# Bitwise Operations — Arithmetic Operations

Can you please explain the below lines, with some good examples.

A left arithmetic shift by n is equivalent to multiplying by 2n (provided the value does not overflow).

And:

A right arithmetic shift by n of a two's complement value is equivalent to dividing by 2n and rounding toward negative infinity. If the binary number is treated as ones' complement, then the same right-shift operation results in division by 2n and rounding toward zero.

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sounds like homework to me. –  nornagon May 10 '10 at 6:35
Also, I'm not sure where you got this quote from, but a left arithmetic shift by n is equivalent to multiplying by 2^n (not 2n). Similarly for right arithmetic shift. –  Chris Schmich May 10 '10 at 6:55
I added the awesomeness that is <sup> tags, since this question really deserved it. –  unwind May 10 '10 at 7:11

I will explain what happens in a base that we're more familiar with: 10.

In base 10, let's say you have a number N=123. Now, you "shift" this number to the left k=3 positions, filling the emptied digits with 0. So you get X=123000.

Note that X = N * 10k.

The case with base 2 is analogous.

`````` Example 1 (base 10)   |  Example 2 (base 2)
|
N        =    123     |  N       =   110101 (53 in base 10)
k        =      3     |  k       =        2 (in base 10)
N << k   = 123000     |  N << k  = 11010100 (212 in base 10)
|
10^k     =   1000     |  2^k     =      100 (in base 2; 4 in base 10)
N * 10^k = 123000     |  N * 2^k = 11010100 (53 * 4 = 212 in base 10)
|
``````

The case with right shift is simply a mirror of the process, and is also analogous in base 10. For example, if I have 123456 in base 10, and I "shift" right 3 positions, I get 123. This is 123456 / 1000 (integer division), where 1000 = 103.

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Any Good website or document, on Problems on Bit Manipulations.... Need it for good understanding of it.. –  AGeek May 10 '10 at 14:09
Right shift becomes more interesting when you look at negative numbers. The sign bit is extended, and you end up with the weird-looking behavior of `-1 >> n` being equal to -1 but `1 >> n` being equal to 0 (for any positive `n`). –  tomlogic May 10 '10 at 16:37
Consider five which is `101` in binary. Left shift it once and you get `1010` which is binary for ten. Do it again and you get `10100` which is twenty and so on..