Highest Common Factor of 367, 930 using Euclid's algorithm

Highest common factor or Highest common divisor (hcd) can be calculated by Euclid's algotithm.

Highest common factor (HCF) of 367, 930 is 1.

Step 1: Since 930 > 367, we apply the division lemma to 930 and 367, to get

930 = 367 x 2 + 196

Step 2: Since the reminder 367 ≠ 0, we apply division lemma to 196 and 367, to get

367 = 196 x 1 + 171

Step 3: We consider the new divisor 196 and the new remainder 171, and apply the division lemma to get

196 = 171 x 1 + 25

We consider the new divisor 171 and the new remainder 25,and apply the division lemma to get

171 = 25 x 6 + 21

We consider the new divisor 25 and the new remainder 21,and apply the division lemma to get

25 = 21 x 1 + 4

We consider the new divisor 21 and the new remainder 4,and apply the division lemma to get

21 = 4 x 5 + 1

We consider the new divisor 4 and the new remainder 1,and apply the division lemma to get

4 = 1 x 4 + 0

The remainder has now become zero, so our procedure stops. Since the divisor at this stage is 1, the HCF of 367 and 930 is 1

Notice that 1 = HCF(4,1) = HCF(21,4) = HCF(25,21) = HCF(171,25) = HCF(196,171) = HCF(367,196) = HCF(930,367) .

Here are some samples of HCF using Euclid's Algorithm calculations.

• HCF of 156, 422
• HCF of 705, 151
• HCF of 522, 853
• HCF of 508, 336
• HCF of 514, 230

1. What is the Euclid division algorithm?

Answer: Euclid's Division Algorithm is a technique to compute the Highest Common Factor (HCF) of given positive integers.

2. what is the HCF of 367, 930?

Answer: HCF of 367, 930 is 1 the largest number that divides all the numbers leaving a remainder zero.

3. How to find HCF of 367, 930 using Euclid's Algorithm?

Answer: For arbitrary numbers 367, 930 apply Euclid’s Division Lemma in succession until you obtain a remainder zero. HCF is the remainder in the last but one step.