Solusyon - Factorials

197454325216532264659104934889050729798193368435789251952939727246195120775719885243504693075333496465454008516213505429009804070408430257096785696827626157882405643717031519928243097319998780265089923790053757032072677295505895829283870406323206585117149295397038334902001929189634484609699898789597798775514532007553585614331105070586766801509264475716220173912322094442517671118388043384859300197630155184271126616641879977774356456795186979417477568942814774975018366060426887852636612642568615929835910425974790031775849921076547086517967379677447567077954077490270662960639703220142788137961788376549759876503898462574552122155905531025801057890550246111031877685225143417860959473892563896680775383984425430784029901423875327511257166971725732975525025686369070246099620364757055283502042141201382904105359802523841726658086682004672368997984405061853532457120901468988998402710284238915523195865939938774431157946761764898065938822220788226056179381861274037053909916577723506537402754744300482575475513692124715726291646123547016422499974468674095689934770951406234099995128812031286223960709584209124695257112906717131481587519169381695765011878144410739051119930263967468290770141938204809785609755289439540058784733778197647837602355805351255407660831167714039284467568852080004380034752966558376457666313293604625037759288255514857092531926827247572695896611095595468983946922663353500550435928799861807211333487948884133373096279396846930326560818731468467435623936359406851716491253655212869745364884253370499947609515302649037627822463008799941418537736784888496390714425344000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000

197454325216532264659104934889050729798193368435789251952939727246195120775719885243504693075333496465454008516213505429009804070408430257096785696827626157882405643717031519928243097319998780265089923790053757032072677295505895829283870406323206585117149295397038334902001929189634484609699898789597798775514532007553585614331105070586766801509264475716220173912322094442517671118388043384859300197630155184271126616641879977774356456795186979417477568942814774975018366060426887852636612642568615929835910425974790031775849921076547086517967379677447567077954077490270662960639703220142788137961788376549759876503898462574552122155905531025801057890550246111031877685225143417860959473892563896680775383984425430784029901423875327511257166971725732975525025686369070246099620364757055283502042141201382904105359802523841726658086682004672368997984405061853532457120901468988998402710284238915523195865939938774431157946761764898065938822220788226056179381861274037053909916577723506537402754744300482575475513692124715726291646123547016422499974468674095689934770951406234099995128812031286223960709584209124695257112906717131481587519169381695765011878144410739051119930263967468290770141938204809785609755289439540058784733778197647837602355805351255407660831167714039284467568852080004380034752966558376457666313293604625037759288255514857092531926827247572695896611095595468983946922663353500550435928799861807211333487948884133373096279396846930326560818731468467435623936359406851716491253655212869745364884253370499947609515302649037627822463008799941418537736784888496390714425344000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000

Tingnan ang mga hakbang

Hakbang-sa-hakbang na paliwanag

1. Hanapin ang paktoryal

Ang paktoryal ng 728 ay produkto ng lahat ng positibong mga integer na mas mababa o katumbas sa 728:

$728! = 728 \cdot 727 \cdot 726 \cdot 725 \cdot 724 \cdot 723 \cdot 722 \cdot 721 \cdot . . . \cdot 7 \cdot 6 \cdot 5 \cdot 4 \cdot 3 \cdot 2 \cdot 1 = 197454325216532264659104934889050729798193368435789251952939727246195120775719885243504693075333496465454008516213505429009804070408430257096785696827626157882405643717031519928243097319998780265089923790053757032072677295505895829283870406323206585117149295397038334902001929189634484609699898789597798775514532007553585614331105070586766801509264475716220173912322094442517671118388043384859300197630155184271126616641879977774356456795186979417477568942814774975018366060426887852636612642568615929835910425974790031775849921076547086517967379677447567077954077490270662960639703220142788137961788376549759876503898462574552122155905531025801057890550246111031877685225143417860959473892563896680775383984425430784029901423875327511257166971725732975525025686369070246099620364757055283502042141201382904105359802523841726658086682004672368997984405061853532457120901468988998402710284238915523195865939938774431157946761764898065938822220788226056179381861274037053909916577723506537402754744300482575475513692124715726291646123547016422499974468674095689934770951406234099995128812031286223960709584209124695257112906717131481587519169381695765011878144410739051119930263967468290770141938204809785609755289439540058784733778197647837602355805351255407660831167714039284467568852080004380034752966558376457666313293604625037759288255514857092531926827247572695896611095595468983946922663353500550435928799861807211333487948884133373096279396846930326560818731468467435623936359406851716491253655212869745364884253370499947609515302649037627822463008799941418537736784888496390714425344000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000$

Paano tayo nagtrabaho?

Mangyaring mag-iwan ng iyong puna

Bakit kailangan matutuhan ito

Higit na maraming paraan para ayusin ang isang deck ng mga card kaysa mga atom na nasa Earth. Sa katunayan, kung halimbawa ay itinapon mo ang isang karaniwang deck ng limampu't-dalawang mga card at ilalagay mo ito sa isang row, malamang ito ang una sa lahat ng kasaysayan ng tao na ang eksaktong ayos ay nai-layout at ang huling beses ito ay mangyayari. Ang mga ganitong higanteng mga numero ay mahirap pang tuwing naiimagine at, salamat sa mga paktoryal, hindi natin kailangang subukan ito.

Ang mga Paktoryal, na ipinahayag bilang isang buong numero na sinundan ng isang exclamation point (halimbawa: $10!$ ), ay madalas na ginagamit sa matematika, na pangunahing upang matukoy ang bilang ng iba't ibang mga kumbinasyon, o mga pabagu-bago, magkakasama ng isang bagay. Sa ating halimbawa ng card, ang paktoryal ay magiging $52!$ , na pantay sa halos $8$ na may 67 mga zero.
Look at the deck next time you decide to play a game of cards. Chances are you are holding something that has never existed in that exact way before and never will again.

Mga Terminolohiya at Paksa

Factorials

Solusyon - Factorials

Hakbang-sa-hakbang na paliwanag

1. Hanapin ang paktoryal

Bakit kailangan matutuhan ito

Mga Terminolohiya at Paksa

Mga kaugnay na link

Pinakabagong Kaugnay na mga Drills na Nalutas