# K&R Exercise 2-7, optimisations?

I'm currently learning C with "The C Programming Language" from K&R. I solved the exercise 2-7, which says:

Write a function `invert(x,p,n)` that returns `x` with the `n` bits that begin at position `p` inverted (i.e., 1 changed into 0 and vice versa), leaving the other bits unchanged.

Here is my code (I voluntarily used chars here):

``````#include <stdio.h>

#define NUMBER   235
#define POSITION 2
#define AMOUNT   4

unsigned invert(unsigned char x, char p, char n)
{
unsigned char bitsToInvert = 0, i;

for (i = 1; i < n; i++) { // Make a number n-bits width, full of 1
bitsToInvert |= 1;
bitsToInvert <<= 1;
}
bitsToInvert |= 1;

bitsToInvert <<= p;

x ^= bitsToInvert;

return x;
}

int main()
{
printf("%d\n", invert(NUMBER, POSITION, AMOUNT));
}
``````

Is there any optimisation I could bring to my code? Especially on the `for` loop which create a number of `n` 1 bits? Thanks!

• `2^n - 1` or `(1<<n) -1` will give you last n bits set. :) Commented Dec 26, 2014 at 10:47
• you should have at-least used `unsigned chars`. Commented Dec 26, 2014 at 11:00
• There is an other exercise that asks you to set a range of bits, this is just a xor with that. Commented Dec 26, 2014 at 11:01
• Here is a solution : clc-wiki.net/wiki/K%26R2_solutions:Chapter_2:Exercise_7
– SVN
Commented Dec 26, 2014 at 11:27

`2^n - 1` is always a number with all `n` LSB bits set.

For eg:

``````2 ^ 3 - 1 = 7  => 111
2 ^ 5 - 1 = 31 => 11111
``````

In your case, you can do away with the for loop to construct this number by simply saying:

``````bitsToConvert = (1<<n) - 1;
``````

Dont forget to take care of extreme situations.

• Thanks, I didn't think enough about it. ^^ Commented Dec 28, 2014 at 13:23

An alternative to what Thrustmaster said, that would work for any "n" without the need for specifying it, would be using a bitwise not on an empty value.

``````variable = ~(variable ^ variable);
``````