# java bit operators

I came across this piece of code in java and will be delighted if someone can explain the logic to me.

``````public boolean name(int n) {
return ((n >> n) & 1L) > 0;
}
``````

this is a kind of check operation I guess but what boolean value will this code return. And is there an alternative to this code. I am trying my best to understand bit manipulation in java.

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Looks like the sort of thing I would write as a puzzle. I suggest you try it for different values and see what it does and try to explain it for yourself. –  Peter Lawrey Aug 10 '12 at 11:46
It is the sort of thing I would write ;) vanillajava.blogspot.co.uk/2012/01/… –  Peter Lawrey Aug 10 '12 at 11:48
@PeterLawrey Can you find a closed formula for this one? (i.e. n must be of the for n = ...) –  assylias Aug 10 '12 at 11:54
@assylias Had a go in my answer. ;) –  Peter Lawrey Aug 10 '12 at 12:02
Is there any context? Is this function actually used? –  harold Aug 10 '12 at 12:03
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`>>` is signed right shift operator, left operand is integer to be shifted and the right one is the number of bit positions to shift the integer by. Final `& 1L` operation tests the zeroth bit: the function returns true if the zeroth bit is 1. True purpose of this is unknown to me, but the resulting set for which this function returns true is dependent on the operand size, e.g. for 32bit int the piece `(n >> n)` returns non-zero result for multiples of 32 and then ...

``````32:   (n>>n): 32   (n>>n)&1L: 0
33:   (n>>n): 16   (n>>n)&1L: 0
34:   (n>>n): 8   (n>>n)&1L: 0
35:   (n>>n): 4   (n>>n)&1L: 0
36:   (n>>n): 2   (n>>n)&1L: 0
37:   (n>>n): 1   (n>>n)&1L: 1

or

192:   (n>>n): 192   (n>>n)&1L: 0
193:   (n>>n): 96   (n>>n)&1L: 0
194:   (n>>n): 48   (n>>n)&1L: 0
195:   (n>>n): 24   (n>>n)&1L: 0
196:   (n>>n): 12   (n>>n)&1L: 0
197:   (n>>n): 6   (n>>n)&1L: 0
198:   (n>>n): 3   (n>>n)&1L: 1
199:   (n>>n): 1   (n>>n)&1L: 1
``````
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For positive numbers, it seems that the function returns true iff a number is of the form:

``````sum_k (alpha_k * 2^k + d(k)), where

alpha_k = 0 or 1
k >= 5
d(k) = k for exactly one of the k where alpha_k = 1 and 0 otherwise
``````

Example:

``````alpha_k = 1 for k = 5, 0 otherwise => 32 + 5 = 37
alpha_k = 1 for k = 6, 0 otherwise => 64 + 6 = 70
alpha_k = 1 for k = 5 and 6, 0 otherwise => 32 + 5 + 64 = 101
or 32 + 64 + 6 = 102
``````

etc.

All those numbers will work:

shifting that number by itself % 32 shifts it by d(k) for the k that is not null.
the bit that goes to position 1 is in position k which is 1 by definition (alpha_k = 1)

Proving that only those numbers work is a bit more challenging...

Next question is obviously: what's the point?!

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Perhaps the point of this puzzle was to see if you would consider shifting outside 0 to 31 bits and what would happen.

It gets more bizarre for negative numbers.

``````for(int n=-70;n<=200;n++)
if (((n >> n) & 1L) > 0)
System.out.print(n + " ");
``````

prints

-70 -69 -68 -67 -66 -65 -58 -57 -56 -55 -54 -53 -52 -51 -50 -49 -48 -47 -46 -45 -44 -43 -42 -41 -40 -39 -38 -37 -36 -35 -34 -33 -27 -26 -25 -24 -23 -22 -21 -20 -19 -18 -17 -16 -15 -14 -13 -12 -11 -10 -9 -8 -7 -6 -5 -4 -3 -2 -1 37 70 101 102 135 165 167 198 199

A similar formula when `n` is an `int`

``````n & (1 << (n & 31)) != 0
``````

if `n` was a `long`

``````n & (1L << (n & 63)) != 0
``````

More negative numbers have a 1 set after shifting because they get sign extended.

A similar puzzle

http://vanillajava.blogspot.co.uk/2012/01/another-shifty-challenge.html

http://vanillajava.blogspot.co.uk/2012/01/shifting-challenge.html

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That's a bizarre piece of code. It checks whether the number `n`, having been shifted right `n % 32` bits, is odd.

The first non-negative values which pass are 37 (100101 in binary), 70 (1000110 in binary), and 101 (1100101 in binary).

I doubt that it actually works as the original coder intended it to - it doesn't obviously signify anything useful (and the method name of `name` is pretty unhelpful...)

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101 => 102...... –  assylias Aug 10 '12 at 11:39
@assylias: Nope. 101 passes too, according to my test program. 102 passes as well, but 101 passes because when 1100101b is shifted right 5 bits, you get 11b. So the first three values are 37, 70 and 101. –  Jon Skeet Aug 10 '12 at 11:40
Oops you are right, `((n >> n) & 1L)` is 3 for 101. –  assylias Aug 10 '12 at 11:41
@harold 32 would not pass: `32 >> 32 == 32` –  assylias Aug 10 '12 at 11:43
@harold: Apparently so. 32 wouldn't be shifted at all (as 32%32 == 0) so the result ends up being false. –  Jon Skeet Aug 10 '12 at 11:43
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