Champernowne constant, the natural integers concatenated.
this is a NORMAL number in base 10, Ref: D.G. Champernowne, The Construction
of decimals normal in the scale 10, Journal of the London  Math. Soc, 8, 
(1933).
see also :
http://www.gps.caltech.edu/~eww/math/cnode191.html#SECTION0000191000000000000000

Note : K. Mahler proved in 1937 that any number constructed by 
concatenating integer values of a polynomial is also transcendental.

If P(x) is a non-constant polynomial with integer coeff. such 
that P(i) is an integer for all i>=0, then the number

 P(1)P(2)P(3)P(4)... is transcendental.


0.123456789101112131415161718192021222324252627282930313233343536373839404142434
445464748495051525354555657585960616263646566676869707172737475767778798081828
384858687888990919293949596979899100101102103104105106107108109110111112113114
115116117118119120121122123124125126127128129130131132133134135136137138139140
141142143144145146147148149150151152153154155156157158159160161162163164165166
167168169170171172173174175176177178179180181182183184185186187188189190191192
193194195196197198199200201202203204205206207208209210211212213214215216217218
219220221222223224225226227228229230231232233234235236237238239240241242243244
245246247248249250251252253254255256257258259260261262263264265266267268269270
271272273274275276277278279280281282283284285286287288289290291292293294295296
297298299300301302303304305306307308309310311312313314315316317318319320321322
323324325326327328329330331332333334335336337338339340341342343344345346347348
349350351352353354355356357358359360361362363364365366367368369370371372373374
375376377378379380381382383384385386387388389390391392393394395396397398399400
401402403404405406407408409410411412413414415416417418419420421422423424425426
427428429430431432433434435436437438439440441442443444445446447448449450451452
453454455456457458459460461462463464465466467468469470471472473474475476477478
479480481482483484485486487488489490491492493494495496497498499500501502503504
505506507508509510511512513514515516517518519520521522523524525526527528529530
531532533534535536537538539540541542543544545546547548549550551552553554555556
557558559560561562563564565566567568569570571572573574575576577578579580581582
583584585586587588589590591592593594595596597598599600601602603604605606607608
609610611612613614615616617618619620621622623624625626627628629630631632633634
635636637638639640641642643644645646647648649650651652653654655656657658659660
661662663664665666667668669670671672673674675676677678679680681682683684685686
687688689690691692693694695696697698699700701702703704705706707708709710711712
713714715716717718719720721722723724725726727728729730731732733734735736737738
739740741742743744745746747748749750751752753754755756757758759760761762763764
765766767768769770771772773774775776777778779780781782783784785786787788789790
791792793794795796797798799800801802803804805806807808809810811812813814815816
817818819820821822823824825826827828829830831832833834835836837838839840841842
843844845846847848849850851852853854855856857858859860861862863864865866867868
869870871872873874875876877878879880881882883884885886887888889890891892893894
895896897898899900901902903904905906907908909910911912913914915916917918919920
921922923924925926927928929930931932933934935936937938939940941942943944945946
947948949950951952953954955956957958959960961962963964965966967968969970971972
973974975976977978979980981982983984985986987988989990991992993994995996997998
999


































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