Given any pair of fractions fractions, a/b and c/d where b and d are positive,
the fraction (a+c)/(b+d) lies between them (though not exactly halfway).
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make each fraction a improper fraction the flip the second fraction and multiply straight across then simplify
You convert them both to improper fractions by multiplying the denominators by the whole number and then adding the numerator to it. This number goes in the numerator and the denominator stays the same. Then you do this for the other fraction, making sure that the denominators of each fraction are equivalent. Then add the fractions as normal.
The whole concept of "going into" is meaningless in the context of fractions. Each and every non-zero fraction will go into 68.
They have the same numerator (1) but different denominators. Since the numerator is 1 in each fraction, it cannot be simplified therefore each unit fraction is in its simplest form. Then, because the denominators of any two of them are different the fractions must be different.
Multiply Or Divide Both The Numerator And The Denominator By The Same Number.