Questions

What is the least common multiple of 5 7 and 14?

What is the least common multiple of 5 7 and 14?

The least common multiple of 7, 5 and 14 is 70.

What is the LCM of 7 and 14?

14
Answer: LCM of 7 and 14 is 14.

What is the least common multiple of 5 14 and 17?

The least common multiple of 14, 5 and 17 is 1190.

What is the LCM of 5 and 14?

70
Answer: LCM of 5 and 14 is 70.

What is the LCM of 3/5 and 14?

The least common multiple of 3, 5 and 14 is 210.

What is the GCF of 7 and 14?

7
Answer: GCF of 7 and 14 is 7.

What is the least common multiple of 5 and 7?

35
Answer: LCM of 5 and 7 is 35.

READ ALSO:   Why do I crave food when I wake up?

What is the GCF of 5 and 14?

Answer: GCF of 5 and 14 is 1.

What are the common factors of 7 and 14?

The factors of 14 are 1, 2, 7 and 14. So, the Greatest Common Factor for these numbers is 7 because it divides all them without a remainder. Read more about Common Factors below.

How do you calculate LCM?

Let’s find the LCM of 30 and 45. One way to find the least common multiple of two numbers is to first list the prime factors of each number. Then multiply each factor the greatest number of times it occurs in either number. If the same factor occurs more than once in both numbers, you multiply the factor the greatest number of times it occurs.

What are the first 7 multiples of 14?

14 x 7 = 98 so, 98 is a multiple of 14. 14 x 8 = 112 so, 112 is a multiple of 14. 14 x 9 = 126 so, 126 is a multiple of 14. The first 10 multiples of 14 are: 0, 14, 28, 42, 56, 70, 84, 98, 112, 126. Any number is a multiple of itself (n x 1 = n).

READ ALSO:   How many general surgery programs are there in the US?

How to find least common multiple?

First,write the numbers,separated by commas

  • Now divide the numbers,with the smallest prime number.
  • If any number is not divisible,then write down that number and proceed further
  • Keep on dividing the row of numbers by prime numbers,unless we get the results as 1 in the complete row
  • Now LCM of the numbers will equal to the product of all the prime numbers we obtained in division method