"100000000 (عدد)" کے نسخوں کے درمیان فرق
حذف شدہ مندرجات اضافہ شدہ مندرجات
ZkBot (تبادلۂ خیال | شراکتیں) م remove old interwiki |
م درستی املا بمطابق فہرست املا پڑتالگر + ویکائی |
||
سطر 13: | سطر 13: | ||
==عمومی خصوصیات== |
==عمومی خصوصیات== |
||
== 100,000,001 تا 999,999,999 کے خاص اعداد == |
== 100,000,001 تا 999,999,999 کے خاص اعداد == |
||
*'''102334155''' – [[Fibonacci number]] |
* '''102334155''' – [[Fibonacci number]] |
||
*'''107890609''' – [[Wedderburn-Etherington number]] |
* '''107890609''' – [[Wedderburn-Etherington number]] |
||
*'''111111111''' – [[repunit]], square root of 12345678987654321 |
* '''111111111''' – [[repunit]], square root of 12345678987654321 |
||
*'''111111113''' – [[Chen prime]], [[Sophie Germain prime]], [[cousin prime]]. |
* '''111111113''' – [[Chen prime]], [[Sophie Germain prime]], [[cousin prime]]. |
||
*'''123456789''' – smallest zeroless base 10 [[pandigital number]] |
* '''123456789''' – smallest zeroless base 10 [[pandigital number]] |
||
*'''129140163''' = 3<sup>17</sup> |
* '''129140163''' = 3<sup>17</sup> |
||
*'''129644790''' – [[کیٹیلان عدد]] |
* '''129644790''' – [[کیٹیلان عدد]] |
||
*'''134217728''' = 2<sup>27</sup> |
* '''134217728''' = 2<sup>27</sup> |
||
*'''139854276''' – the smallest pandigital square |
* '''139854276''' – the smallest pandigital square |
||
*'''142547559''' – [[Motzkin number]] |
* '''142547559''' – [[Motzkin number]] |
||
*'''165580141''' – [[Fibonacci number]] |
* '''165580141''' – [[Fibonacci number]] |
||
*'''179424673''' – 10000000th [[prime number]] |
* '''179424673''' – 10000000th [[prime number]] |
||
*'''190899322''' – [[Bell number]] |
* '''190899322''' – [[Bell number]] |
||
*'''214358881''' = 11<sup>8</sup> |
* '''214358881''' = 11<sup>8</sup> |
||
*'''222222222''' – [[repdigit]] |
* '''222222222''' – [[repdigit]] |
||
*'''222222227''' – [[safe prime]] |
* '''222222227''' – [[safe prime]] |
||
*'''225058681''' – [[Pell number]] |
* '''225058681''' – [[Pell number]] |
||
*'''225331713''' – [[self-descriptive number]] in base 9 |
* '''225331713''' – [[self-descriptive number]] in base 9 |
||
*'''244140625''' = 5<sup>12</sup> |
* '''244140625''' = 5<sup>12</sup> |
||
*'''253450711''' – Wedderburn-Etherington number |
* '''253450711''' – Wedderburn-Etherington number |
||
*'''267914296''' – [[Fibonacci number]] |
* '''267914296''' – [[Fibonacci number]] |
||
*'''268402687''' – [[Carol number]] |
* '''268402687''' – [[Carol number]] |
||
*'''268435456''' = 2<sup>28</sup> |
* '''268435456''' = 2<sup>28</sup> |
||
*'''268468223''' – [[Kynea number]] |
* '''268468223''' – [[Kynea number]] |
||
*'''272400600''' – the number of terms of the [[harmonic series (mathematics)|harmonic series]] required to pass 20 |
* '''272400600''' – the number of terms of the [[harmonic series (mathematics)|harmonic series]] required to pass 20 |
||
*'''275305224''' – the number of [[magic square]]s of order 5, excluding rotations and reflections |
* '''275305224''' – the number of [[magic square]]s of order 5, excluding rotations and reflections |
||
*'''282475249''' = 7<sup>10</sup> |
* '''282475249''' = 7<sup>10</sup> |
||
*'''333333333''' – repdigit |
* '''333333333''' – repdigit |
||
*'''367567200''' – [[colossally abundant number]], [[superior highly composite number]] |
* '''367567200''' – [[colossally abundant number]], [[superior highly composite number]] |
||
*'''381654729''' – the only [[polydivisible number]] that is also a zeroless [[pandigital number]] |
* '''381654729''' – the only [[polydivisible number]] that is also a zeroless [[pandigital number]] |
||
*'''387420489''' = 3<sup>18</sup>, 9<sup>9</sup> and in [[tetration]] notation <math>^29</math> |
* '''387420489''' = 3<sup>18</sup>, 9<sup>9</sup> and in [[tetration]] notation <math>^29</math> |
||
*'''400763223''' – Motzkin number |
* '''400763223''' – Motzkin number |
||
*'''433494437''' – [[Fibonacci number]] |
* '''433494437''' – [[Fibonacci number]] |
||
*'''442386619''' – [[alternating factorial]] |
* '''442386619''' – [[alternating factorial]] |
||
*'''444444444''' – [[repdigit]] |
* '''444444444''' – [[repdigit]] |
||
*'''477638700''' – Catalan number |
* '''477638700''' – Catalan number |
||
*'''479001599''' – [[factorial prime]] |
* '''479001599''' – [[factorial prime]] |
||
*'''479001600''' = 12! |
* '''479001600''' = 12! |
||
*'''536870912''' = 2<sup>29</sup> |
* '''536870912''' = 2<sup>29</sup> |
||
*'''543339720''' – Pell number |
* '''543339720''' – Pell number |
||
*'''554999445''' – 9-digit analogue to [[6174 (عدد)]] |
* '''554999445''' – 9-digit analogue to [[6174 (عدد)]] |
||
*'''555555555''' – [[repdigit]] |
* '''555555555''' – [[repdigit]] |
||
*'''596572387''' – Wedderburn-Etherington number |
* '''596572387''' – Wedderburn-Etherington number |
||
*'''666666666''' – [[repdigit]] |
* '''666666666''' – [[repdigit]] |
||
*'''701408733''' – [[Fibonacci number]] |
* '''701408733''' – [[Fibonacci number]] |
||
*'''715827883''' – [[Wagstaff prime]] |
* '''715827883''' – [[Wagstaff prime]] |
||
*'''777777777''' – [[repdigit]] |
* '''777777777''' – [[repdigit]] |
||
*'''815730721''' = 13<sup>8</sup> |
* '''815730721''' = 13<sup>8</sup> |
||
*'''888888888''' – [[repdigit]] |
* '''888888888''' – [[repdigit]] |
||
*'''906150257''' – smallest counterexample to the [[Polya conjecture]] |
* '''906150257''' – smallest counterexample to the [[Polya conjecture]] |
||
*'''987654321''' – largest zeroless pandigital number |
* '''987654321''' – largest zeroless pandigital number |
||
*'''999999937''' – largest 9-digit prime |
* '''999999937''' – largest 9-digit prime |
||
*'''999999999''' – [[repdigit]] |
* '''999999999''' – [[repdigit]] |
||
{{صحیح اعداد}} |
{{صحیح اعداد}} |
نسخہ بمطابق 20:34، 3 فروری 2018ء
100000000 | |
---|---|
لفظی | ایک (one) hundred میلیون |
صفاتی | 100000000 (ایک (one) hundred میلیونth) |
اجزائے ضربی | 28× 58 |
مقسوم علیہ | 1, 100000000 |
رومن عدد | N/A |
یکرمزی علامات |
|
ثنائی | 1011111010111100001000000002 |
ثلاثی | 202220111120122013 |
رباعی | 113311320100004 |
خمسی | 2011000000005 |
ستی | 135312025446 |
ثمانی | 5753604008 |
اثنا عشری | 295A645412 |
ستہ عشری | 5F5E10016 |
اساس بیس | 1B5000020 |
اساس چھتیس | 1NJCHS36 |
100000000 (عدد) یعنی 100,000,000 ایک عدد اور ایک علامت ہے۔ کچھ عددی نظاموں میں 99,999,999 سے بڑا یا زیادہ اور 100000001 سے چھوٹا یا کم ہوتا ہے۔ گنتی میں اسے دس کروڑ بولا جاتا ہے۔ اور اس سے پہلے نو کروڑ نینانوے لاکھ نینانوے ہزار نو سو نینانوے اور اس کے بعد دس کروڑ ایک بولا جاتا ہے۔
انفرادی خصوصیات
عمومی خصوصیات
100,000,001 تا 999,999,999 کے خاص اعداد
- 102334155 – Fibonacci number
- 107890609 – Wedderburn-Etherington number
- 111111111 – repunit, square root of 12345678987654321
- 111111113 – Chen prime, Sophie Germain prime, cousin prime.
- 123456789 – smallest zeroless base 10 pandigital number
- 129140163 = 317
- 129644790 – کیٹیلان عدد
- 134217728 = 227
- 139854276 – the smallest pandigital square
- 142547559 – Motzkin number
- 165580141 – Fibonacci number
- 179424673 – 10000000th prime number
- 190899322 – Bell number
- 214358881 = 118
- 222222222 – repdigit
- 222222227 – safe prime
- 225058681 – Pell number
- 225331713 – self-descriptive number in base 9
- 244140625 = 512
- 253450711 – Wedderburn-Etherington number
- 267914296 – Fibonacci number
- 268402687 – Carol number
- 268435456 = 228
- 268468223 – Kynea number
- 272400600 – the number of terms of the harmonic series required to pass 20
- 275305224 – the number of magic squares of order 5, excluding rotations and reflections
- 282475249 = 710
- 333333333 – repdigit
- 367567200 – colossally abundant number, superior highly composite number
- 381654729 – the only polydivisible number that is also a zeroless pandigital number
- 387420489 = 318, 99 and in tetration notation
- 400763223 – Motzkin number
- 433494437 – Fibonacci number
- 442386619 – alternating factorial
- 444444444 – repdigit
- 477638700 – Catalan number
- 479001599 – factorial prime
- 479001600 = 12!
- 536870912 = 229
- 543339720 – Pell number
- 554999445 – 9-digit analogue to 6174 (عدد)
- 555555555 – repdigit
- 596572387 – Wedderburn-Etherington number
- 666666666 – repdigit
- 701408733 – Fibonacci number
- 715827883 – Wagstaff prime
- 777777777 – repdigit
- 815730721 = 138
- 888888888 – repdigit
- 906150257 – smallest counterexample to the Polya conjecture
- 987654321 – largest zeroless pandigital number
- 999999937 – largest 9-digit prime
- 999999999 – repdigit