Finding LCM of Polynomials 2n-10, 4n-20 Using GCF
Our Free LCM of Polynomials Using GCF Calculator is helpful for Finding LCM of Polynomials 2n-10, 4n-20 Using GCF. The tool will give you the result 4n - 20 easily with a detailed explanation.
Ex: x^2+2x+1,x+1 (or) x^2-1,x-1 (or) x^3-1,x+1
Solution to Find LCM of Polynomials 2n-10, 4n-20 Using GCF
Given polynomials are (2n-10),(4n-20)
Find the factors of all polynomials
The factors of 2n-10 are 1, and 2(n - 5)
The factors of 4n-20 are 1, and 4(n - 5)
By observing the above factors, we can say that the GCF of (2n-10) and (4n-20) is 2n - 10
To find the LCM of (2n-10) and (4n-20), we have to multiply both together
= (2n-10) * (4n-20)
= 2n(4n-20) -10(4n-20)
= 8n^2 - 80n + 200
To find the LCM we have to divide 8n^2 - 80n + 200 by GCF
i.e (8n^2 - 80n + 200)/(2n - 10) = 4n - 20
Therefore, the LCM of (2n-10),(4n-20) is 4n - 20
FAQS on Finding LCM of Polynomials 2n-10, 4n-20 Using GCF
1. What is the LCM of Polynomials 2n-10, 4n-20 Using GCF?
The least common multiple of Polynomials 2n-10, 4n-20 Using GCD is 4n - 20
2. Where can I get the detailed solution for Finding LCM of Polynomials 2n-10, 4n-20 Using GCF?
Check factorpolynomials.com site to know the detailed solution of LCM of Polynomials 2n-10, 4n-20 Using GCF?
3. How to Find Least Common Multiple of 2n-10, 4n-20 with GCF method?
You have to find GCF of polynomials 2n-10, 4n-20 and then multiply all the polynomials. Now,