# Number of bytes to encode a number

This might be a beginner Java question but I would like to be able to calculate the number bytes it will require to store a whole number. And to convert that number into a byte array. Its do with some TLV encoding that I am performing. I realise that Java stores everything in twos completement but I am ignoring that, I am just interested in keeping the binary representation.

For example, if you had the number 256 it would take 2 bytes (as 1 byte can store 2^8-1, i think) then I would like to convert that number into a byte array.

Where:

byte[0] = 1111 1111

byte[1] = 0000 0001

Thanks for any help.

-
Actually, `bytes[0] = 0000 0000` and `bytes[1] = 0000 0001`. The number represented by your `bytes[]` is `511` (decimal) –  Stephen C Apr 29 '11 at 11:54
If you are only storing unsigned values starting at 0, then you can store 256 in 9 bits, not 8. If you need to store a signed value that includes +256 then you need 1 more bit. –  Mike Samuel Apr 29 '11 at 11:56

Since Java only contains log10, you have to first convert it to log2. Consider the definition of change of base

We can then write Math.ceil(Math.log(256) / Math.log(2)) for the suggested answers... For instance, you would need 9 bits to save 256 or 2 bytes:

``````    System.out.println(Integer.toBinaryString(256));
int numberBits = (int) Math.ceil(Math.log(256) / Math.log(2)) + 1;
int numberBytes = (int) (Math.ceil(Math.log(256) / Math.log(2)) / 8) + 1;
System.out.println(numberBits);
System.out.println(numberBytes);

100000000
9
2
``````

I was just intrigued in how to get the byte[] of your requirement (to have them in revert order)... I started the implementation of the following test class with a char[]. Then, it came to my mind you could also a BitSet if you need operations over the bit set.

``````import java.io.IOException;
import java.util.ArrayList;
import java.util.Arrays;
import java.util.BitSet;
import java.util.List;

public class TestRevertBitSet {

public static class RevertableBitSet {

private BitSet bitSet;
private boolean flipped;

private RevertableBitSet(BitSet bitSet) {
this.bitSet = bitSet;
}

public static RevertableBitSet makeNew(char[] bitArray) {
BitSet byteValue = new BitSet(bitArray.length);
for (int i = 0; i < bitArray.length; i++) {
if (bitArray[i] == '1') {
byteValue.flip(i);
}
}
RevertableBitSet r = new RevertableBitSet(byteValue);
if (r.hasZeroCardinality()) {
r.flipAllBitsTrue();

} else {
r.revertBitsOrder();
}
return r;
}

public boolean hasAllBitsFlip() {
return this.flipped;
}

/**
* @return if all the bits are set.
*/
public boolean hasZeroCardinality() {
return this.bitSet.cardinality() == 0;
}

/**
* Flips all bits from the given bitSet to true.
*/
public void flipAllBitsTrue() {
this.bitSet.set(0, this.bitSet.size());
this.flipped = true;
}

/**
* Reverts the bits sequence. For instance, from 01100 to 00110.
*/
public void revertBitsOrder() {
for (int i = 0; i < 4; i++) {
boolean nthBit = this.bitSet.get(i);
this.bitSet.set(i, this.bitSet.get(7 - i));
this.bitSet.set(7 - i, nthBit);
}
}

/**
* @return a char array with values based on the bit indexes of the
*         given bit set.
*/
public char[] toCharArray() {
char[] bitChars = new char[8];
for (int i = 0; i < bitChars.length; i++) {
bitChars[i] = bitSet.get(i) ? '1' : '0';
}
return bitChars;
}

/**
* @param bitIndex
* @return the boolean value of the given bit index.
*/
public boolean getBitBooleanAtIndex(int bitIndex) {
if (bitIndex > 7) {
return false;
}
return this.bitSet.get(bitIndex);
}

/**
* @param byteSetsList
*            is the list of BitSet.
* @return the integer representation of the entire bit set.
*/
public static int convertSetToInteger(
List<RevertableBitSet> byteSetsList) {
int sum = 0;
int index = 0;
for (RevertableBitSet bitSet : byteSetsList) {
if (bitSet.hasAllBitsFlip()) {
for (int i = 0; i < 8; i++) {
index++;
}
continue;
}
for (int i = 7; i >= 0; i--) {
int bit = bitSet.getBitBooleanAtIndex(i) ? 1 : 0;
int intValue = (int) Math.pow((double) 2, (double) index++)
* bit;
sum = sum + intValue;
}
}
return sum;
}

@Override
public String toString() {
StringBuilder b = new StringBuilder();
b.append("[ ");
for (int i = 0; i < 7; i++) {
b.append(i);
b.append(" , ");
}
b.delete(0, b.length() - 2);
b.append(" ]");
return b.toString();
}
}

public static void main(String[] args) throws IOException {

int decimalNumber = 256;
System.out.println("Decimal Number: " + decimalNumber);
System.out.println(Integer.toBinaryString(decimalNumber));
int numberBits = (int) Math.ceil(Math.log(decimalNumber) / Math.log(2)) + 1;
int numberBytes = (int) (Math.ceil(Math.log(decimalNumber)
/ Math.log(2)) / 8) + 1;
System.out.println("Number of bits: " + numberBits);
System.out.println("Number of bytes: " + numberBytes);

List<RevertableBitSet> bytesSet = new ArrayList<RevertableBitSet>();

int bitsCounter = -1;
char[] binaryChars = Integer.toBinaryString(decimalNumber)
.toCharArray();
char[] currentChars = new char[8];
Arrays.fill(currentChars, '0');
for (int i = binaryChars.length - 1; i >= 0; i--) {
if (bitsCounter + 1 <= 7) {
currentChars[++bitsCounter] = binaryChars[i];

} else {
RevertableBitSet bitSet = RevertableBitSet
.makeNew(currentChars);

bitsCounter = -1;
Arrays.fill(currentChars, '0');
currentChars[++bitsCounter] = binaryChars[i];
}
}

System.out.println("------------");

for (RevertableBitSet bitSet : bytesSet) {
System.out.println(Arrays.toString(bitSet.toCharArray()));
}

System.out.println("------------");
System.out.println("Number: "
+ RevertableBitSet.convertSetToInteger(bytesSet));
}
}
``````

The output of the execution of the main method is:

``````Decimal Number: 256
100000000
Number of bits: 9
Number of bytes: 2
------------
[1, 1, 1, 1, 1, 1, 1, 1]
[0, 0, 0, 0, 0, 0, 0, 1]
------------
Number: 256
``````

Larger numbers as well work...

``````Decimal Number: 33456176
1111111101000000000110000
Number of bits: 26
Number of bytes: 4
------------
[0, 0, 1, 1, 0, 0, 0, 0]
[1, 0, 0, 0, 0, 0, 0, 0]
[1, 1, 1, 1, 1, 1, 1, 0]
[0, 0, 0, 0, 0, 0, 0, 1]
------------
Number: 33456176
``````
-
You can use `Math.ceil(Math.log(number) / Math.log(2))` to get number of `bits` to store your number in binary format. Devide by 8 and you will get `bytes` to store your number.
To clarify, "divide by 8" means `Math.ceil(bits / 8.0)` or `(bits + 7 / 8)`. If the value has to be stored signed, you need an extra bit for that: en.wikipedia.org/wiki/Two's_complement –  Mike Samuel Apr 29 '11 at 11:54
That is right, the same I mean `Math.ceil(Math.ceil(Math.log(number, 2)) / 8.0)`. You will get minimal number of bytes to store number. –  Anatolij Apr 29 '11 at 11:58
log2 will give you real number. You need to get `(int)log2(num) + 1` –  Anatolij Apr 29 '11 at 11:53