Treffpunkte der Reihe (3/2)^N und (exp)^N für jeweils N<900
im Bereich (0.95 < ((e)^N3 / (1.5)^N2) < 1.05)
(N2=5, N3=2) exp(N3)/(3/2)^N2= 0.97304442455054 (N2-N3=3) (N2/N3=2.5)
(N2=32, N3=13) exp(N3)/(3/2)^N2= 1.025434618264 (N2-N3=19) (N2/N3=2.4615384615385)
(N2=37, N3=15) exp(N3)/(3/2)^N2= 0.99779343804288 (N2-N3=22) (N2/N3=2.4666666666667)
(N2=42, N3=17) exp(N3)/(3/2)^N2= 0.97089734174073 (N2-N3=25) (N2/N3=2.4705882352941)
(N2=69, N3=28) exp(N3)/(3/2)^N2= 1.0231719332458 (N2-N3=41) (N2/N3=2.4642857142857)
(N2=74, N3=30) exp(N3)/(3/2)^N2= 0.99559174500143 (N2-N3=44) (N2/N3=2.4666666666667)
(N2=79, N3=32) exp(N3)/(3/2)^N2= 0.96875499660218 (N2-N3=47) (N2/N3=2.46875)
(N2=101, N3=41) exp(N3)/(3/2)^N2= 1.0491959207863 (N2-N3=60) (N2/N3=2.4634146341463)
(N2=106, N3=43) exp(N3)/(3/2)^N2= 1.0209142409823 (N2-N3=63) (N2/N3=2.4651162790698)
(N2=111, N3=45) exp(N3)/(3/2)^N2= 0.99339491013208 (N2-N3=66) (N2/N3=2.4666666666667)
(N2=116, N3=47) exp(N3)/(3/2)^N2= 0.9666173786809 (N2-N3=69) (N2/N3=2.468085106383)
(N2=138, N3=56) exp(N3)/(3/2)^N2= 1.046880804982 (N2-N3=82) (N2/N3=2.4642857142857)
(N2=143, N3=58) exp(N3)/(3/2)^N2= 1.0186615304567 (N2-N3=85) (N2/N3=2.4655172413793)
(N2=148, N3=60) exp(N3)/(3/2)^N2= 0.99120292271498 (N2-N3=88) (N2/N3=2.4666666666667)
(N2=153, N3=62) exp(N3)/(3/2)^N2= 0.96448447754601 (N2-N3=91) (N2/N3=2.4677419354839)
(N2=175, N3=71) exp(N3)/(3/2)^N2= 1.044570797624 (N2-N3=104) (N2/N3=2.4647887323944)
(N2=180, N3=73) exp(N3)/(3/2)^N2= 1.0164137906764 (N2-N3=107) (N2/N3=2.4657534246575)
(N2=185, N3=75) exp(N3)/(3/2)^N2= 0.98901577205393 (N2-N3=110) (N2/N3=2.4666666666667)
(N2=190, N3=77) exp(N3)/(3/2)^N2= 0.96235628278962 (N2-N3=113) (N2/N3=2.4675324675325)
(N2=212, N3=86) exp(N3)/(3/2)^N2= 1.0422658874405 (N2-N3=126) (N2/N3=2.4651162790698)
(N2=217, N3=88) exp(N3)/(3/2)^N2= 1.0141710106732 (N2-N3=129) (N2/N3=2.4659090909091)
(N2=222, N3=90) exp(N3)/(3/2)^N2= 0.98683344747632 (N2-N3=132) (N2/N3=2.4666666666667)
(N2=227, N3=92) exp(N3)/(3/2)^N2= 0.96023278402682 (N2-N3=135) (N2/N3=2.4673913043478)
(N2=249, N3=101) exp(N3)/(3/2)^N2= 1.0399660631841 (N2-N3=148) (N2/N3=2.4653465346535)
(N2=254, N3=103) exp(N3)/(3/2)^N2= 1.011933179503 (N2-N3=151) (N2/N3=2.4660194174757)
(N2=259, N3=105) exp(N3)/(3/2)^N2= 0.98465593833311 (N2-N3=154) (N2/N3=2.4666666666667)
(N2=264, N3=107) exp(N3)/(3/2)^N2= 0.95811397089561 (N2-N3=157) (N2/N3=2.4672897196262)
(N2=286, N3=116) exp(N3)/(3/2)^N2= 1.0376713136323 (N2-N3=170) (N2/N3=2.4655172413793)
(N2=291, N3=118) exp(N3)/(3/2)^N2= 1.009700286246 (N2-N3=173) (N2/N3=2.4661016949153)
(N2=296, N3=120) exp(N3)/(3/2)^N2= 0.98248323399873 (N2-N3=176) (N2/N3=2.4666666666667)
(N2=301, N3=122) exp(N3)/(3/2)^N2= 0.95599983305684 (N2-N3=179) (N2/N3=2.4672131147541)
(N2=323, N3=131) exp(N3)/(3/2)^N2= 1.0353816275877 (N2-N3=192) (N2/N3=2.4656488549618)
(N2=328, N3=133) exp(N3)/(3/2)^N2= 1.0074723200062 (N2-N3=195) (N2/N3=2.4661654135338)
(N2=333, N3=135) exp(N3)/(3/2)^N2= 0.98031532387107 (N2-N3=198) (N2/N3=2.4666666666667)
(N2=338, N3=137) exp(N3)/(3/2)^N2= 0.9538903601942 (N2-N3=201) (N2/N3=2.4671532846715)
(N2=360, N3=146) exp(N3)/(3/2)^N2= 1.0330969938771 (N2-N3=214) (N2/N3=2.4657534246575)
(N2=365, N3=148) exp(N3)/(3/2)^N2= 1.0052492699121 (N2-N3=217) (N2/N3=2.4662162162162)
(N2=370, N3=150) exp(N3)/(3/2)^N2= 0.97815219737144 (N2-N3=220) (N2/N3=2.4666666666667)
(N2=375, N3=152) exp(N3)/(3/2)^N2= 0.95178554201413 (N2-N3=223) (N2/N3=2.4671052631579)
(N2=397, N3=161) exp(N3)/(3/2)^N2= 1.0308174013524 (N2-N3=236) (N2/N3=2.4658385093168)
(N2=402, N3=163) exp(N3)/(3/2)^N2= 1.0030311251157 (N2-N3=239) (N2/N3=2.4662576687117)
(N2=407, N3=165) exp(N3)/(3/2)^N2= 0.97599384394444 (N2-N3=242) (N2/N3=2.4666666666667)
(N2=434, N3=176) exp(N3)/(3/2)^N2= 1.0285428388899 (N2-N3=258) (N2/N3=2.4659090909091)
(N2=439, N3=178) exp(N3)/(3/2)^N2= 1.0008178747932 (N2-N3=261) (N2/N3=2.4662921348315)
(N2=444, N3=180) exp(N3)/(3/2)^N2= 0.97384025305801 (N2-N3=264) (N2/N3=2.4666666666667)
(N2=471, N3=191) exp(N3)/(3/2)^N2= 1.0262732953903 (N2-N3=280) (N2/N3=2.4659685863874)
(N2=476, N3=193) exp(N3)/(3/2)^N2= 0.99860950814464 (N2-N3=283) (N2/N3=2.4663212435233)
(N2=481, N3=195) exp(N3)/(3/2)^N2= 0.97169141420329 (N2-N3=286) (N2/N3=2.4666666666667)
(N2=508, N3=206) exp(N3)/(3/2)^N2= 1.0240087597791 (N2-N3=302) (N2/N3=2.4660194174757)
(N2=513, N3=208) exp(N3)/(3/2)^N2= 0.99640601439394 (N2-N3=305) (N2/N3=2.4663461538462)
(N2=518, N3=210) exp(N3)/(3/2)^N2= 0.96954731689465 (N2-N3=308) (N2/N3=2.4666666666667)
(N2=545, N3=221) exp(N3)/(3/2)^N2= 1.021749221006 (N2-N3=324) (N2/N3=2.4660633484163)
(N2=550, N3=223) exp(N3)/(3/2)^N2= 0.99420738278873 (N2-N3=327) (N2/N3=2.4663677130045)
(N2=555, N3=225) exp(N3)/(3/2)^N2= 0.96740795066956 (N2-N3=330) (N2/N3=2.4666666666667)
(N2=577, N3=234) exp(N3)/(3/2)^N2= 1.0477370224038 (N2-N3=343) (N2/N3=2.465811965812)
(N2=582, N3=236) exp(N3)/(3/2)^N2= 1.0194946680452 (N2-N3=346) (N2/N3=2.4661016949153)
(N2=587, N3=238) exp(N3)/(3/2)^N2= 0.99201360260038 (N2-N3=349) (N2/N3=2.4663865546218)
(N2=592, N3=240) exp(N3)/(3/2)^N2= 0.96527330508859 (N2-N3=352) (N2/N3=2.4666666666667)
(N2=614, N3=249) exp(N3)/(3/2)^N2= 1.0454251257491 (N2-N3=365) (N2/N3=2.4658634538153)
(N2=619, N3=251) exp(N3)/(3/2)^N2= 1.0172450898952 (N2-N3=368) (N2/N3=2.4661354581673)
(N2=624, N3=253) exp(N3)/(3/2)^N2= 0.98982466312394 (N2-N3=371) (N2/N3=2.4664031620553)
(N2=629, N3=255) exp(N3)/(3/2)^N2= 0.96314336973536 (N2-N3=374) (N2/N3=2.4666666666667)
(N2=651, N3=264) exp(N3)/(3/2)^N2= 1.0431183304376 (N2-N3=387) (N2/N3=2.4659090909091)
(N2=656, N3=266) exp(N3)/(3/2)^N2= 1.0150004755788 (N2-N3=390) (N2/N3=2.4661654135338)
(N2=661, N3=268) exp(N3)/(3/2)^N2= 0.98764055367806 (N2-N3=393) (N2/N3=2.4664179104478)
(N2=666, N3=270) exp(N3)/(3/2)^N2= 0.96101813421645 (N2-N3=396) (N2/N3=2.4666666666667)
(N2=688, N3=279) exp(N3)/(3/2)^N2= 1.0408166252129 (N2-N3=409) (N2/N3=2.4659498207885)
(N2=693, N3=281) exp(N3)/(3/2)^N2= 1.0127608141429 (N2-N3=412) (N2/N3=2.4661921708185)
(N2=698, N3=283) exp(N3)/(3/2)^N2= 0.98546126360501 (N2-N3=415) (N2/N3=2.4664310954064)
(N2=703, N3=285) exp(N3)/(3/2)^N2= 0.95889758816138 (N2-N3=418) (N2/N3=2.4666666666667)
(N2=725, N3=294) exp(N3)/(3/2)^N2= 1.0385199988433 (N2-N3=431) (N2/N3=2.4659863945578)
(N2=730, N3=296) exp(N3)/(3/2)^N2= 1.0105260946587 (N2-N3=434) (N2/N3=2.4662162162162)
(N2=735, N3=298) exp(N3)/(3/2)^N2= 0.98328678227052 (N2-N3=437) (N2/N3=2.4664429530201)
(N2=740, N3=300) exp(N3)/(3/2)^N2= 0.95678172122257 (N2-N3=440) (N2/N3=2.4666666666667)
(N2=762, N3=309) exp(N3)/(3/2)^N2= 1.0362284401222 (N2-N3=453) (N2/N3=2.4660194174757)
(N2=767, N3=311) exp(N3)/(3/2)^N2= 1.0082963062216 (N2-N3=456) (N2/N3=2.4662379421222)
(N2=772, N3=313) exp(N3)/(3/2)^N2= 0.98111709906382 (N2-N3=459) (N2/N3=2.4664536741214)
(N2=777, N3=315) exp(N3)/(3/2)^N2= 0.95467052307525 (N2-N3=462) (N2/N3=2.4666666666667)
(N2=799, N3=324) exp(N3)/(3/2)^N2= 1.0339419378673 (N2-N3=475) (N2/N3=2.466049382716)
(N2=804, N3=326) exp(N3)/(3/2)^N2= 1.0060714379508 (N2-N3=478) (N2/N3=2.4662576687117)
(N2=809, N3=328) exp(N3)/(3/2)^N2= 0.97895220339754 (N2-N3=481) (N2/N3=2.4664634146341)
(N2=814, N3=330) exp(N3)/(3/2)^N2= 0.95256398341744 (N2-N3=484) (N2/N3=2.4666666666667)
(N2=836, N3=339) exp(N3)/(3/2)^N2= 1.0316604809213 (N2-N3=497) (N2/N3=2.4660766961652)
(N2=841, N3=341) exp(N3)/(3/2)^N2= 1.0038514789896 (N2-N3=500) (N2/N3=2.466275659824)
(N2=846, N3=343) exp(N3)/(3/2)^N2= 0.97679208470768 (N2-N3=503) (N2/N3=2.466472303207)
(N2=851, N3=345) exp(N3)/(3/2)^N2= 0.95046209196991 (N2-N3=506) (N2/N3=2.4666666666667)
(N2=873, N3=354) exp(N3)/(3/2)^N2= 1.0293840581515 (N2-N3=519) (N2/N3=2.4661016949153)
(N2=878, N3=356) exp(N3)/(3/2)^N2= 1.0016364185055 (N2-N3=522) (N2/N3=2.4662921348315)
(N2=883, N3=358) exp(N3)/(3/2)^N2= 0.97463673245355 (N2-N3=525) (N2/N3=2.4664804469274)
-----------------------------------------------