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− | Here are all the 3 digit prime numbers, i.e. all prime numbers between 101- |
+ | Here are all the 3 digit prime numbers, i.e. all prime numbers between 101-1,000. |
− | |||
==100s== |
==100s== |
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− | <gallery widths=" |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
− | 101.png|One Hundred |
+ | 101.png|One Hundred One|link=101 |
− | 103.png|One Hundred |
+ | 103.png|One Hundred Three|link=103 |
− | 107.png|One Hundred |
+ | 107.png|One Hundred Seven|link=107 |
− | 109.png|One Hundred |
+ | 109.png|One Hundred Nine|link=109 |
− | 113.png|One Hundred |
+ | 113.png|One Hundred Thirteen|link=113 |
− | 127.png|One Hundred |
+ | 127.png|One Hundred Twenty-Seven|link=127 |
− | 131.png|One Hundred |
+ | 131.png|One Hundred Thirty-One|link=131 |
− | 137.png|One Hundred |
+ | 137.png|One Hundred Thirty-Seven|link=137 |
− | 139.png|One Hundred |
+ | 139.png|One Hundred Thirty-Nine|link=139 |
− | 149.png|One Hundred |
+ | 149.png|One Hundred Forty-Nine|link=149 |
− | 151.png|One Hundred |
+ | 151.png|One Hundred Fifty-One|link=151 |
− | 157.png|One Hundred |
+ | 157.png|One Hundred Fifty-Seven|link=157 |
− | 163.png|One Hundred |
+ | 163.png|One Hundred Sixty-Three|link=163 |
− | 167.png|One Hundred |
+ | 167.png|One Hundred Sixty-Seven|link=167 |
− | 173.png|One Hundred |
+ | 173.png|One Hundred Seventy-Three|link=173 |
− | 179.png|One Hundred |
+ | 179.png|One Hundred Seventy-Nine|link=179 |
− | 181.png|One Hundred |
+ | 181.png|One Hundred Eighty-One|link=181 |
− | 191.png|One Hundred |
+ | 191.png|One Hundred Ninety-One|link=191 |
− | 193.png|One Hundred |
+ | 193.png|One Hundred Ninety-Three|link=193 |
− | 197.png|One Hundred |
+ | 197.png|One Hundred Ninety-Seven|link=197 |
− | 199.png|One Hundred |
+ | 199.png|One Hundred Ninety-Nine|link=199 |
</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
| style="text-align:center;"|[[101]] |
| style="text-align:center;"|[[101]] |
||
| style="text-align:center;"|[[103]] |
| style="text-align:center;"|[[103]] |
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==200s== |
==200s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
211.png|Two Hundred Eleven|link=211 |
211.png|Two Hundred Eleven|link=211 |
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223.png|Two Hundred Twenty-Three|link=223 |
223.png|Two Hundred Twenty-Three|link=223 |
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</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
| style="text-align: center;"|[[211]] |
| style="text-align: center;"|[[211]] |
||
| style="text-align: center;"|[[223]] |
| style="text-align: center;"|[[223]] |
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==300s== |
==300s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
307.png|Three Hundred Seven|link=307 |
307.png|Three Hundred Seven|link=307 |
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311.png|Three Hundred Eleven|link=311 |
311.png|Three Hundred Eleven|link=311 |
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</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
| style="text-align: center;"|[[307]] |
| style="text-align: center;"|[[307]] |
||
| style="text-align: center;"|[[311]] |
| style="text-align: center;"|[[311]] |
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==400s== |
==400s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
401.png|Four Hundred One|link=401 |
401.png|Four Hundred One|link=401 |
||
409.png|Four Hundred Nine|link=409 |
409.png|Four Hundred Nine|link=409 |
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</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
| style="text-align: center;"|[[401]] |
| style="text-align: center;"|[[401]] |
||
| style="text-align: center;"|[[409]] |
| style="text-align: center;"|[[409]] |
||
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==500s== |
==500s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
503.png|Five Hundred Three|link=503 |
503.png|Five Hundred Three|link=503 |
||
509.png|Five Hundred Nine|link=509 |
509.png|Five Hundred Nine|link=509 |
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</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
|- |
|- |
||
| style="text-align:center;"|[[503]] |
| style="text-align:center;"|[[503]] |
||
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==600s== |
==600s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
601.png|Six Hundred One|link=601 |
601.png|Six Hundred One|link=601 |
||
607.png|Six Hundred Seven|link=607 |
607.png|Six Hundred Seven|link=607 |
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</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
|- |
|- |
||
| style="text-align:center;"|[[601]] |
| style="text-align:center;"|[[601]] |
||
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==700s== |
==700s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
701.png|Seven Hundred One|link=701 |
701.png|Seven Hundred One|link=701 |
||
709.png|Seven Hundred Nine|link=709 |
709.png|Seven Hundred Nine|link=709 |
||
− | 719. |
+ | 719.JPG|Seven Hundred Nineteen|link=719 |
727.png|Seven Hundred Twenty-Seven|link=727 |
727.png|Seven Hundred Twenty-Seven|link=727 |
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− | 733. |
+ | 733.JPG|Seven Hundred Thirty-Three|link=733 |
739.png|Seven Hundred Thirty-Nine|link=739 |
739.png|Seven Hundred Thirty-Nine|link=739 |
||
743.png|Seven Hundred Forty-Three|link=743 |
743.png|Seven Hundred Forty-Three|link=743 |
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</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
|- |
|- |
||
| style="text-align:center;"|[[701]] |
| style="text-align:center;"|[[701]] |
||
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==800s== |
==800s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
809.png|Eight Hundred Nine|link=809 |
809.png|Eight Hundred Nine|link=809 |
||
811.png|Eight Hundred Eleven|link=811 |
811.png|Eight Hundred Eleven|link=811 |
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− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
|- |
|- |
||
| style="text-align:center;"|[[809]] |
| style="text-align:center;"|[[809]] |
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==900s== |
==900s== |
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− | <gallery widths="50"> |
+ | <gallery widths="50" hideaddbutton="true" navigation="true"> |
907.png|Nine Hundred Seven|link=907 |
907.png|Nine Hundred Seven|link=907 |
||
911.png|Nine Hundred Eleven|link=911 |
911.png|Nine Hundred Eleven|link=911 |
||
− | 919. |
+ | 919.JPG|Nine Hundred Nineteen|link=919 |
929.png|Nine Hundred Twenty-Nine|link=929 |
929.png|Nine Hundred Twenty-Nine|link=929 |
||
937.png|Nine Hundred Thirty-Seven|link=937 |
937.png|Nine Hundred Thirty-Seven|link=937 |
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953.png|Nine Hundred Fifty-Three|link=953 |
953.png|Nine Hundred Fifty-Three|link=953 |
||
967.png|Nine Hundred Sixty-Seven|link=967 |
967.png|Nine Hundred Sixty-Seven|link=967 |
||
− | 971. |
+ | 971.JPG|Nine Hundred Seventy-One|link=971 |
977.png|Nine Hundred Seventy-Seven|link=977 |
977.png|Nine Hundred Seventy-Seven|link=977 |
||
983.png|Nine Hundred Eighty-Three|link=983 |
983.png|Nine Hundred Eighty-Three|link=983 |
||
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</gallery> |
</gallery> |
||
− | {| |
+ | {| class="PrimeTableBlue" style="width:70%;" |
|- |
|- |
||
| style="text-align:center;"|[[907]] |
| style="text-align:center;"|[[907]] |
||
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|} |
|} |
||
− | All in all, there are 143 prime numbers from 101- |
+ | All in all, there are 143 prime numbers from 101-1,000. This means that 143/900 or around 1 in 6 numbers from 101-1,000 are prime. 757 numbers are composite. |
{{Navbox_Group_Prime |
{{Navbox_Group_Prime |
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|prevnumbergroup = [[1-100|1 or 2 Digits (1-100)]] |
|prevnumbergroup = [[1-100|1 or 2 Digits (1-100)]] |
||
|digitnumber = 3 |
|digitnumber = 3 |
||
− | |nextnumbergroup = [[ |
+ | |nextnumbergroup = [[1,001-4,000|'''''Go on to 4 Digits!''''']]}} |
− | [[Category:Groups of primes]] |
||
[[Category:3-Digit Prime Numbers|Full list of 3-Digit Prime Numbers]] |
[[Category:3-Digit Prime Numbers|Full list of 3-Digit Prime Numbers]] |
||
[[Category:Prime Numbers]] |
[[Category:Prime Numbers]] |
Revision as of 03:02, 6 December 2017
Here are all the 3 digit prime numbers, i.e. all prime numbers between 101-1,000.
100s
101 | 103 | 107 | 109 | 113 |
127 | 131 | 137 | 139 | 149 |
151 | 157 | 163 | 167 | 173 |
179 | 181 | 191 | 193 | 197 |
199 |
200s
211 | 223 | 227 | 229 | 233 |
239 | 241 | 251 | 257 | 263 |
269 | 271 | 277 | 281 | 283 |
293 |
300s
307 | 311 | 313 | 317 | 331 |
337 | 347 | 349 | 353 | 359 |
367 | 373 | 379 | 383 | 389 |
397 |
400s
401 | 409 | 419 | 421 | 431 |
433 | 439 | 443 | 449 | 457 |
461 | 463 | 467 | 479 | 487 |
491 | 499 |
500s
503 | 509 | 521 | 523 | 541 |
547 | 557 | 563 | 569 | 571 |
577 | 587 | 593 | 599 |
600s
601 | 607 | 613 | 617 | 619 |
631 | 641 | 643 | 647 | 653 |
659 | 661 | 673 | 677 | 683 |
691 |
700s
701 | 709 | 719 | 727 | 733 |
739 | 743 | 751 | 757 | 761 |
769 | 773 | 787 | 797 |
800s
809 | 811 | 821 | 823 | 827 |
829 | 839 | 853 | 857 | 859 |
863 | 877 | 881 | 883 | 887 |
900s
907 | 911 | 919 | 929 | 937 |
941 | 947 | 953 | 967 | 971 |
977 | 983 | 991 | 997 |
All in all, there are 143 prime numbers from 101-1,000. This means that 143/900 or around 1 in 6 numbers from 101-1,000 are prime. 757 numbers are composite.
1 or 2 Digits (1-100) | List of Prime Numbers (3 digits) | Go on to 4 Digits! |