Spend 3 hours on this problem. I know this problem comes from csapp's data lab and its newest requirement is

```
1. Integer constants 0 through 255 (0xFF), inclusive. You are
not allowed to use big constants such as 0xffffffff
....
* isTmax - returns 1 if x is the maximum, two's complement number,
* and 0 otherwise
* Legal ops: ! ~ & ^ | +
* Max ops: 10
* Rating: 1
```

So, shift operator(`<<`

/`>>`

and `0x7FFFFFFF`

from accepted answer is forbidden now)

Below is my way:

TDD-style:

```
isTmax(2147483647) == isTmax(0b011111111111...1) == 1
isTmax(2147483646) == isTmax(0b011111111111...0) == 0
isTmax(-1) == isTmax(0b111111111...1) == 0
isTmax(-2147483648) == isTmax(0b100000000...0) == 0
```

the return should be either `0`

or `1`

. In, c, `!`

+ all nonzero will return `0`

. So `!`

is a must, otherwise we cannot guarantee getting `0`

for all numbers.

### First naive try:

because `0b0111111...1`

(aka `2147483647`

) is the only argument which should make `isTmax`

return `1`

and `2147483647 + 1`

should be `10000000...0`

(aka `-2147483648`

)

`0b011111111...1 xor 0b1000000000...0`

is `0b11111111111...111`

. Because we must use `!`

, what we hope to see is `0`

(aka `0b0000000000000...0`

). Obviously, just apply *logic not*(aka `!`

) to `0b1111111...1`

), then we will get `0b000000000000`

):

```
!(~(x ^ (x + 1))
```

let's printf it

```
void print(int x)
{
printf("%d\n", !(~(x ^ (x + 1))));
}
int main() {
print (2147483647);
print(2147483646);
print(-1);
print(-2147483648);
}
```

1

0

1

0

`live demo`

Not bad, only `-1`

doesn't work as we expected.

### second try:

Let's compare `-1`

and `2147483647`

11111111111111111111111111111111

01111111111111111111111111111111

We can find `-1 + 1 = 0`

while `2147483647 + 1 = -2147483648`

. Emphasize again, what we want is diff `-1`

and `2147483647`

, because both of them return `1`

as above shows. Look back to the protety of *logic not* in c: *all nonzero will return 0*, so `!-2147483648 == 0`

and `!(-1 + 1) != 0`

. Just modify left part of `x ^ (x + 1)`

(`x`

) into `x + !(x + 1)`

. If x is `2147483647`

, `x + !(x + 1)`

will equal to `x`

.

Run again:

```
void print(int x)
{
printf("%d\n", !(~( x + !(x + 1) ^ (x + 1))));
}
int main() {
print (2147483647);
print(2147483646);
print(-1);
print(-2147483648);
}
```

1

0

0

0

`live demo`

Done!