# how to calculate bitwise OR using AND, XOR and shift?

The question seems pretty well formulated

I have a virtual machine which implements only AND, XOR, SHL and SHR, yet I have to do a "OR 0x01" operation.

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sounds like a homework question – oefe Mar 14 '10 at 17:20
I don't need a solution, only an idea at least. It is a homework, but frankly I'm already doing more than I need to solve the problem. For instance, I've invented a calling convention to better modularize my code. So the question itself is not the homework per se, only something I need to know. @KennyTM:it's a 16-bit machine – Flavius Mar 14 '10 at 17:22
@KennyTM:it's a 16-bit machine – Flavius Mar 14 '10 at 17:26

First of all having a correct bitwise computation for the following two variables is sufficient, because they cover all combinations:
A=0101
B=0011

We want
0101
0011
A or B
0111

for xor we get

0101
0011
A xor B
0110

for and we get

0101
0011
A and B
0001

so if we connect them with an xor we are done.

(A xor B) xor (A and B)

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``````a xor b = ((not a) and b) or (a and (not b))
``````

and unleash some boolean algebra on that until it looks like

``````a or b = <expression using only and, xor>
``````

Admittedly, this is probably more work to actually do than going the "try every conceivable bit combination" route, but then you did ask for homework solution ideas. :)

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Thank You, nice explanation – Flavius Mar 14 '10 at 18:41

The truth table as summarized on Wikipedia here and gasp, basic CS 101 stuff, De Morgan's Law....

```AND
0 & 0   0
0 & 1   0
1 & 0   0
1 & 1   1

OR
0 | 0   0
0 | 1   1
1 | 0   1
0 | 0   1

XOR
0 ^ 0   0
0 ^ 1   1
1 ^ 0   1
1 ^ 1   0
```

A Shift Left involves shifting the bits across from right to left, suppose:

```+-+-+-+-+-+-+-+-+
|7|6|5|4|3|2|1|0|
+-+-+-+-+-+-+-+-+
|0|0|0|0|0|1|0|0| = 0x4 hexadecimal or 4 decimal or 100 in binary
+-+-+-+-+-+-+-+-+

Shift Left by 2 places becomes
+-+-+-+-+-+-+-+-+
|7|6|5|4|3|2|1|0|
+-+-+-+-+-+-+-+-+
|0|0|0|1|0|0|0|0| = 0x10 hexadecimal or 16 decimal or 10000 in binary
+-+-+-+-+-+-+-+-+

Shift Right by 1 places becomes
+-+-+-+-+-+-+-+-+
|7|6|5|4|3|2|1|0|
+-+-+-+-+-+-+-+-+
|0|0|0|0|1|0|0|0| = 0x8 hexadecimal or 8 decimal or 1000 in binary
+-+-+-+-+-+-+-+-+
```

Then it is a matter of combining the bit-wise operations according to the truth table above...

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I would just expand DeMorgan's law: `A or B = not(not A and not B)`. You can compute `not` by XORing with all 1 bits.

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