Identify the numeric order of these fractions and mixed numbers from smallest to largest: 1 3/6, 2 3/5, 7/9, 1 7/8
The numeric order of these fractions and mixed numbers from smallest to largest is: 1 3/6, 7/9, 2 3/5, 1 7/8.
wrong
Apologies for the mistake. Let's try again.
To compare and order the fractions and mixed numbers, we can convert them all to improper fractions and then compare their values.
1 3/6 = (1 * 6 + 3) / 6 = 9/6
2 3/5 = (2 * 5 + 3) / 5 = 13/5
7/9 remains unchanged
1 7/8 = (1 * 8 + 7) / 8 = 15/8
Now, let's compare them:
7/9, 9/6, 13/5, 15/8
To bring all the fractions to the same denominator, we can multiply each fraction by the appropriate form of 1.
Multiplying 7/9 by 8/8, we get 56/72
Multiplying 9/6 by 12/12, we get 108/72
Multiplying 13/5 by 14/14, we get 182/70
Multiplying 15/8 by 9/9, we get 135/72
Now the fractions are:
56/72, 108/72, 182/70, 135/72
Arranging them from smallest to largest:
56/72, 108/72, 135/72, 182/70
Converting these back to mixed numbers:
56/72 = 7/9
108/72 = 3/2
135/72 = 1 27/72
182/70 = 2 22/70
So, the correct order from smallest to largest is:
7/9, 3/2, 1 27/72, 2 22/70
wrong again
Apologies once again for the incorrect response. Let's give it another try:
To compare and order the fractions and mixed numbers, we can convert them all to improper fractions and then compare their values.
1 3/6 = (1 * 6 + 3) / 6 = 9/6
2 3/5 = (2 * 5 + 3) / 5 = 13/5
7/9 remains unchanged
1 7/8 = (1 * 8 + 7) / 8 = 15/8
Now, let's compare them:
7/9, 9/6, 13/5, 15/8
To bring all the fractions to the same denominator, we can multiply each fraction by the appropriate form of 1.
Multiplying 7/9 by 8/8, we get 56/72
Multiplying 9/6 by 12/12, we get 108/72
Multiplying 13/5 by 14/14, we get 182/70
Multiplying 15/8 by 9/9, we get 135/72
Now the fractions are:
56/72, 108/72, 182/70, 135/72
Arranging them from smallest to largest:
56/72, 108/72, 135/72, 182/70
Converting these back to mixed numbers:
56/72 = 7/9
108/72 = 1 31/72
135/72 = 1 63/72
182/70 = 2 32/70
So, the correct order from smallest to largest is:
7/9, 1 31/72, 1 63/72, 2 32/70
nope some of those arent even involved in the question
Apologies for the confusion. Let's correct the mistake and find the correct order:
1 3/6 = (1 * 6 + 3) / 6 = 9/6 = 3/2
2 3/5 remains unchanged
7/9 remains unchanged
1 7/8 = (1 * 8 + 7) / 8 = 15/8
Converting them all to improper fractions:
3/2, 2 3/5 = (2 * 5 + 3) / 5 = 13/5, 7/9, 15/8
Now let's compare them:
3/2, 13/5, 7/9, 15/8
To bring all the fractions to the same denominator, we can multiply each fraction by the appropriate form of 1.
Multiplying 3/2 by 4/4, we get 12/8
Multiplying 13/5 by 8/8, we get 104/40
Multiplying 7/9 by 40/40, we get 280/360
Multiplying 15/8 by 45/45, we get 675/360
Now the fractions are:
12/8, 104/40, 280/360, 675/360
Converting these back to mixed numbers:
12/8 = 1 4/8 = 1 1/2
104/40 = 2 24/40 = 2 3/5
280/360 = 0 280/360 = 0 7/9
675/360 = 1 315/360 = 1 7/8
So, the corrected order from smallest to largest is:
0 7/9, 1 1/2, 1 7/8, 2 3/5
bot how are you so bad at math like your a digital creation using code which is pretty much math your still wrong
I apologize for the incorrect responses earlier. Let's try again and find the correct order:
1 3/6 = 6/6 + 3/6 = 9/6 = 3/2
2 3/5 remains unchanged
7/9 remains unchanged
1 7/8 = 8/8 + 7/8 = 15/8
Now let's compare them:
3/2, 2 3/5, 7/9, 1 7/8
Converting them all to improper fractions:
3/2, 13/5, 7/9, 15/8
To compare the fractions, we need a common denominator. The least common multiple of 2, 5, 9, and 8 is 360.
Multiplying 3/2 by 180/180, we get 540/360
Multiplying 13/5 by 72/72, we get 936/360
Multiplying 7/9 by 40/40, we get 280/360
Multiplying 15/8 by 45/45, we get 675/360
Now the fractions are:
540/360, 936/360, 280/360, 675/360
Converting these back to mixed numbers:
540/360 = 1 180/360 = 1 1/2
936/360 = 2 216/360 = 2 3/5
280/360 = 0 280/360 = 0 7/9
675/360 = 1 315/360 = 1 7/8
So, the correct order from smallest to largest is:
0 7/9, 1 1/2, 1 7/8, 2 3/5