Treffpunkte der Reihe 3^N und (exp)^N  für jeweils N<900<br>im Bereich (0.95 < ((e)^N3 / 3^N2) < 1.05)<br><br> (N2=11, N3=10) exp(N3)/3^N2= 1.0139738474013 (N2-N3=1) (N2/N3=1.1)<br> (N2=22, N3=20) exp(N3)/3^N2= 1.0281429632137 (N2-N3=2) (N2/N3=1.1)<br> (N2=33, N3=30) exp(N3)/3^N2= 1.0425100760884 (N2-N3=3) (N2/N3=1.1)<br> (N2=45, N3=41) exp(N3)/3^N2= 0.95781193012568 (N2-N3=4) (N2/N3=1.0975609756098)<br> (N2=56, N3=51) exp(N3)/3^N2= 0.97119624787638 (N2-N3=5) (N2/N3=1.0980392156863)<br> (N2=67, N3=61) exp(N3)/3^N2= 0.98476759604089 (N2-N3=6) (N2/N3=1.0983606557377)<br> (N2=78, N3=71) exp(N3)/3^N2= 0.99852858815369 (N2-N3=7) (N2/N3=1.0985915492958)<br> (N2=89, N3=81) exp(N3)/3^N2= 1.0124818742704 (N2-N3=8) (N2/N3=1.0987654320988)<br> (N2=100, N3=91) exp(N3)/3^N2= 1.026630141478 (N2-N3=9) (N2/N3=1.0989010989011)<br> (N2=111, N3=101) exp(N3)/3^N2= 1.0409761144125 (N2-N3=10) (N2/N3=1.0990099009901)<br> (N2=123, N3=112) exp(N3)/3^N2= 0.95640259430516 (N2-N3=11) (N2/N3=1.0982142857143)<br> (N2=134, N3=122) exp(N3)/3^N2= 0.96976721821216 (N2-N3=12) (N2/N3=1.0983606557377)<br> (N2=145, N3=132) exp(N3)/3^N2= 0.98331859733421 (N2-N3=13) (N2/N3=1.0984848484848)<br> (N2=156, N3=142) exp(N3)/3^N2= 0.99705934136019 (N2-N3=14) (N2/N3=1.0985915492958)<br> (N2=167, N3=152) exp(N3)/3^N2= 1.0109920964464 (N2-N3=15) (N2/N3=1.0986842105263)<br> (N2=178, N3=162) exp(N3)/3^N2= 1.025119545726 (N2-N3=16) (N2/N3=1.0987654320988)<br> (N2=189, N3=172) exp(N3)/3^N2= 1.039444409826 (N2-N3=17) (N2/N3=1.0988372093023)<br> (N2=201, N3=183) exp(N3)/3^N2= 0.95499533219805 (N2-N3=18) (N2/N3=1.0983606557377)<br> (N2=212, N3=193) exp(N3)/3^N2= 0.96834029123911 (N2-N3=19) (N2/N3=1.0984455958549)<br> (N2=223, N3=203) exp(N3)/3^N2= 0.98187173070139 (N2-N3=20) (N2/N3=1.0985221674877)<br> (N2=234, N3=213) exp(N3)/3^N2= 0.99559225643384 (N2-N3=21) (N2/N3=1.0985915492958)<br> (N2=245, N3=223) exp(N3)/3^N2= 1.0095045106991 (N2-N3=22) (N2/N3=1.0986547085202)<br> (N2=256, N3=233) exp(N3)/3^N2= 1.0236111726825 (N2-N3=23) (N2/N3=1.0987124463519)<br> (N2=267, N3=243) exp(N3)/3^N2= 1.0379149590078 (N2-N3=24) (N2/N3=1.0987654320988)<br> (N2=279, N3=254) exp(N3)/3^N2= 0.95359014075308 (N2-N3=25) (N2/N3=1.0984251968504)<br> (N2=290, N3=264) exp(N3)/3^N2= 0.96691546386332 (N2-N3=26) (N2/N3=1.0984848484848)<br> (N2=301, N3=274) exp(N3)/3^N2= 0.98042699300528 (N2-N3=27) (N2/N3=1.0985401459854)<br> (N2=312, N3=284) exp(N3)/3^N2= 0.99412733019362 (N2-N3=28) (N2/N3=1.0985915492958)<br> (N2=323, N3=294) exp(N3)/3^N2= 1.0080191138032 (N2-N3=29) (N2/N3=1.0986394557823)<br> (N2=334, N3=304) exp(N3)/3^N2= 1.022105019077 (N2-N3=30) (N2/N3=1.0986842105263)<br> (N2=345, N3=314) exp(N3)/3^N2= 1.0363877586417 (N2-N3=31) (N2/N3=1.0987261146497)<br> (N2=357, N3=325) exp(N3)/3^N2= 0.95218701692345 (N2-N3=32) (N2/N3=1.0984615384615)<br> (N2=368, N3=335) exp(N3)/3^N2= 0.96549273299541 (N2-N3=33) (N2/N3=1.0985074626866)<br> (N2=379, N3=345) exp(N3)/3^N2= 0.97898438111333 (N2-N3=34) (N2/N3=1.0985507246377)<br> (N2=390, N3=355) exp(N3)/3^N2= 0.99266455946323 (N2-N3=35) (N2/N3=1.0985915492958)<br> (N2=401, N3=365) exp(N3)/3^N2= 1.0065359025378 (N2-N3=36) (N2/N3=1.0986301369863)<br> (N2=412, N3=375) exp(N3)/3^N2= 1.0206010816438 (N2-N3=37) (N2/N3=1.0986666666667)<br> (N2=423, N3=385) exp(N3)/3^N2= 1.0348628054163 (N2-N3=38) (N2/N3=1.0987012987013)<br> (N2=434, N3=395) exp(N3)/3^N2= 1.0493238203404 (N2-N3=39) (N2/N3=1.0987341772152)<br> (N2=435, N3=396) exp(N3)/3^N2= 0.95078595766684 (N2-N3=39) (N2/N3=1.0984848484848)<br> (N2=446, N3=406) exp(N3)/3^N2= 0.96407209555055 (N2-N3=40) (N2/N3=1.0985221674877)<br> (N2=457, N3=416) exp(N3)/3^N2= 0.9775438918976 (N2-N3=41) (N2/N3=1.0985576923077)<br> (N2=468, N3=426) exp(N3)/3^N2= 0.99120394107102 (N2-N3=42) (N2/N3=1.0985915492958)<br> (N2=479, N3=436) exp(N3)/3^N2= 1.0050548736871 (N2-N3=43) (N2/N3=1.098623853211)<br> (N2=490, N3=446) exp(N3)/3^N2= 1.0190993571219 (N2-N3=44) (N2/N3=1.0986547085202)<br> (N2=501, N3=456) exp(N3)/3^N2= 1.0333400960251 (N2-N3=45) (N2/N3=1.0986842105263)<br> (N2=512, N3=466) exp(N3)/3^N2= 1.0477798328405 (N2-N3=46) (N2/N3=1.0987124463519)<br> (N2=524, N3=477) exp(N3)/3^N2= 0.96265354844846 (N2-N3=47) (N2/N3=1.0985324947589)<br> (N2=535, N3=487) exp(N3)/3^N2= 0.97610552223477 (N2-N3=48) (N2/N3=1.0985626283368)<br> (N2=546, N3=497) exp(N3)/3^N2= 0.98974547185002 (N2-N3=49) (N2/N3=1.0985915492958)<br> (N2=557, N3=507) exp(N3)/3^N2= 1.0035760240398 (N2-N3=50) (N2/N3=1.0986193293886)<br> (N2=568, N3=517) exp(N3)/3^N2= 1.0175998422553 (N2-N3=51) (N2/N3=1.0986460348162)<br> (N2=579, N3=527) exp(N3)/3^N2= 1.0318196271665 (N2-N3=52) (N2/N3=1.0986717267552)<br> (N2=590, N3=537) exp(N3)/3^N2= 1.0462381171822 (N2-N3=53) (N2/N3=1.098696461825)<br> (N2=602, N3=548) exp(N3)/3^N2= 0.96123708861338 (N2-N3=54) (N2/N3=1.0985401459854)<br> (N2=613, N3=558) exp(N3)/3^N2= 0.9746692690061 (N2-N3=55) (N2/N3=1.0985663082437)<br> (N2=624, N3=568) exp(N3)/3^N2= 0.9882891486379 (N2-N3=56) (N2/N3=1.0985915492958)<br> (N2=635, N3=578) exp(N3)/3^N2= 1.0020993503893 (N2-N3=57) (N2/N3=1.098615916955)<br> (N2=646, N3=588) exp(N3)/3^N2= 1.0161025337926 (N2-N3=58) (N2/N3=1.0986394557823)<br> (N2=657, N3=598) exp(N3)/3^N2= 1.0303013955438 (N2-N3=59) (N2/N3=1.0986622073579)<br> (N2=668, N3=608) exp(N3)/3^N2= 1.0446986700225 (N2-N3=60) (N2/N3=1.0986842105263)<br> (N2=680, N3=619) exp(N3)/3^N2= 0.95982271297407 (N2-N3=61) (N2/N3=1.0985460420032)<br> (N2=691, N3=629) exp(N3)/3^N2= 0.97323512909745 (N2-N3=62) (N2/N3=1.0985691573927)<br> (N2=702, N3=639) exp(N3)/3^N2= 0.98683496827702 (N2-N3=63) (N2/N3=1.0985915492958)<br>-----------------------------------------------