GCD of 15, 793, 746, 668 Calculator
Created By : Jatin Gogia
Reviewed By : Rajasekhar Valipishetty
Last Updated : Apr 06, 2023
Make use of GCD Calculator to determine the Greatest Common Divisor of 15, 793, 746, 668 i.e. 1 largest integer that divides all the numbers equally.
GCD of 15, 793, 746, 668 is 1
GCD(15, 793, 746, 668) = 1
Ex: 10, 15, 20 (or) 24, 48, 96,45 (or) 78902, 89765, 12345
GCD of numbers 15, 793, 746, 668 is 1
GCD(15, 793, 746, 668) = 1
GCDof 15,793,746,668 is 1
Given Input numbers are 15, 793, 746, 668
To find the GCD of numbers using factoring list out all the divisors of each number
Divisors of 15
List of positive integer divisors of 15 that divides 15 without a remainder.
1, 3, 5, 15
Divisors of 793
List of positive integer divisors of 793 that divides 793 without a remainder.
1, 13, 61, 793
Divisors of 746
List of positive integer divisors of 746 that divides 746 without a remainder.
1, 2, 373, 746
Divisors of 668
List of positive integer divisors of 668 that divides 668 without a remainder.
1, 2, 4, 167, 334, 668
Greatest Common Divisior
We found the divisors of 15, 793, 746, 668 . The biggest common divisior number is the GCD number.
So the Greatest Common Divisior 15, 793, 746, 668 is 1.
Therefore, GCD of numbers 15, 793, 746, 668 is 1
Given Input Data is 15, 793, 746, 668
Make a list of Prime Factors of all the given numbers initially
Prime Factorization of 15 is 3 x 5
Prime Factorization of 793 is 13 x 61
Prime Factorization of 746 is 2 x 373
Prime Factorization of 668 is 2 x 2 x 167
The above numbers do not have any common prime factor. So GCD is 1
Finding GCD of 15, 793, 746, 668 using LCM Formula
Step1:
Let's calculate the GCD of first two numbers
The formula of GCD is GCD(a, b) = ( a x b) / LCM(a, b)
LCM(15, 793) = 11895
GCD(15, 793) = ( 15 x 793 ) / 11895
GCD(15, 793) = 11895 / 11895
GCD(15, 793) = 1
Step2:
Here we consider the GCD from the above i.e. 1 as first number and the next as 746
The formula of GCD is GCD(a, b) = ( a x b) / LCM(a, b)
LCM(1, 746) = 746
GCD(1, 746) = ( 1 x 746 ) / 746
GCD(1, 746) = 746 / 746
GCD(1, 746) = 1
Step3:
Here we consider the GCD from the above i.e. 1 as first number and the next as 668
The formula of GCD is GCD(a, b) = ( a x b) / LCM(a, b)
LCM(1, 668) = 668
GCD(1, 668) = ( 1 x 668 ) / 668
GCD(1, 668) = 668 / 668
GCD(1, 668) = 1
GCD of 15, 793, 746, 668 is 1
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FAQs on GCD of numbers 15, 793, 746, 668
1. What is the GCD of 15, 793, 746, 668?
GCD of 15, 793, 746, 668 is 1
2. Where do I get the detailed procedure to find GCD of 15, 793, 746, 668?
You can find a detailed procedure to find GCD of 15, 793, 746, 668 on our page.
3. How to find GCD of 15, 793, 746, 668 on a calculator?
You can find the GCD of 15, 793, 746, 668 by simply giving the inputs separated by commas and click on the calculate button to avail the Greatest Common Divisor in less time.