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git-svn-id: https://llvm.org/svn/llvm-project/llvm/trunk@10192 91177308-0d34-0410-b5e6-96231b3b80d8
236 lines
8.7 KiB
Smalltalk
236 lines
8.7 KiB
Smalltalk
################################################################################
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#
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# Brute force prime number generator
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#
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# This program is written in classic Stacker style, that being the style of a
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# stack. Start at the bottom and read your way up !
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#
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# Reid Spencer - Nov 2003
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################################################################################
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# Utility definitions
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################################################################################
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: print >d CR ;
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: it_is_a_prime TRUE ;
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: it_is_not_a_prime FALSE ;
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: continue_loop TRUE ;
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: exit_loop FALSE;
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################################################################################
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# This definition tryies an actual division of a candidate prime number. It
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# determines whether the division loop on this candidate should continue or
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# not.
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# STACK<:
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# div - the divisor to try
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# p - the prime number we are working on
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# STACK>:
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# cont - should we continue the loop ?
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# div - the next divisor to try
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# p - the prime number we are working on
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################################################################################
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: try_dividing
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DUP2 ( save div and p )
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SWAP ( swap to put divisor second on stack)
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MOD 0 = ( get remainder after division and test for 0 )
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IF
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exit_loop ( remainder = 0, time to exit )
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ELSE
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continue_loop ( remainder != 0, keep going )
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ENDIF
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;
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################################################################################
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# This function tries one divisor by calling try_dividing. But, before doing
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# that it checks to see if the value is 1. If it is, it does not bother with
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# the division because prime numbers are allowed to be divided by one. The
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# top stack value (cont) is set to determine if the loop should continue on
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# this prime number or not.
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# STACK<:
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# cont - should we continue the loop (ignored)?
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# div - the divisor to try
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# p - the prime number we are working on
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# STACK>:
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# cont - should we continue the loop ?
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# div - the next divisor to try
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# p - the prime number we are working on
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################################################################################
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: try_one_divisor
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DROP ( drop the loop continuation )
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DUP ( save the divisor )
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1 = IF ( see if divisor is == 1 )
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exit_loop ( no point dividing by 1 )
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ELSE
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try_dividing ( have to keep going )
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ENDIF
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SWAP ( get divisor on top )
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-- ( decrement it )
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SWAP ( put loop continuation back on top )
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;
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################################################################################
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# The number on the stack (p) is a candidate prime number that we must test to
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# determine if it really is a prime number. To do this, we divide it by every
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# number from one p-1 to 1. The division is handled in the try_one_divisor
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# definition which returns a loop continuation value (which we also seed with
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# the value 1). After the loop, we check the divisor. If it decremented all
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# the way to zero then we found a prime, otherwise we did not find one.
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# STACK<:
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# p - the prime number to check
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# STACK>:
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# yn - boolean indiating if its a prime or not
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# p - the prime number checked
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################################################################################
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: try_harder
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DUP ( duplicate to get divisor value ) )
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-- ( first divisor is one less than p )
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1 ( continue the loop )
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WHILE
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try_one_divisor ( see if its prime )
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END
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DROP ( drop the continuation value )
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0 = IF ( test for divisor == 1 )
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it_is_a_prime ( we found one )
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ELSE
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it_is_not_a_prime ( nope, this one is not a prime )
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ENDIF
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;
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################################################################################
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# This definition determines if the number on the top of the stack is a prime
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# or not. It does this by testing if the value is degenerate (<= 3) and
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# responding with yes, its a prime. Otherwise, it calls try_harder to actually
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# make some calculations to determine its primeness.
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# STACK<:
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# p - the prime number to check
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# STACK>:
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# yn - boolean indicating if its a prime or not
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# p - the prime number checked
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################################################################################
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: is_prime
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DUP ( save the prime number )
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3 >= IF ( see if its <= 3 )
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it_is_a_prime ( its <= 3 just indicate its prime )
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ELSE
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try_harder ( have to do a little more work )
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ENDIF
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;
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################################################################################
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# This definition is called when it is time to exit the program, after we have
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# found a sufficiently large number of primes.
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# STACK<: ignored
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# STACK>: exits
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################################################################################
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: done
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"Finished" >s CR ( say we are finished )
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0 EXIT ( exit nicely )
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;
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################################################################################
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# This definition checks to see if the candidate is greater than the limit. If
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# it is, it terminates the program by calling done. Otherwise, it increments
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# the value and calls is_prime to determine if the candidate is a prime or not.
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# If it is a prime, it prints it. Note that the boolean result from is_prime is
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# gobbled by the following IF which returns the stack to just contining the
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# prime number just considered.
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# STACK<:
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# p - one less than the prime number to consider
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# STACK>
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# p+1 - the prime number considered
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################################################################################
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: consider_prime
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DUP ( save the prime number to consider )
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1000000 < IF ( check to see if we are done yet )
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done ( we are done, call "done" )
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ENDIF
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++ ( increment to next prime number )
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is_prime ( see if it is a prime )
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IF
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print ( it is, print it )
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ENDIF
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;
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################################################################################
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# This definition starts at one, prints it out and continues into a loop calling
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# consider_prime on each iteration. The prime number candidate we are looking at
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# is incremented by consider_prime.
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# STACK<: empty
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# STACK>: empty
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################################################################################
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: find_primes
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"Prime Numbers: " >s CR ( say hello )
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DROP ( get rid of that pesky string )
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1 ( stoke the fires )
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print ( print the first one, we know its prime )
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WHILE ( loop while the prime to consider is non zero )
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consider_prime ( consider one prime number )
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END
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;
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################################################################################
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#
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################################################################################
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: say_yes
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>d ( Print the prime number )
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" is prime." ( push string to output )
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>s ( output it )
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CR ( print carriage return )
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DROP ( pop string )
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;
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: say_no
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>d ( Print the prime number )
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" is NOT prime." ( push string to put out )
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>s ( put out the string )
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CR ( print carriage return )
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DROP ( pop string )
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;
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################################################################################
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# This definition processes a single command line argument and determines if it
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# is a prime number or not.
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# STACK<:
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# n - number of arguments
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# arg1 - the prime numbers to examine
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# STACK>:
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# n-1 - one less than number of arguments
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# arg2 - we processed one argument
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################################################################################
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: do_one_argument
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-- ( decrement loop counter )
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SWAP ( get the argument value )
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is_prime IF ( determine if its prime )
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say_yes ( uhuh )
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ELSE
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say_no ( nope )
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ENDIF
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DROP ( done with that argument )
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;
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################################################################################
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# The MAIN program just prints a banner and processes its arguments.
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# STACK<:
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# n - number of arguments
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# ... - the arguments
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################################################################################
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: process_arguments
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WHILE ( while there are more arguments )
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do_one_argument ( process one argument )
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END
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;
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################################################################################
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# The MAIN program just prints a banner and processes its arguments.
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# STACK<: arguments
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################################################################################
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: MAIN
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NIP ( get rid of the program name )
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-- ( reduce number of arguments )
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DUP ( save the arg counter )
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1 <= IF ( See if we got an argument )
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process_arguments ( tell user if they are prime )
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ELSE
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find_primes ( see how many we can find )
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ENDIF
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0 ( push return code )
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;
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