
 ----====== HUGE_FLOAT ver 0.97 (18-april-1997) ======---- 
    author: Joerg Arndt, email: arndt@spektracom.de 
    homepage: http://www.spektracom.de/~arndt/hfloat/ 
    (check my homepage for the latest version of hfloat) 
  use --help for usage 
 hfloat_set_radix(): radix set to 10000
 hfloat_set_default_precision(): precision set to 1024 LIMBs =4096 decimal digits 
 set mul_convolution to FHT_CNVL
 set sqr_convolution to FHT_AUTO_CNVL
 hfloat_set_default_precision(): precision set to 512 LIMBs =2048 decimal digits 
 hfloat_set_radix(): radix set to 10000
pi=+.31415926535897932384626433832795028841971693993751058209749445923078164062862089986280348253421170679821480865132823066470938*10^1
 continued fraction: 
3, 
7, 15, 1, 292, 1, 1, 1, 2, 1, 3, 
1, 14, 2, 1, 1, 2, 2, 2, 2, 1, 
84, 2, 1, 1, 15, 3, 13, 1, 4, 2, 
6, 6, 99, 1, 2, 2, 6, 3, 5, 1, 
1, 6, 8, 1, 7, 1, 2, 3, 7, 1, 
2, 1, 1, 12, 1, 1, 1, 3, 1, 1, 
8, 1, 1, 2, 1, 6, 1, 1, 5, 2, 
2, 3, 1, 2, 4, 4, 16, 1, 161, 45, 
1, 22, 1, 2, 2, 1, 4, 1, 2, 24, 
1, 2, 1, 3, 1, 2, 1, 1, 10, 
t-pi=+.248135248635433715633510517862617856147885742511546035510422753660346162325825263474722970648284868726445962476488793621581161*10^-102
1: 
 p[k]= +.22000000000000000000000000000000000000000000000000000000000000*10^2
 q[k]= +.7000000000000000000000000000000000000000000000000000000000000*10^1
 p/q-x= +.1264489267*10^-2
 (p/q-x) * (sqrt(5)*q^2)= +.138546713972*10^0
2: 
 p[k]= +.333000000000000000000000000000000000000000000000000000000000000*10^3
 q[k]= +.106000000000000000000000000000000000000000000000000000000000000*10^3
 p/q-x= -.832196275290*10^-4
 (p/q-x) * (sqrt(5)*q^2)= -.209084818*10^1
3: 
 p[k]= +.355000000000000000000000000000000000000000000000000000000000000*10^3
 q[k]= +.113000000000000000000000000000000000000000000000000000000000000*10^3
 p/q-x= +.2667641890*10^-6
 (p/q-x) * (sqrt(5)*q^2)= +.7616745028*10^-2
4: 
 p[k]= +.10399300000000000000000000000000000000000000000000000000000000*10^6
 q[k]= +.3310200000000000000000000000000000000000000000000000000000000*10^5
 p/q-x= -.57789063439*10^-9
 (p/q-x) * (sqrt(5)*q^2)= -.141592133*10^1
5: 
 p[k]= +.10434800000000000000000000000000000000000000000000000000000000*10^6
 q[k]= +.3321500000000000000000000000000000000000000000000000000000000*10^5
 p/q-x= +.33162780624*10^-9
 (p/q-x) * (sqrt(5)*q^2)= +.818096347582*10^0
6: 
 p[k]= +.20834100000000000000000000000000000000000000000000000000000000*10^6
 q[k]= +.6631700000000000000000000000000000000000000000000000000000000*10^5
 p/q-x= -.12235653294*10^-9
 (p/q-x) * (sqrt(5)*q^2)= -.120326672*10^1
7: 
 p[k]= +.31268900000000000000000000000000000000000000000000000000000000*10^6
 q[k]= +.9953200000000000000000000000000000000000000000000000000000000*10^5
 p/q-x= +.2914338493*10^-10
 (p/q-x) * (sqrt(5)*q^2)= +.645580578328*10^0
8: 
 p[k]= +.83371900000000000000000000000000000000000000000000000000000000*10^6
 q[k]= +.26538100000000000000000000000000000000000000000000000000000000*10^6
 p/q-x= -.871546725*10^-11
 (p/q-x) * (sqrt(5)*q^2)= -.137250940*10^1
9: 
 p[k]= +.114640800000000000000000000000000000000000000000000000000000000*10^7
 q[k]= +.36491300000000000000000000000000000000000000000000000000000000*10^6
 p/q-x= +.161074001*10^-11
 (p/q-x) * (sqrt(5)*q^2)= +.479610985449*10^0
10: 
 p[k]= +.427294300000000000000000000000000000000000000000000000000000000*10^7
 q[k]= +.136012000000000000000000000000000000000000000000000000000000000*10^7
 p/q-x= -.404066918956*10^-12
 (p/q-x) * (sqrt(5)*q^2)= -.167144754*10^1
11: 
 p[k]= +.541935100000000000000000000000000000000000000000000000000000000*10^7
 q[k]= +.172503300000000000000000000000000000000000000000000000000000000*10^7
 p/q-x= +.22144779300*10^-13
 (p/q-x) * (sqrt(5)*q^2)= +.147350350651*10^0
12: 
 p[k]= +.8014385700000000000000000000000000000000000000000000000000000000*10^8
 q[k]= +.2551058200000000000000000000000000000000000000000000000000000000*10^8
 p/q-x= -.579087016*10^-15
 (p/q-x) * (sqrt(5)*q^2)= -.842693343662*10^0
13: 
 p[k]= +.1657070650000000000000000000000000000000000000000000000000000*10^9
 q[k]= +.5274619700000000000000000000000000000000000000000000000000000000*10^8
 p/q-x= +.164083515*10^-15
 (p/q-x) * (sqrt(5)*q^2)= +.102078025*10^1
14: 
 p[k]= +.2458509220000000000000000000000000000000000000000000000000000*10^9
 q[k]= +.7825677900000000000000000000000000000000000000000000000000000000*10^8
 p/q-x= -.781793661990*10^-16
 (p/q-x) * (sqrt(5)*q^2)= -.107058482*10^1
15: 
 p[k]= +.4115579870000000000000000000000000000000000000000000000000000*10^9
 q[k]= +.1310029760000000000000000000000000000000000000000000000000000*10^9
 p/q-x= +.193638047731*10^-16
 (p/q-x) * (sqrt(5)*q^2)= +.743084189340*10^0
16: 
 p[k]= +.10689668960000000000000000000000000000000000000000000000000000*10^10
 q[k]= +.3402627310000000000000000000000000000000000000000000000000000*10^9
 p/q-x= -.30700784537*10^-17
 (p/q-x) * (sqrt(5)*q^2)= -.794809853742*10^0
17: 
 p[k]= +.25494917790000000000000000000000000000000000000000000000000000*10^10
 q[k]= +.8115284380000000000000000000000000000000000000000000000000000*10^9
 p/q-x= +.5513663759*10^-18
 (p/q-x) * (sqrt(5)*q^2)= +.811956506810*10^0
18: 
 p[k]= +.61679504540000000000000000000000000000000000000000000000000000*10^10
 q[k]= +.19633196070000000000000000000000000000000000000000000000000000*10^10
 p/q-x= -.762658768*10^-19
 (p/q-x) * (sqrt(5)*q^2)= -.657350924000*10^0
19: 
 p[k]= +.148853926870000000000000000000000000000000000000000000000000000*10^11
 q[k]= +.47381676520000000000000000000000000000000000000000000000000000*10^10
 p/q-x= +.312316747*10^-19
 (p/q-x) * (sqrt(5)*q^2)= +.156783776*10^1
20: 
 p[k]= +.210533431410000000000000000000000000000000000000000000000000000*10^11
 q[k]= +.67014872590000000000000000000000000000000000000000000000000000*10^10
 p/q-x= -.26164050463*10^-21
 (p/q-x) * (sqrt(5)*q^2)= -.26274373709*10^-1
21: 
 p[k]= +.1783366216531000000000000000000000000000000000000000000000000*10^13
 q[k]= +.5676630974080000000000000000000000000000000000000000000000000000*10^12
 p/q-x= +.122774977*10^-23
 (p/q-x) * (sqrt(5)*q^2)= +.884659592484*10^0
22: 
 p[k]= +.3587785776203000000000000000000000000000000000000000000000000*10^13
 q[k]= +.1142027682075000000000000000000000000000000000000000000000000*10^13
 p/q-x= -.314776981445*10^-24
 (p/q-x) * (sqrt(5)*q^2)= -.917996934009*10^0
23: 
 p[k]= +.5371151992734000000000000000000000000000000000000000000000000*10^13
 q[k]= +.1709690779483000000000000000000000000000000000000000000000000*10^13
 p/q-x= +.197383186734*10^-24
 (p/q-x) * (sqrt(5)*q^2)= +.129012056*10^1
24: 
 p[k]= +.8958937768937000000000000000000000000000000000000000000000000*10^13
 q[k]= +.2851718461558000000000000000000000000000000000000000000000000*10^13
 p/q-x= -.7721593980*10^-26
 (p/q-x) * (sqrt(5)*q^2)= -.140412333912*10^0
25: 
 p[k]= +.139755218526789000000000000000000000000000000000000000000000000*10^15
 q[k]= +.44485467702853000000000000000000000000000000000000000000000000*10^14
 p/q-x= +.161109530*10^-27
 (p/q-x) * (sqrt(5)*q^2)= +.712922883784*10^0
26: 
 p[k]= +.428224593349304000000000000000000000000000000000000000000000000*10^15
 q[k]= +.136308121570117000000000000000000000000000000000000000000000000*10^15
 p/q-x= -.38054497280*10^-29
 (p/q-x) * (sqrt(5)*q^2)= -.158100941826*10^0
27: 
 p[k]= +.5706674932067741000000000000000000000000000000000000000000000000*10^16
 q[k]= +.1816491048114374000000000000000000000000000000000000000000000000*10^16
 p/q-x= +.2332819899*10^-30
 (p/q-x) * (sqrt(5)*q^2)= +.172120554*10^1
28: 
 p[k]= +.6134899525417045000000000000000000000000000000000000000000000000*10^16
 q[k]= +.1952799169684491000000000000000000000000000000000000000000000000*10^16
 p/q-x= -.486271497*10^-31
 (p/q-x) * (sqrt(5)*q^2)= -.414647432251*10^0
29: 
 p[k]= +.3024627303373592100000000000000000000000000000000000000000000*10^17
 q[k]= +.9627687726852338000000000000000000000000000000000000000000000000*10^16
 p/q-x= +.456167845010*10^-32
 (p/q-x) * (sqrt(5)*q^2)= +.945482864067*10^0
30: 
 p[k]= +.6662744559288888700000000000000000000000000000000000000000000*10^17
 q[k]= +.2120817462338916700000000000000000000000000000000000000000000*10^17
 p/q-x= -.33582458540*10^-33
 (p/q-x) * (sqrt(5)*q^2)= -.337756776136*10^0
31: 
 p[k]= +.43001094659106924300000000000000000000000000000000000000000000*10^18
 q[k]= +.13687673546718734000000000000000000000000000000000000000000000*10^18
 p/q-x= +.865784037*10^-35
 (p/q-x) * (sqrt(5)*q^2)= +.362705260293*10^0
32: 
 p[k]= +.264669312513930434500000000000000000000000000000000000000000000*10^19
 q[k]= +.84246858742651320700000000000000000000000000000000000000000000*10^18
 p/q-x= -.14107215358*10^-37
 (p/q-x) * (sqrt(5)*q^2)= -.22388950266*10^-1
33: 
 p[k]= +.2624526303353821993980000000000000000000000000000000000000000*10^21
 q[k]= +.8354126689069199483300000000000000000000000000000000000000000000*10^20
 p/q-x= +.101186322*10^-39
 (p/q-x) * (sqrt(5)*q^2)= +.157909743*10^1
34: 
 p[k]= +.2650993234605215037430000000000000000000000000000000000000000*10^21
 q[k]= +.8438373547811850804000000000000000000000000000000000000000000000*10^20
 p/q-x= -.406672232057*10^-40
 (p/q-x) * (sqrt(5)*q^2)= -.647510797717*10^0
35: 
 p[k]= +.7926512772564252068840000000000000000000000000000000000000000*10^21
 q[k]= +.2523087378469290109130000000000000000000000000000000000000000*10^21
 p/q-x= +.63015224624*10^-41
 (p/q-x) * (sqrt(5)*q^2)= +.897005431983*10^0
36: 
 p[k]= +.18504018779733719175110000000000000000000000000000000000000000*10^22
 q[k]= +.5890012111719765298660000000000000000000000000000000000000000*10^21
 p/q-x= -.4274929199*10^-42
 (p/q-x) * (sqrt(5)*q^2)= -.331624267917*10^0
37: 
 p[k]= +.118950625450966567119500000000000000000000000000000000000000000*10^23
 q[k]= +.37863160048787881901090000000000000000000000000000000000000000*10^22
 p/q-x= +.209084749*10^-43
 (p/q-x) * (sqrt(5)*q^2)= +.670256560143*10^0
38: 
 p[k]= +.375355895132633420533610000000000000000000000000000000000000000*10^23
 q[k]= +.119479492258083411001930000000000000000000000000000000000000000*10^23
 p/q-x= -.119648714550*10^-44
 (p/q-x) * (sqrt(5)*q^2)= -.381926485062*10^0
39: 
 p[k]= +.1995730101114133669787550000000000000000000000000000000000000000*10^24
 q[k]= +.635260621339204936910740000000000000000000000000000000000000000*10^23
 p/q-x= +.12102520980*10^-45
 (p/q-x) * (sqrt(5)*q^2)= +.109210580*10^1
40: 
 p[k]= +.2371085996246767090321160000000000000000000000000000000000000000*10^24
 q[k]= +.754740113597288347912670000000000000000000000000000000000000000*10^23
 p/q-x= -.8754420955*10^-46
 (p/q-x) * (sqrt(5)*q^2)= -.111508325*10^1
41: 
 p[k]= +.4366816097360900760108710000000000000000000000000000000000000000*10^24
 q[k]= +.1390000734936493284823410000000000000000000000000000000000000000*10^24
 p/q-x= +.777655942*10^-47
 (p/q-x) * (sqrt(5)*q^2)= +.335971591732*10^0
42: 
 p[k]= +.2857198258041217165097342000000000000000000000000000000000000*10^25
 q[k]= +.9094744523216248056853130000000000000000000000000000000000000000*10^24
 p/q-x= -.133768108260*10^-48
 (p/q-x) * (sqrt(5)*q^2)= -.247410766905*10^0
43: 
 p[k]= +.23294267674065827396789607000000000000000000000000000000000000*10^26
 q[k]= +.7414795692066647773964845000000000000000000000000000000000000*10^25
 p/q-x= +.14521359726*10^-49
 (p/q-x) * (sqrt(5)*q^2)= +.178521556*10^1
44: 
 p[k]= +.26151465932107044561886949000000000000000000000000000000000000*10^26
 q[k]= +.8324270144388272579650158000000000000000000000000000000000000*10^25
 p/q-x= -.1680118642*10^-50
 (p/q-x) * (sqrt(5)*q^2)= -.260325843653*10^0
45: 
 p[k]= +.206354529198815139329998250000000000000000000000000000000000000*10^27
 q[k]= +.65684686702784555831515951000000000000000000000000000000000000*10^26
 p/q-x= +.148780268*10^-51
 (p/q-x) * (sqrt(5)*q^2)= +.143535262*10^1
46: 
 p[k]= +.232505995130922183891885199000000000000000000000000000000000000*10^27
 q[k]= +.74008956847172828411166109000000000000000000000000000000000000*10^26
 p/q-x= -.569279218736*10^-52
 (p/q-x) * (sqrt(5)*q^2)= -.697234548098*10^0
47: 
 p[k]= +.671366519460659507113768648000000000000000000000000000000000000*10^27
 q[k]= +.213702600397130212653848169000000000000000000000000000000000000*10^27
 p/q-x= +.62995635724*10^-53
 (p/q-x) * (sqrt(5)*q^2)= +.643302262487*10^0
48: 
 p[k]= +.2246605553512900705233191143000000000000000000000000000000000000*10^28
 q[k]= +.715116758038563466372710616000000000000000000000000000000000000*10^27
 p/q-x= -.2439836026*10^-54
 (p/q-x) * (sqrt(5)*q^2)= -.278997012458*10^0
49: 
 p[k]= +.1639760539405096444374610664900000000000000000000000000000000*10^29
 q[k]= +.5219519906667074477262822481000000000000000000000000000000000000*10^28
 p/q-x= +.239285946*10^-55
 (p/q-x) * (sqrt(5)*q^2)= +.145768374*10^1
50: 
 p[k]= +.1864421094756386514897929779200000000000000000000000000000000*10^29
 q[k]= +.5934636664705637943635533097000000000000000000000000000000000000*10^28
 p/q-x= -.835451091925*10^-56
 (p/q-x) * (sqrt(5)*q^2)= -.657952140090*10^0
51: 
 p[k]= +.5368602728917869474170470223300000000000000000000000000000000*10^29
 q[k]= +.1708879323607835036453388867500000000000000000000000000000000*10^29
 p/q-x= +.150588763905*10^-56
 (p/q-x) * (sqrt(5)*q^2)= +.983332426687*10^0
52: 
 p[k]= +.7233023823674255989068400002500000000000000000000000000000000*10^29
 q[k]= +.2302342990078398830816942177200000000000000000000000000000000*10^29
 p/q-x= -.103577896166*10^-56
 (p/q-x) * (sqrt(5)*q^2)= -.122769965*10^1
53: 
 p[k]= +.12601626552592125463238870225800000000000000000000000000000000*10^30
 q[k]= +.4011222313686233867270331044700000000000000000000000000000000*10^29
 p/q-x= +.4703349843*10^-58
 (p/q-x) * (sqrt(5)*q^2)= +.169217685543*10^0
54: 
 p[k]= +.158452542454779761547934842712100000000000000000000000000000000*10^31
 q[k]= +.50437010754313205238060914713600000000000000000000000000000000*10^30
 p/q-x= -.239460287*10^-59
 (p/q-x) * (sqrt(5)*q^2)= -.136212567*10^1
55: 
 p[k]= +.171054169007371887011173712937900000000000000000000000000000000*10^31
 q[k]= +.54448233067999439105331245758300000000000000000000000000000000*10^30
 p/q-x= +.124678440*10^-59
 (p/q-x) * (sqrt(5)*q^2)= +.826502066582*10^0
56: 
 p[k]= +.329506711462151648559108555650000000000000000000000000000000000*10^31
 q[k]= +.104885243822312644343392160471900000000000000000000000000000000*10^31
 p/q-x= -.504278782697*10^-60
 (p/q-x) * (sqrt(5)*q^2)= -.124046490*10^1
57: 
 p[k]= +.500560880469523535570282268587900000000000000000000000000000000*10^31
 q[k]= +.159333476890312083448723406230200000000000000000000000000000000*10^31
 p/q-x= +.94103291288*10^-61
 (p/q-x) * (sqrt(5)*q^2)= +.534199997683*10^0
58: 
 p[k]= +.1831189352870722255269955361413700000000000000000000000000000000*10^32
 q[k]= +.582885674493248894689562379162500000000000000000000000000000000*10^31
 p/q-x= -.13570395808*10^-61
 (p/q-x) * (sqrt(5)*q^2)= -.103096585*10^1
59: 
 p[k]= +.2331750233340245790840237630001600000000000000000000000000000000*10^32
 q[k]= +.742219151383560978138285785392700000000000000000000000000000000*10^31
 p/q-x= +.9544101982*10^-62
 (p/q-x) * (sqrt(5)*q^2)= +.117566715*10^1
60: 
 p[k]= +.4162939586210968046110192991415300000000000000000000000000000000*10^32
 q[k]= +.1325104825876809872827848164555200000000000000000000000000000000*10^32
 p/q-x= -.623478251*10^-63
 (p/q-x) * (sqrt(5)*q^2)= -.244797389563*10^0
61: 
 p[k]= +.3563526692302799015972178156132400000000000000000000000000000*10^33
 q[k]= +.1134305775839803996076107110183430000000000000000000000000000*10^33
 p/q-x= +.418249614130*10^-64
 (p/q-x) * (sqrt(5)*q^2)= +.120331917*10^1
62: 
 p[k]= +.3979820650923895820583197455273930000000000000000000000000000*10^33
 q[k]= +.1266816258427484983358891926638950000000000000000000000000000*10^33
 p/q-x= -.277665434678*10^-64
 (p/q-x) * (sqrt(5)*q^2)= -.996400826100*10^0
63: 
 p[k]= +.7543347343226694836555375611406330000000000000000000000000000*10^33
 q[k]= +.2401122034267288979434999036822380000000000000000000000000000*10^33
 p/q-x= +.51089392478*10^-65
 (p/q-x) * (sqrt(5)*q^2)= +.658634092066*10^0
64: 
 p[k]= +.19066515337377285493693948678086590000000000000000000000000000*10^34
 q[k]= +.6069060326962062942228890000283710000000000000000000000000000*10^33
 p/q-x= -.17532756197*10^-65
 (p/q-x) * (sqrt(5)*q^2)= -.144403628*10^1
65: 
 p[k]= +.26609862680603980330249324289492920000000000000000000000000000*10^34
 q[k]= +.8470182361229351921663889037106090000000000000000000000000000*10^33
 p/q-x= +.1920207882*10^-66
 (p/q-x) * (sqrt(5)*q^2)= +.308048268340*10^0
66: 
 p[k]= +.178725691421001167475189894415044110000000000000000000000000000*10^35
 q[k]= +.56890154494338174472212224222920250000000000000000000000000000*10^34
 p/q-x= -.155040700*10^-67
 (p/q-x) * (sqrt(5)*q^2)= -.112203124*10^1
67: 
 p[k]= +.205335554101605147805439218704537030000000000000000000000000000*10^35
 q[k]= +.65360336855567526393876113260026340000000000000000000000000000*10^34
 p/q-x= +.113895091*10^-67
 (p/q-x) * (sqrt(5)*q^2)= +.108797413*10^1
68: 
 p[k]= +.384061245522606315280629113119581140000000000000000000000000000*10^35
 q[k]= +.122250491349905700866088337482946590000000000000000000000000000*10^35
 p/q-x= -.112561339508*10^-68
 (p/q-x) * (sqrt(5)*q^2)= -.376162485568*10^0
69: 
 p[k]= +.2125641781714636724208584784302442730000000000000000000000000000*10^36
 q[k]= +.676612793605096030724317800674759290000000000000000000000000000*10^35
 p/q-x= +.8333894819*10^-70
 (p/q-x) * (sqrt(5)*q^2)= +.853126491142*10^0
70: 
 p[k]= +.4635344808951879763697798681724466600000000000000000000000000000*10^36
 q[k]= +.1475476078560097762314723938832465170000000000000000000000000000*10^36
 p/q-x= -.1682873336*10^-70
 (p/q-x) * (sqrt(5)*q^2)= -.819220435318*10^0
71: 
 p[k]= +.1139633139961839625160418214775137593000000000000000000000000*10^37
 q[k]= +.3627564950725291555353765678339689630000000000000000000000000000*10^36
 p/q-x= +.185452545*10^-71
 (p/q-x) * (sqrt(5)*q^2)= +.545692764685*10^0
72: 
 p[k]= +.3882433900780706851851034512497859439000000000000000000000000*10^37
 q[k]= +.1235817093073597242837602097385153406000000000000000000000000*10^37
 p/q-x= -.376120292687*10^-72
 (p/q-x) * (sqrt(5)*q^2)= -.128445875*10^1
73: 
 p[k]= +.5022067040742546477011452727272997032000000000000000000000000*10^37
 q[k]= +.1598573588146126398372978665219122369000000000000000000000000*10^37
 p/q-x= +.130069250102*10^-72
 (p/q-x) * (sqrt(5)*q^2)= +.743232864178*10^0
74: 
 p[k]= +.13926567982265799805873939967043853503000000000000000000000000*10^38
 q[k]= +.4432964269365850039583559427823398144000000000000000000000000*10^37
 p/q-x= -.11045735560*10^-73
 (p/q-x) * (sqrt(5)*q^2)= -.485364608550*10^0
75: 
 p[k]= +.60728338969805745700507212595448411044000000000000000000000000*10^38
 q[k]= +.19330430665609526556707216376512714945000000000000000000000000*10^38
 p/q-x= +.624086642*10^-75
 (p/q-x) * (sqrt(5)*q^2)= +.521450333210*10^0
76: 
 p[k]= +.256839923861488782607902790348837497679000000000000000000000000*10^39
 q[k]= +.81754686931803956266412424933874257924000000000000000000000000*10^38
 p/q-x= -.86832546875*10^-77
 (p/q-x) * (sqrt(5)*q^2)= -.129775544949*10^0
77: 
 p[k]= +.4170167120753626267426951858176848373908000000000000000000000000*10^40
 q[k]= +.1327405421574472826819306015318500841729000000000000000000000000*10^40
 p/q-x= +.5314994701*10^-78
 (p/q-x) * (sqrt(5)*q^2)= +.209408840*10^1
78: 
 p[k]= +.4427007044615115050034854648525685871587000000000000000000000000*10^40
 q[k]= +.1409160108506276783085718440252375099653000000000000000000000000*10^40
 p/q-x= -.310929204580*10^-80
 (p/q-x) * (sqrt(5)*q^2)= -.13805978691*10^-1
79: 
 p[k]= +.71691830130378714932303855027081227369941500000000000000000000*10^42
 q[k]= +.22820218289108503490361997489595089188586200000000000000000000*10^42
 p/q-x= +.417775284705*10^-84
 (p/q-x) * (sqrt(5)*q^2)= +.48648262610*10^-1
80: 
 p[k]= +.3226575056571503683458676961683507800234526200000000000000000000*10^44
 q[k]= +.1027050739020733284744598458875804250996344300000000000000000000*10^44
 p/q-x= -.8890980399*10^-86
 (p/q-x) * (sqrt(5)*q^2)= -.209709668*10^1
81: 
 p[k]= +.3298266886701882398390980816710589027604467700000000000000000000*10^44
 q[k]= +.1049870957309841788234960456365399340184930500000000000000000000*10^44
 p/q-x= +.383128231*10^-87
 (p/q-x) * (sqrt(5)*q^2)= +.94428045480*10^-1
82: 
 p[k]= +.7578844656401291644806025492931646640753281560000000000000000*10^45
 q[k]= +.2412421179983725262591372849891458973506481530000000000000000*10^45
 p/q-x= -.117024975721*10^-88
 (p/q-x) * (sqrt(5)*q^2)= -.152289453*10^1
83: 
 p[k]= +.7908671345071479884645123574602705543513728330000000000000000*10^45
 q[k]= +.2517408275714709441414868895527998907524974580000000000000000*10^45
 p/q-x= +.47636958163*10^-89
 (p/q-x) * (sqrt(5)*q^2)= +.675050611965*10^0
84: 
 p[k]= +.23396187346544251414096272642137057727780738220000000000000000*10^46
 q[k]= +.7447237731413144145421110640947456788556430690000000000000000*10^45
 p/q-x= -.5702810374*10^-90
 (p/q-x) * (sqrt(5)*q^2)= -.707236015079*10^0
85: 
 p[k]= +.54701046038159982712837668858876820999075204770000000000000000*10^46
 q[k]= +.17411883738540997732257090177422912484637835960000000000000000*10^46
 p/q-x= +.2009047616*10^-90
 (p/q-x) * (sqrt(5)*q^2)= +.136196751*10^1
86: 
 p[k]= +.78097233384704234126933941501013878726855942990000000000000000*10^46
 q[k]= +.24859121469954141877678200818370369273194266650000000000000000*10^46
 p/q-x= -.301252845*10^-91
 (p/q-x) * (sqrt(5)*q^2)= -.416282076624*10^0
87: 
 p[k]= +.367089979576976919220573434862932335906498976730000000000000000*10^47
 q[k]= +.116848369618357565242969893450904389577414902560000000000000000*10^47
 p/q-x= +.430111199109*10^-92
 (p/q-x) * (sqrt(5)*q^2)= +.131314010*10^1
88: 
 p[k]= +.445187212961681153347507376363946214633354919720000000000000000*10^47
 q[k]= +.141707491088311707120648094269274758850609169210000000000000000*10^47
 p/q-x= -.173815922889*10^-92
 (p/q-x) * (sqrt(5)*q^2)= -.780477124933*10^0
89: 
 p[k]= +.1257464405500339225915588187590824765173208816170000000000000000*10^48
 q[k]= +.400263351794980979484266081989453907278633240980000000000000000*10^47
 p/q-x= +.2487751322*10^-94
 (p/q-x) * (sqrt(5)*q^2)= +.89121733135*10^-1
90: 
 p[k]= +.3062433294496982257532162387854374057879036650780000000000000*10^49
 q[k]= +.9748027934167855214743034062016168533537806952730000000000000000*10^48
 p/q-x= -.751825870811*10^-96
 (p/q-x) * (sqrt(5)*q^2)= -.159748135*10^1
91: 
 p[k]= +.3188179735047016180123721206613456534396357532397000000000000*10^49
 q[k]= +.1014829128596283619422730014400562244081644019371000000000000*10^49
 p/q-x= +.259032497458*10^-96
 (p/q-x) * (sqrt(5)*q^2)= +.596520129555*10^0
92: 
 p[k]= +.9438792764591014617779604801081287126671751715574000000000000*10^49
 q[k]= +.3004461050609352760319763435002741341517068734015000000000000*10^49
 p/q-x= -.68942318836*10^-97
 (p/q-x) * (sqrt(5)*q^2)= -.139156675*10^1
93: 
 p[k]= +.12626972499638030797903326007694743661068109247971000000000000*10^50
 q[k]= +.4019290179205636379742493449403303585598712753386000000000000*10^49
 p/q-x= +.13867924311*10^-97
 (p/q-x) * (sqrt(5)*q^2)= +.500950931739*10^0
94: 
 p[k]= +.47319710263505107011489582824165518109876079459487000000000000*10^50
 q[k]= +.15062331588226261899547243783212652098313206994173000000000000*10^50
 p/q-x= -.2650112665*10^-98
 (p/q-x) * (sqrt(5)*q^2)= -.134441623*10^1
95: 
 p[k]= +.59946682763143137809392908831860261770944188707458000000000000*10^50
 q[k]= +.19081621767431898279289737232615955683911919747559000000000000*10^50
 p/q-x= +.829192427*10^-99
 (p/q-x) * (sqrt(5)*q^2)= +.675104333676*10^0
96: 
 p[k]= +.167213075789791382630275400487886041651764456874403000000000000*10^51
 q[k]= +.53225575123090058458126718248444563466137046489291000000000000*10^50
 p/q-x= -.155417825*10^-99
 (p/q-x) * (sqrt(5)*q^2)= -.984524563738*10^0
97: 
 p[k]= +.227159758552934520439668309319746303422708645581861000000000000*10^51
 q[k]= +.72307196890521956737416455481060519150048966236850000000000000*10^50
 p/q-x= +.104417450*10^-99
 (p/q-x) * (sqrt(5)*q^2)= +.122073427*10^1
98: 
 p[k]= +.394372834342725903069943709807632345074473102456264000000000000*10^51
 q[k]= +.125532772013612015195543173729505082616186012726141000000000000*10^51
 p/q-x= -.57520438678*10^-101
 (p/q-x) * (sqrt(5)*q^2)= -.202684916203*10^0
99: 
 p[k]= +.4170888101980193551139105407396069754167439670144501000000000000*10^52
 q[k]= +.1327634917026642108692848192776111345311909093498260000000000000*10^52
 p/q-x= +.2481352486*10^-102
 (p/q-x) * (sqrt(5)*q^2)= +.977981852261*10^0
