24) }},
86 {{ SC_(0.7e1), SC_(0.7444499991834163665771484375e-2), SC_(0.3636325329423526419455515218262149164257e20) }},
87 {{ SC_(0.7e1), SC_(0.1433600485324859619140625e-1), SC_(0.3702642450648513536507007355077838785335e18) }},
88 {{ SC_(0.7e1), SC_(0.1760916970670223236083984375e-1), SC_(0.8776769778941284214793226696145517599417e17) }},
89 {{ SC_(0.7e1), SC_(0.6152711808681488037109375e-1), SC_(0.1380314199659804887833132363429985792775e14) }},
90 {{ SC_(0.7e1), SC_(0.11958599090576171875e0), SC_(0.1316714319257667815497187929741473396631e12) }},
91 {{ SC_(0.7e1), SC_(0.15262925624847412109375e0), SC_(0.2385758315216153945368410974902013750543e11) }},
92 {{ SC_(0.7e1), SC_(0.408089816570281982421875e0), SC_(0.2427787443092239173513776098900037902893e8) }},
93 {{ SC_(0.7e1), SC_(0.6540834903717041015625e0), SC_(0.8837961864361020779649458889083260267903e6) }},
94 {{ SC_(0.7e1), SC_(0.1097540378570556640625e1), SC_(0.2284960408772201116356019420915711713484e5) }},
95 {{ SC_(0.7e1), SC_(0.30944411754608154296875e1), SC_(0.115430121001405235617754789786436933495e2) }},
96 {{ SC_(0.7e1), SC_(0.51139926910400390625e1), SC_(0.1855200551723818627257578663296940991293e0) }},
97 {{ SC_(0.7e1), SC_(0.95070552825927734375e1), SC_(0.3209697242000963916775210833432692821492e-3) }},
98 {{ SC_(0.7e1), SC_(0.24750102996826171875e2), SC_(0.117317638217852819641984018466983384411e-10) }},
99 {{ SC_(0.7e1), SC_(0.637722015380859375e2), SC_(0.4617273805283495366784436206553361766215e-28) }},
100 {{ SC_(0.7e1), SC_(0.1252804412841796875e3), SC_(0.530463977506128210095346164740795780716e-55) }},
101 {{ SC_(0.7e1), SC_(0.25554705810546875e3), SC_(0.8974052085234798283338593957917220800683e-112) }},
102 {{ SC_(0.7e1), SC_(0.503011474609375e3), SC_(0.2056776608251995281157685677374180807283e-219) }},
103 {{ SC_(0.7e1), SC_(0.10074598388671875e4), SC_(0.1182223532524629470705848948269762593562e-438) }},
104 {{ SC_(0.7e1), SC_(0.1185395751953125e4), SC_(0.5744084382473215145583083888149374566061e-516) }},
105 {{ SC_(0.7e1), SC_(0.353451806640625e4), SC_(0.2019282105175847423689110847031244713335e-1536) }},
106 {{ SC_(0.7e1), SC_(0.80715478515625e4), SC_(0.5214355108270690028322792158847712991209e-3507) }},
107 {{ SC_(0.7e1), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5246172173384328966498809821165883204056e-7050)) }},
108 {{ SC_(0.7e1), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.4589982905651508483373540209643329865296e-13928)) }},
109 {{ SC_(0.7e1), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.262015972194351617452666405333559675244e-15796)) }},
110 {{ SC_(0.1e2), SC_(0.7444499991834163665771484375e-2), SC_(0.3553669112260589679559369394169552207558e30) }},
111 {{ SC_(0.1e2), SC_(0.1433600485324859619140625e-1), SC_(0.5066979194966296085342168261220876180382e27) }},
112 {{ SC_(0.1e2), SC_(0.1760916970670223236083984375e-1), SC_(0.6480976752277127998631768393896823291736e26) }},
113 {{ SC_(0.1e2), SC_(0.6152711808681488037109375e-1), SC_(0.2389580098055959485819366060615251558358e21) }},
114 {{ SC_(0.1e2), SC_(0.11958599090576171875e0), SC_(0.3104970025126176531421165865660207446979e18) }},
115 {{ SC_(0.1e2), SC_(0.15262925624847412109375e0), SC_(0.2706288504370378982033987546887060486023e17) }},
116 {{ SC_(0.1e2), SC_(0.408089816570281982421875e0), SC_(0.1443666691816396300812633872636237266303e13) }},
117 {{ SC_(0.1e2), SC_(0.6540834903717041015625e0), SC_(0.1280984206792023020920423547804293082128e11) }},
118 {{ SC_(0.1e2), SC_(0.1097540378570556640625e1), SC_(0.7084777398701569213628979833632335112045e8) }},
119 {{ SC_(0.1e2), SC_(0.30944411754608154296875e1), SC_(0.1776330561989790884945591902602612974108e4) }},
120 {{ SC_(0.1e2), SC_(0.51139926910400390625e1), SC_(0.7561612211922255925715297223843141543753e1) }},
121 {{ SC_(0.1e2), SC_(0.95070552825927734375e1), SC_(0.3312175747188703924731868316016670207045e-2) }},
122 {{ SC_(0.1e2), SC_(0.24750102996826171875e2), SC_(0.316549186060196510142326275566270329916e-10) }},
123 {{ SC_(0.1e2), SC_(0.637722015380859375e2), SC_(0.6858066547220214894850727219918188844372e-28) }},
124 {{ SC_(0.1e2), SC_(0.1252804412841796875e3), SC_(0.6495845884366965264198113958373840112253e-55) }},
125 {{ SC_(0.1e2), SC_(0.25554705810546875e3), SC_(0.991362504515590864892065541409133961701e-112) }},
126 {{ SC_(0.1e2), SC_(0.503011474609375e3), SC_(0.2163618208760250177914928622296114388901e-219) }},
127 {{ SC_(0.1e2), SC_(0.10074598388671875e4), SC_(0.1212513333490346230839551955991649038227e-438) }},
128 {{ SC_(0.1e2), SC_(0.1185395751953125e4), SC_(0.586893431857951347227749283812742380563e-516) }},
129 {{ SC_(0.1e2), SC_(0.353451806640625e4), SC_(0.2033900929893989288120221591878316666532e-1536) }},
130 {{ SC_(0.1e2), SC_(0.80715478515625e4), SC_(0.5230853557909669671253778230080315788384e-3507) }},
131 {{ SC_(0.1e2), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5254421378336957273402254351232818867248e-7050)) }},
132 {{ SC_(0.1e2), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.4593634389285012411677313330998673022044e-13928)) }},
133 {{ SC_(0.1e2), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2621997509993104596265028007664067440518e-15796)) }},
134 {{ SC_(0.13e2), SC_(0.6152711808681488037109375e-1), SC_(0.1083420896102934209934115685271226154021e29) }},
135 {{ SC_(0.13e2), SC_(0.11958599090576171875e0), SC_(0.1917447750081714212558490604491870597354e25) }},
136 {{ SC_(0.13e2), SC_(0.15262925624847412109375e0), SC_(0.8038868021916654814587066747745710652867e23) }},
137 {{ SC_(0.13e2), SC_(0.408089816570281982421875e0), SC_(0.2245771182455599861571897956512030500912e18) }},
138 {{ SC_(0.13e2), SC_(0.6540834903717041015625e0), SC_(0.4848374582394250306716955498456616638777e15) }},
139 {{ SC_(0.13e2), SC_(0.1097540378570556640625e1), SC_(0.5706157799443050405365640850248281332472e12) }},
140 {{ SC_(0.13e2), SC_(0.30944411754608154296875e1), SC_(0.6749251426431234386462977211680293326467e6) }},
141 {{ SC_(0.13e2), SC_(0.51139926910400390625e1), SC_(0.7041501258795245542680641070543745293868e3) }},
142 {{ SC_(0.13e2), SC_(0.95070552825927734375e1), SC_(0.6566785551862389851044830988879804923294e-1) }},
143 {{ SC_(0.13e2), SC_(0.24750102996826171875e2), SC_(0.1190989352639552376096560578530599056113e-9) }},
144 {{ SC_(0.13e2), SC_(0.637722015380859375e2), SC_(0.1169819866439623248151687788769924240322e-27) }},
145 {{ SC_(0.13e2), SC_(0.1252804412841796875e3), SC_(0.8542662489314492939710880476555839775162e-55) }},
146 {{ SC_(0.13e2), SC_(0.25554705810546875e3), SC_(0.113430562248402032364671459657614723877e-111) }},
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439 {{ SC_(0.76e2), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.625845673025821801704758202141407507098e-7050)) }},
440 {{ SC_(0.76e2), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5018717578209518619159368787008041682897e-13928)) }},
441 {{ SC_(0.76e2), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2834799123178316316921082908434236819708e-15796)) }},
442 {{ SC_(0.79e2), SC_(0.24750102996826171875e2), SC_(0.3977450254611439907015094861072686143365e28) }},
443 {{ SC_(0.79e2), SC_(0.637722015380859375e2), SC_(0.5045557998916834451345285819041530054045e-9) }},
444 {{ SC_(0.79e2), SC_(0.1252804412841796875e3), SC_(0.1257398100175037281002031105345426585638e-44) }},
445 {{ SC_(0.79e2), SC_(0.25554705810546875e3), SC_(0.1457761666527355876308418609616580684983e-106) }},
446 {{ SC_(0.79e2), SC_(0.503011474609375e3), SC_(0.9508736439729252372797046089858665696247e-217) }},
447 {{ SC_(0.79e2), SC_(0.10074598388671875e4), SC_(0.2546664153931547063082509241536182642882e-437) }},
448 {{ SC_(0.79e2), SC_(0.1185395751953125e4), SC_(0.7809182105858958259760323416560481270815e-515) }},
449 {{ SC_(0.79e2), SC_(0.353451806640625e4), SC_(0.4847747575121366789595217747585489900848e-1536) }},
450 {{ SC_(0.79e2), SC_(0.80715478515625e4), SC_(0.7651931736233482793339884190747843802592e-3507) }},
451 {{ SC_(0.79e2), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.634875744436278296417277623731115109911e-7050)) }},
452 {{ SC_(0.79e2), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5055238025936264849903127242851811532009e-13928)) }},
453 {{ SC_(0.79e2), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2852979759332925163346706705764848988845e-15796)) }},
454 {{ SC_(0.82e2), SC_(0.637722015380859375e2), SC_(0.1182479183003843898967122682220895379283e-7) }},
455 {{ SC_(0.82e2), SC_(0.1252804412841796875e3), SC_(0.7679246824874028855732984729868233341459e-44) }},
456 {{ SC_(0.82e2), SC_(0.25554705810546875e3), SC_(0.3688731597877386657104803215785579078246e-106) }},
457 {{ SC_(0.82e2), SC_(0.503011474609375e3), SC_(0.1533025263190811001855129953690241988217e-216) }},
458 {{ SC_(0.82e2), SC_(0.10074598388671875e4), SC_(0.3235306253457630283328305165089298636569e-437) }},
459 {{ SC_(0.82e2), SC_(0.1185395751953125e4), SC_(0.95714803641107768131549467236444623187e-515) }},
460 {{ SC_(0.82e2), SC_(0.353451806640625e4), SC_(0.5190472642970221025902053308995793605448e-1536) }},
461 {{ SC_(0.82e2), SC_(0.80715478515625e4), SC_(0.7884317762303207970574981219562166816935e-3507) }},
462 {{ SC_(0.82e2), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.6443933438399520983914837847908697932304e-7050)) }},
463 {{ SC_(0.82e2), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5093453575580057440764704712908558993787e-13928)) }},
464 {{ SC_(0.82e2), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2871987628027187822900488209818201448873e-15796)) }},
465 {{ SC_(0.85e2), SC_(0.637722015380859375e2), SC_(0.3022386458998828808890958658069437125556e-6) }},
466 {{ SC_(0.85e2), SC_(0.1252804412841796875e3), SC_(0.4980051147455231361906632503761840466974e-43) }},
467 {{ SC_(0.85e2), SC_(0.25554705810546875e3), SC_(0.9651821409596944246819658023453058852567e-106) }},
468 {{ SC_(0.85e2), SC_(0.503011474609375e3), SC_(0.2515578850121789395121409417066593310199e-216) }},
469 {{ SC_(0.85e2), SC_(0.10074598388671875e4), SC_(0.4146905619633520795687290702797802077516e-437) }},
470 {{ SC_(0.85e2), SC_(0.1185395751953125e4), SC_(0.1182063426653318577358697854155415902088e-514) }},
471 {{ SC_(0.85e2), SC_(0.353451806640625e4), SC_(0.5571590796064834896786127413958385484532e-1536) }},
472 {{ SC_(0.85e2), SC_(0.80715478515625e4), SC_(0.8132823498430510533405211338608503625054e-3507) }},
473 {{ SC_(0.85e2), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.6544164172431353956246831844735505709742e-7050)) }},
474 {{ SC_(0.85e2), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5133398576643193156132512241768029727037e-13928)) }},
475 {{ SC_(0.85e2), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2891837680670311977658996166762631480513e-15796)) }},
476 {{ SC_(0.88e2), SC_(0.637722015380859375e2), SC_(0.8408884745537773166223428345981835442608e-5) }},
477 {{ SC_(0.88e2), SC_(0.1252804412841796875e3), SC_(0.3427163660301187722220573043617848517407e-42) }},
478 {{ SC_(0.88e2), SC_(0.25554705810546875e3), SC_(0.2611158848229128475717621937789423053511e-105) }},
479 {{ SC_(0.88e2), SC_(0.503011474609375e3), SC_(0.4201277178177965425183058418537562017403e-216) }},
480 {{ SC_(0.88e2), SC_(0.10074598388671875e4), SC_(0.5362866581825708379523263981965145477407e-437) }},
481 {{ SC_(0.88e2), SC_(0.1185395751953125e4), SC_(0.1470923110114575284128795225669870357461e-514) }},
482 {{ SC_(0.88e2), SC_(0.353451806640625e4), SC_(0.5995934685429881061512313674772217021537e-1536) }},
483 {{ SC_(0.88e2), SC_(0.80715478515625e4), SC_(0.839852015080128730529999326058629197173e-3507) }},
484 {{ SC_(0.88e2), SC_(0.1622925e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.664964032329384431282211022073156371507e-7050)) }},
485 {{ SC_(0.88e2), SC_(0.3206622265625e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.5175109105174760942763088943597648303892e-13928)) }},
486 {{ SC_(0.88e2), SC_(0.3636794921875e5), SC_(BOOST_MATH_SMALL_CONSTANT(0.2912545597593180629046239733714231938561e-15796)) }}
487 }};
488
489
Ceph