What is GCD(83, 95)?
The GCD (Greatest Common Divisor) is the largest number that can divide two (or more) numbers without leaving a remainder.
The GCD of 83 and 95 is 1.
How to compute GCD(83, 95)
Comparing the divisors of 83 and 95
This first method consists in listing the divisors of the two numbers and then identifying the largest one they have in common.
Divisors of 83:
1, 83
Divisors of 95:
1, 5, 19, 95
We can see from these two lists that the greatest divisor they have in common is: 1
For small numbers, this can be done quickly. However, as numbers increase, the list of potential divisors grows longer, making this method cumbersome and less practical.
Euclid's algorithm
Fortunately, there's a much more efficient method: Euclid's algorithm. It's particularly well-suited to larger numbers. Here's how it works:
- Divide 95 by 83. The quotient is 1 and the remainder is 12.
- The previous divisor (83) is now the dividend. The remainder (12) is the new divisor. Divide 83 by 12. The quotient is 6 and the remainder is 11.
- The previous divisor (12) is now the dividend. The remainder (11) is the new divisor. Divide 12 by 11. The quotient is 1 and the remainder is 1.
- The previous divisor (11) is now the dividend. The remainder (1) is the new divisor. Divide 11 by 1. The quotient is 11 and the remainder is 0.
- When you reach a remainder of 0, the last divisor (in this case, 1) is the GCD.