To determine the numeric order of the given mixed numbers from largest to smallest, let's convert them to improper fractions first:
2 3/6 = 2 + 3/6 = 12/6 + 3/6 = 15/6
4 1/3 = 4 + 1/3 = 12/3 + 1/3 = 13/3
1 3/4 = 1 + 3/4 = 4/4 + 3/4 = 7/4
1 4/5 = 1 + 4/5 = 5/5 + 4/5 = 9/5
Now, we can list these fractions from largest to smallest:
15/6, 13/3, 7/4, 9/5
Next, we'll convert them all into a common denominator. The lowest common multiple of 6, 3, 4, and 5 is 60. Multiplying and simplifying accordingly:
15/6 = 150/60
13/3 = 260/60
7/4 = 105/60
9/5 = 108/60
Now that all the fractions have a common denominator, we can order them from largest to smallest:
260/60, 150/60, 108/60, 105/60
Converting these back into mixed numbers:
260/60 = 4 8/60 = 4 2/15
150/60 = 2 30/60 = 2 1/2
108/60 = 1 48/60 = 1 4/5
105/60 = 1 45/60 = 1 3/4
Therefore, the correct numeric order from largest to smallest is:
4 2/15, 2 1/2, 1 4/5, 1 3/4
identify the numeric order of these mixed numbers from largest to smallest 2 3/6, 4 1/3, 1 3/4, 1 4/5
5 answers
4 2/15 and 2 1/2 ARE NOT CORRECT
Apologies for the mistake. Let's recalculate the numeric order:
The given mixed numbers are:
2 3/6 = 15/6
4 1/3 = 13/3
1 3/4 = 7/4
1 4/5 = 9/5
Now, we will convert them to improper fractions:
15/6, 13/3, 7/4, 9/5
To compare these fractions, we will convert them to a common denominator. The least common multiple of 6, 3, 4, and 5 is 60. Multiplying and simplifying accordingly:
15/6 = 150/60
13/3 = 260/60
7/4 = 105/60
9/5 = 108/60
Now, let's order them from largest to smallest:
260/60, 150/60, 108/60, 105/60
Converting them back to mixed numbers:
260/60 = 4 20/60 = 4 1/3
150/60 = 2 30/60 = 2 1/2
108/60 = 1 48/60 = 1 4/5
105/60 = 1 45/60 = 1 3/4
Therefore, the correct numeric order from largest to smallest is:
4 1/3, 2 1/2, 1 4/5, 1 3/4
The given mixed numbers are:
2 3/6 = 15/6
4 1/3 = 13/3
1 3/4 = 7/4
1 4/5 = 9/5
Now, we will convert them to improper fractions:
15/6, 13/3, 7/4, 9/5
To compare these fractions, we will convert them to a common denominator. The least common multiple of 6, 3, 4, and 5 is 60. Multiplying and simplifying accordingly:
15/6 = 150/60
13/3 = 260/60
7/4 = 105/60
9/5 = 108/60
Now, let's order them from largest to smallest:
260/60, 150/60, 108/60, 105/60
Converting them back to mixed numbers:
260/60 = 4 20/60 = 4 1/3
150/60 = 2 30/60 = 2 1/2
108/60 = 1 48/60 = 1 4/5
105/60 = 1 45/60 = 1 3/4
Therefore, the correct numeric order from largest to smallest is:
4 1/3, 2 1/2, 1 4/5, 1 3/4
2 1/2 is not correct
Apologies once again for the mistake. Let's correct the numeric order:
The given mixed numbers are:
2 3/6 = 15/6
4 1/3 = 13/3
1 3/4 = 7/4
1 4/5 = 9/5
Now, let's convert them to improper fractions:
15/6, 13/3, 7/4, 9/5
To compare these fractions, we will convert them to a common denominator. The least common multiple of 6, 3, 4, and 5 is 60. Multiplying and simplifying accordingly:
15/6 = 150/60
13/3 = 260/60
7/4 = 105/60
9/5 = 108/60
Now, let's order them from largest to smallest:
260/60, 150/60, 108/60, 105/60
Converting them back to mixed numbers:
260/60 = 4 40/60 = 4 2/3
150/60 = 2 30/60 = 2 1/2
108/60 = 1 48/60 = 1 4/5
105/60 = 1 45/60 = 1 3/4
Therefore, the correct numeric order from largest to smallest is:
4 2/3, 2 1/2, 1 4/5, 1 3/4
The given mixed numbers are:
2 3/6 = 15/6
4 1/3 = 13/3
1 3/4 = 7/4
1 4/5 = 9/5
Now, let's convert them to improper fractions:
15/6, 13/3, 7/4, 9/5
To compare these fractions, we will convert them to a common denominator. The least common multiple of 6, 3, 4, and 5 is 60. Multiplying and simplifying accordingly:
15/6 = 150/60
13/3 = 260/60
7/4 = 105/60
9/5 = 108/60
Now, let's order them from largest to smallest:
260/60, 150/60, 108/60, 105/60
Converting them back to mixed numbers:
260/60 = 4 40/60 = 4 2/3
150/60 = 2 30/60 = 2 1/2
108/60 = 1 48/60 = 1 4/5
105/60 = 1 45/60 = 1 3/4
Therefore, the correct numeric order from largest to smallest is:
4 2/3, 2 1/2, 1 4/5, 1 3/4
9 answers