# increment single digit (msb) for a given integer

for a given number

``````unsigned int a = 1203;
``````

Increment the Most significant decimal digit only so for above sample

``````a = 2203;
``````

How can this be achieved?

i started like this

``````for (n=a; n; n/=10){ b = n%10;}
``````

This gives msb then increment b++;

But failed to put back the whole number?

Is there any alternative like a&0xf000 which gives msb but the integer can be anything in a range of 0 - INT_MAX?

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integer overflow is implementation dependent, you knows about this na?? – Grijesh Chauhan Jul 23 '13 at 11:50
That's a very non-standard definition of MSB, usually it means the Most Significant Bit (or Byte), and that's definitely not what you're describing. – harold Jul 23 '13 at 11:50
You mean "most significant decimal digit", presumably. And basically you figure out how many digits and add 1/10/100/1000/whatever based on that length. Several ways to do this, depending on how fancy you want to get. – Hot Licks Jul 23 '13 at 11:54
to clarify instead of MSB it should be most significant digit and yes overflow can happen but ignore it – czar x Jul 23 '13 at 11:55

## 3 Answers

You were actually pretty close.

``````int x = 1;
for (n=a; n; n/=10) {
x *= 10;
}
a += x;
``````
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Thanks, minor correction either we have to reduce the x by 10 or the loop should be one less check here ideone.com/PL6TG2 – czar x Jul 23 '13 at 12:07
@czarx - Yeah, I didn't work it through carefully. I figured you were close enough that you could figure out the rest, if it wasn't quite right. – Hot Licks Jul 23 '13 at 12:39

A variant without the extra variable n:

``````int x = 1;
while (x <= a/10) x *= 10;
a += x;
``````

(Edit) This should be slightly faster, as it removes d divisions in the comparing loop and adds only a single one after it:

``````int x = 1;
while (x <= a) x *= 10;
x /= 10;
a += x;
``````
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thanks i liked the second one – czar x Jul 24 '13 at 4:44

The only solution is to figure out how many digits you have (typically by dividing by 10 - or whatever the base is) - and when you have the highest digit, add 1 to it, and re-assemble the number (or figure out what number is 1 more to the highest digit, but you still need to know how many digits you have).

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