+ 13

[assignment] Check if a binary number is devisible by 7 with following rules

a binary number is devisible by 7,if it has exactly 3*n 1. For each 1 calculate modpos = position mod 3. So if a 1 is at position 4, the modpos is 1. modpos0 is the count of all 1 with modpos = 0 modpos1 is the count of all 1 with modpos = 1 modpos2 is the count of all 1 with modpos = 2. if modpos0 == modpos1 == modpos2 the binary is devisible by 7. eg b111111 1 at position 1,2,3,4,5,6 which makes modpos 1,2,0,1,2,0 modpos0 == modpos1 == modpos2 = 2 Edit: you will not find all numbers. b111111 = 63 is devisible by 7.

3rd Jun 2018, 8:29 AM
Oma Falk
Oma Falk - avatar
12 odpowiedzi
5th Jun 2018, 5:43 AM
LukArToDo
LukArToDo - avatar
+ 11
Hi Oma ! I think my code follows your rules, but it misses many numbers. When the conditions are met, the number is actually divisible by 7, but not all of the multiples of 7 will match the conditions. Or am I wrong ? https://code.sololearn.com/c0qHtxHoItGx/#py
3rd Jun 2018, 10:26 PM
Cépagrave
Cépagrave - avatar
+ 8
Cépagrave yes u are right. It is a => constraint but not <=>.
4th Jun 2018, 12:56 AM
Oma Falk
Oma Falk - avatar
3rd Jun 2018, 12:17 PM
VcC
VcC - avatar
+ 5
https://code.sololearn.com/cC094JcrxnXX/?ref=app
3rd Jun 2018, 10:38 AM
VcC
VcC - avatar
+ 5
here is my quirk solution using regex. to be precise for automate or Turing machine. I did not think that it is so cumbersome. https://code.sololearn.com/cUZ9tEhA13OA/?ref=app
4th Jun 2018, 12:13 AM
yuri
+ 4
bool div7(unsigned n){ unsigned mods[3] = {0}; while(n){ for(int i = 0; i < 3; ++i) mods[i] += (n & (1 << i)) >> i; n >>= 3; } return mods[0] == mods[1] && mods[0] == mods[2]; }
3rd Jun 2018, 10:40 AM
Baptiste E. Prunier
Baptiste E. Prunier - avatar
3rd Jun 2018, 11:39 AM
‎ ‏‏‎Anonymous Guy
+ 4
very nice the algorithm
3rd Jun 2018, 12:38 PM
Ahmed Zaki
+ 3
yuri awfully inefficient but really cool
4th Jun 2018, 7:34 AM
VcC
VcC - avatar
+ 2
Oma Falk we are able to code it in CSS, JS, Python, C++, Kotlin, java, C# and ruby, right?
5th Jun 2018, 8:51 AM
DengSXCreates
DengSXCreates - avatar
0
This Works! It's Faster! A binary number is divisible by 7, if you group the digits into sets of 3 each, sum all grouped digits and check if this sum is divisible by 7. (use zeroes to fill in the leading digit gaps, as is obvious)
13th Mar 2023, 9:08 PM
Ramgopal