Addition of Binary Numbers

1-13 The sum of each of the first three combinations is obvious: 0 + 0 = 0₂ 0 + 1 = 1₂ 1 + 0 = 1₂ The fourth combination presents a different situation. The sum of 1 and 1 in any other number system is 2, but the numeral 2 does not exist in the binary system. Therefore, the sum of 1₂ and 1₂ is 10₂ (spoken as one zero base two), which is equal to 2₁₀. Study the following examples using the four combinations mentioned above: When a carry is produced, it is noted in the column of the next higher value or in the column immediately to the left of the one that produced the carry. Example: Add 1011₂ and 1101₂. Solution: Write out the problem as shown: As we noted previously, the sum of 1 and 1 is 2, which cannot be expressed as a single digit in the binary system. Therefore, the sum of 1 and 1 produces a carry: