Independence Day weekend puzzler
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Inspired by an assignment in my son's Java programming class:
Write a one-liner that takes as input an array of numbers (e.g. x = [1 2 3]) and which outputs an array of integers that is "incremented" properly, (in this case, y = [1 2 4]).
Examples of proper input/output:
x = [1 9 1 9] ----> y = [1 9 2 0]
and
x = [9 9 9] ----> y = [1 0 0 0]
No semicolons allowed in your one line!
7 Comments
Fangjun Jiang
on 3 Jul 2011
I need a little clarification. As if the output is 124=123+1, 1920=1919+1 and 1000=999+1? What if your input is [1 2 34], should the output be [1 2 35] or [1 2 3 5]?
the cyclist
on 3 Jul 2011
David Young
on 4 Jul 2011
How big can the array be? For example, should the answer work correctly for x=repmat(9, 1, 100)?
David Young
on 4 Jul 2011
Sorry, the example isn't stringent enough: I mean x=repmat(9,1,1000).
the cyclist
on 4 Jul 2011
Paulo Silva
on 4 Jul 2011
+1 vote for the interesting puzzler, it's the first vote!
Please vote on it if you found it interesting and you want more of them.
Fangjun Jiang
on 4 Jul 2011
Sure. +1
Accepted Answer
Fangjun Jiang
on 3 Jul 2011
I like this Golf challenge. Inspired by Paulo's entry.
num2str(str2num(sprintf('%d',x))+1)-'0'
is shorter.
More Answers (8)
Jan
on 3 Jul 2011
My submission is neither a one-liner nor free of semicolons. But the total number of lines and semicolons is less than in STR2NUM and NUM2STR, which have 86 and 217 lines and call INT2STR in addtion.
n = length(x);
q = find(x ~= 9, 1, 'last');
if isempty(q) % [9, 9, 9, ...]
x = 1;
x(n + 1) = 0; % or x = [1, zeros(1, n)]
else % Any non-9 is found
x = [x(1:q - 1), x(q) + 1, zeros(1, n - q)];
end
1 Comment
David Young
on 4 Jul 2011
This works for long vectors (thousands of elements).
bym
on 3 Jul 2011
kind of a hybrid:
sprintf('%d',sum(x.*10.^(numel(x)-1:-1:0))+1)-'0'
5 Comments
Jan
on 3 Jul 2011
+1: This does not call other M-functions, therefore it is the one-linest one-liner yet.
Andrei Bobrov
on 4 Jul 2011
num2str(10.^(numel(x)-1:-1:0)*x'+1)-'0'
David Young
on 4 Jul 2011
Jan: my earlier answer uses only built-in functions.
Jan
on 4 Jul 2011
@David: Which one is your earlier answer?
David Young
on 4 Jul 2011
@Jan: The one that starts with a call to diff
Andrei Bobrov
on 3 Jul 2011
str2num(num2str(10.^(length(x)-1:-1:0)*x'+1)')'
ADD
z = 10.^(numel(x)-1:-1:0)*x'+1
y = round(rem(fix(z.*10.^-(fix(log10(z)):-1:0))*.1,1)*10)
2 Comments
bym
on 4 Jul 2011
+1 vote for the 'z' solution; compact & elegant
Andrei Bobrov
on 4 Jul 2011
@proecsm, thanks!
David Young
on 3 Jul 2011
One-liner, avoiding string operations:
diff([0 (floor((sum(x.*10.^(length(x)-1:-1:0))+1) ./ 10.^(floor(log10(sum(x.*10.^(length(x)-1:-1:0))+1)):-1:0))) .* 10.^(floor(log10(sum(x.*10.^(length(x)-1:-1:0))+1)):-1:0)]) ./ 10.^(floor(log10(sum(x.*10.^(length(x)-1:-1:0))+1)):-1:0)
EDIT: This is only one line of code, even though formatting on the Answers web page makes it look like 4 lines.
3 Comments
David Young
on 4 Jul 2011
This fails if there are more than about 16 elements in the vector, because you only get about 16 significant figures in a double.
Jan
on 4 Jul 2011
+1: A one-liner without calls to other M-files and therefore even no hidden semicolons.
David Young
on 4 Jul 2011
Thanks Jan!
Paulo Silva
on 3 Jul 2011
x=[1 2 3]; %example input
xr=num2str(str2num(strrep(num2str(x),' ',''))+1)-'0'
%xr =[1 2 3 4]
the cyclist
on 3 Jul 2011
David Young
on 4 Jul 2011
Also one line of code (formatting for the web page will display it over more than one line of text):
double(regexprep(char(x), {['([' char(0:8) ']?)(' char(9) '*)$'] ['^(' char(0) '+)$']}, {'${char($1+1)}${regexprep($2,char(9),char(0))}' [char(1) '$1']}))
1 Comment
David Young
on 4 Jul 2011
This one works for long vectors with thousdands of elements (my arithmetic-based solution doesn't).
David Young
on 4 Jul 2011
I'm sorry about this one - it's somewhat over the top, and I promise I won't do any more. However, since I think it's a different approach to the others (arithmetic operations but no powers of 10!), here it is:
[ones(1, sum(x)==9*length(x)) x(1:length(x)-sum(cumsum(fliplr(x)) == 9*(1:length(x)))-1) repmat(x(max(1, length(x)-sum(cumsum(fliplr(x)) == 9*(1:length(x)))))+1, 1, sum(x)~=9*length(x)) zeros(1, sum(cumsum(fliplr(x)) == 9*(1:length(x))))]
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on 3 Jul 2011
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