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Conference rusure::math

Title:Mathematics at DEC
Moderator:RUSURE::EDP
Created:Mon Feb 03 1986
Last Modified:Fri Jun 06 1997
Last Successful Update:Fri Jun 06 1997
Number of topics:2083
Total number of notes:14613

429.0. "Only one digit known problem" by MENTOR::KOSTAS () Wed Jan 15 1986 09:46

This problem is to reconstitute the division:

             xxx) xxxxxxxx ( xx8xx
                  xxxx
                  ----
                    xxxx
                     xxx
                    ----
                      xxxx
                      xxxx
                      ----

where every  x  represents some digit, initial zero excluded.
This problem may seem more difficult that the "SEND MORE MONEY" problem,
since we do not know what digits are alike and which are different.
I know of one solution I woulder if there are more than one solution
to this.

Enjoy,

Kostas G.
<><><><><>
T.RTitleUserPersonal
Name		DateLines
429.1R2ME2::GILBERTFri Jan 17 1986 12:4425
The quotient is clearly 90809.  We see that the 3-digit divisor xxx must
satisfy:
	xxx >= 100
	xxx * 8 < 1000
	xxx * 9 >= 1000
so,
	111 < xxx < 125.

We can easily test each of these divisors, checking that it satisfies:

	10 <= [90809*xxx/10000] - 9*xxx <= 99
	10 <= [90809*xxx/100] - 908*xxx <= 99

The only value of the divisor in the range that satisfies this is 124.
So, the solution is:

	124 ) 11260316 ( 90809
	      1116
	      ----
		1003
	         992
	        ----
	          1116
	          1116
	          ----
429.2Another aproach to the solution of .0THEBUS::KOSTASKostas G. Gavrielidis &lt;o.o&gt; Sat May 31 1986 18:4248
    Where two digits are brought down at one step, it is clear
    that a zero occurs in the quotient.
    
    So it is   x080x.
    
    Let us call the divisor  D. Since  8D  has but three digits,
    the other two multiples of  D  which contain four digits, must
    be each  9D,  
    
    so the quotient is  90809.
    
    A tree digit number is less than  1000.
    Hense  8D < 1000
    and so  D < 125.
    
    A six digit number is greater than 99999   and  when  9D  is
    subtracted from the dividend, a six digit number remains, and the
    division comes out without remainder.
    
    Hense  809D > 99999
    
    and so            492
              d > 123 ---
                      809.
    
    It follows that  D = 124.
    
    We have the product  124 * 90809 = 11260316
    
    so we reconstitute the division as follows:
    
         124 ) 11260316 ( 90809
               1116
               ----
                 1003
                  992
                 ----
                   1116
                   1116
                   ----
    
    Enjoy,
    
    Kostas G.