![]() ![]() Exampleġ7/6 = (12 + 5)/6 = (2*6 + 5)/6 = 2 5/6 Exerciseįor these exercises, convert the improper fraction to a mixed number.Ĭonsider the mixed fraction. The difference between the multiple and the numerator gives you the numerator for the fractional part. This multiple gives you the whole part of the mixed number. Think of a multiple of the denominator that is just smaller than the numerator. Take a few minutes to practise the reverse process - making an improper fraction into a mixed number. Practice changing positive mixed numbers to improper fractions: If we had two pies and 3/8 of a pie, we can figure out how many 1/8-sized pieces we have. Mixed numbers can always be written as improper fractions. An improper fraction is any fraction which has a numerator that is greater than the denominator. In writing these mixed numbers as a single fraction, we are writing improper fractions. ![]() Click on the question mark to see the addition step-by-step: We read the fraction as "three and two fifths" and this is exactly what we mean.Īdding a whole number to a fraction is a special case of addition of two fractions. It contains both a whole part, 3, and a fractional part, 2/5. Tangents, Derivatives and Differentiationįractions Mixed Numbers and Improper FractionsĪ mixed number contains a whole part and a fractional part.Rearranging Equations III (Harder Examples).Rearranging Equations II (Quadratic Equations).Rearranging Equations I (Simple Equations).Order of Operations for Algebraic Expressions. ![]()
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