Difference between revisions of "ZCubes/Twin Primes & Bruns Theorem"
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==Code== | ==Code== | ||
− | + | ||
− | + | PRIMES(1000) | |
− | + | --> displays first 1000 prime numbers | |
+ | |||
+ | ps=PRIMES(1000) | ||
+ | .filter((x,i,d)=>d[i]-d[i-1]==2) | ||
+ | .$("[x-2,x]") | ||
+ | --> above code filters the first 1000 primes to check if the difference between two prime numbers is '2' and displays the list of twin primes as (3 5), (5,7), (11,13) etc | ||
+ | This list is stored as a table named 'ps'. Using the below code statement, this table is further used to map it to the reciprocals of the twin primes and add them. | ||
+ | |||
ps.map(r=>1/r[0]+1/r[1])~ | ps.map(r=>1/r[0]+1/r[1])~ | ||
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<br/> | <br/> | ||
− | © Copyright 1996- | + | *[[Z3 | Z3 home]] |
+ | *[[Z^3 Language Documentation]] | ||
+ | *[[ZCubes_Videos | ZCubes Videos and Tutorials]] | ||
+ | *[[Main_Page | About ZCubes ]] | ||
+ | <br/> | ||
+ | <br/> | ||
+ | © Copyright 1996-2021, ZCubes, Inc. |
Latest revision as of 00:29, 11 March 2021
Twin Primes & Bruns Theorem
Twin primes are prime numbers separated by 2. Viggo Bruns theorem states that sum of reciprocals of twin primes is convergent. This video demonstrates how to test this theorem, using ZCubes. You will observe that the computation is simple and easy in ZCubes, as it takes only 4 lines of code.
Video
Code
PRIMES(1000)
--> displays first 1000 prime numbers
ps=PRIMES(1000) .filter((x,i,d)=>d[i]-d[i-1]==2) .$("[x-2,x]")
--> above code filters the first 1000 primes to check if the difference between two prime numbers is '2' and displays the list of twin primes as (3 5), (5,7), (11,13) etc This list is stored as a table named 'ps'. Using the below code statement, this table is further used to map it to the reciprocals of the twin primes and add them.
ps.map(r=>1/r[0]+1/r[1])~
© Copyright 1996-2021, ZCubes, Inc.