Find Greatest Common Divisor of 83 and 47, using Euclidean algorithm.

Answer

The GCD of given numbers is 1.

Step 1 :
Divide $ 83 $ by $ 47 $ and get the remainder

$$ 83 : 47 = 1 \text{ ( remainder is } \color{blue}{ 36 } \text{ ) } $$

The remainder is positive ($ 36 > 0 $), so we will continue with division.

Step 2 :
Divide $ 47 $ by $ \color{blue}{ 36 } $ and get the remainder

$$ 47 : 36 = 1 \text{ ( remainder is } \color{blue}{ 11 } \text{ ) } $$

The remainder is still positive ($ 11 > 0 $), so we will continue with division.

Step 3 :
Divide $ 36 $ by $ \color{blue}{ 11 } $ and get the remainder

$$ 36 : 11 = 3 \text{ ( remainder is } \color{blue}{ 3 } \text{ ) } $$

The remainder is still positive ($ 3 > 0 $), so we will continue with division.

Step 4 :
Divide $ 11 $ by $ \color{blue}{ 3 } $ and get the remainder

$$ 11 : 3 = 3 \text{ ( remainder is } \color{blue}{ 2 } \text{ ) } $$

The remainder is still positive ($ 2 > 0 $), so we will continue with division.

Step 5 :
Divide $ 3 $ by $ \color{blue}{ 2 } $ and get the remainder

$$ 3 : 2 = 1 \text{ ( remainder is } \color{blue}{ 1 } \text{ ) } $$

The remainder is still positive ($ 1 > 0 $), so we will continue with division.

Step 6 :
Divide $ 2 $ by $ \color{blue}{ 1 } $ and get the remainder

$$ 2 : \color{blue}{ \boxed { 1 }} = 2 \text{ ( remainder is } \color{blue}{ 0 } \text{ ) } $$

The remainder is zero => GCD is the last divisor $ \color{blue}{ \boxed { 1 }} $.

We can summarize an algorithm into a following table.

This solution can be visualized using a Venn diagram.

The GCD equals the product of the numbers at the intersection.

This page was created using

GCD Calculator