Solutions by everydaycalculation.com

1^{st} number: 1 2/4, 2^{nd} number: 1 3/6

64 is equivalent to 96

- Find the least common denominator or LCM of the two denominators:

LCM of 4 and 6 is**12**

Next, find the equivalent fraction of both fractional numbers with denominator 12 - For the 1st fraction, since 4 × 3 = 12,

64 = 6 × 34 × 3 = 1812 - Likewise, for the 2nd fraction, since 6 × 2 = 12,

96 = 9 × 26 × 2 = 1812 - Since the denominators are now the same, the fraction with the bigger numerator is the greater fraction
- 1812 = 1812 or 64 = 96

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Related: ^{12}/_{4} and ^{9}/_{6} ^{6}/_{4} and ^{18}/_{6} ^{6}/_{8} and ^{9}/_{6} ^{6}/_{4} and ^{9}/_{12} ^{18}/_{4} and ^{9}/_{6} ^{6}/_{4} and ^{27}/_{6} ^{6}/_{12} and ^{9}/_{6} ^{6}/_{4} and ^{9}/_{18} ^{30}/_{4} and ^{9}/_{6} ^{6}/_{4} and ^{45}/_{6} ^{6}/_{20} and ^{9}/_{6} ^{6}/_{4} and ^{9}/_{30} ^{42}/_{4} and ^{9}/_{6} ^{6}/_{4} and ^{63}/_{6} ^{6}/_{28} and ^{9}/_{6} ^{6}/_{4} and ^{9}/_{42}

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