2 1/9, 79/29, 17/99, 4/9 Fractions Average Calculator

2 1/9, 79/29, 17/99, 4/9 Fractions Average can be found easily using the online tool Fractions Average Calculator and get step by step procedure involved.

Average of Fractions:

Finding Average of 2 1/9, 79/29, 17/99, 4/9

Given fractions are 19/9,79/29,17/99,4/9

The LCM of 9,29,99,9 (denominators of the fractions) is 2871

Finding LCM of 9,29,99,9 by Common Division

Arrange the Inputs 9,29,99,9 in a horizontal line separated by commas and divide them with a prime number. Note the quotients in the next row and divide with quotients with prime numbers again. Continue the process until you have all co primes in the last.

3 9, 29, 99, 9
3 3, 29, 33, 3
1, 29, 11, 1

As all the numbers left in the last row are co primes you need not do the common division process further.

To obtain the Least Common Multiple, multiply the prime numbers with which you have divided the given numbers and the co primes in the last row i.e. 3 x 3 x 1 x 29 x 11 x 1 = 2871

Therefore, LCM of 9,29,99,9 is 2871

Finding LCM of 9,29,99,9 using GCF Formula

Step1:

Let's calculate the LCM of first two numbers

The formula of LCM is LCM(a,b) = ( a x b) / GCF(a,b)

GCF(9, 29) = 1

LCM(9, 29) = ( 9 x 29 ) / 1

LCM(9, 29) = 261 / 1

LCM(9, 29) = 261

Step2:

Here we consider the LCM from the above i.e. 261 as first number and the next as 99

The formula of LCM is LCM(a,b) = ( a x b) / GCF(a,b)

GCF(261, 99) = 9

LCM(261, 99) = ( 261 x 99 ) / 9

LCM(261, 99) = 25839 / 9

LCM(261, 99) = 2871

Step3:

Here we consider the LCM from the above i.e. 2871 as first number and the next as 9

The formula of LCM is LCM(a,b) = ( a x b) / GCF(a,b)

GCF(2871, 9) = 9

LCM(2871, 9) = ( 2871 x 9 ) / 9

LCM(2871, 9) = 25839 / 9

LCM(2871, 9) = 2871

LCM of 9,29,99,9 is 2871

The least common Multiple (LCM) is: 2871.

Rewriting as equivalent fractions with the LCM:

= 6061/2871,7821/2871,493/2871,1276/2871

= 6061+7821+493+1276/2871

Totaling the numerator:

15651/2871

Reducing the fraction:

1739/319

Dividing by the number of values: 4

The given fractions are 1739/319 and 4/1

On dividing the both fractions,1739/319 ÷ 4/1

Then the denominator of the first fraction i.e., 319 will comes to the numerator of the second fraction and gets multiplied,

And in the same way,the denominator of the second fraction i.e., 1 will comes to the numerator of the first fraction and gets multiplied:

1739/319 ÷ 4/1 = 1739 x 1/319 x 4

On Multiplying the denominators and the numerators,the fraction value we get,

1739/1276

Result: 1739/1276

Average of fraction = 1739/1276

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FAQs on Average of Fractions 2 1/9, 79/29, 17/99, 4/9

1. What is the average of fractions 2 1/9, 79/29, 17/99, 4/9 ?

Average of Fractions is 1739/1276

2. How to find the Average of Fractions 2 1/9, 79/29, 17/99, 4/9 ?

Set up an addition equation with the given fractions 2 1/9, 79/29, 17/99, 4/9 and then find the LCD. Rewrite each of the fractions as equivalent fractions using LCD. Add the numerators and place the sum over the LCD and reduce it further.

3. Where do I find an elaborate solution to find the Average of Fractions 2 1/9, 79/29, 17/99, 4/9 ?

You can find the elaborate solution to find the Average of Fractions 2 1/9, 79/29, 17/99, 4/9 on our page.