![]() Comparing proper and improper fractions.Comparing improper fractions and mixed numbers with pie charts.Subtracting mixed numbers from mixed numbers or whole numbers.Subtracting fractions from whole numbers, mixed numbers.Subtracting like fractions (denominators 2-12).Adding fractions and mixed numbers (like denominators).Adding like fractions (all denominators).Adding like fractions (denominators 2-12).Converting mixed numbers and fractions to / from decimals.Converting fractions to / from mixed numbers.Subtracting a fraction from a whole number or mixed number.Simplifying fractions (proper, improper).Compare improper fractions, mixed numbers.Comparing fractions (like, unlike denominators).Comparing proper or improper fractions with pie charts.Comparing proper fractions with pie charts.Comparing fractions with pie charts (same denominator).Equivalent fractions - missing numerators, denominators.Writing and comparing fractions word problems.Comparing fractions with block diagrams.Comparing fractions with pictures (parts of sets).Comparing fractions with pie charts (same numerator, different denominators). ![]() Comparing fractions with pie charts (parts of whole, same denominator).Fractions as part of a set or group (identifying, writing, coloring, etc).Identifying common fractions (matching, coloring, etc).Reading fractions and matching to their words.Writing fractions from a numerator and denominator.Numerators and denominators of a fraction.Word problems: write the fraction from the story.Topics include: Grade 1 fraction worksheets Choose your grade / topic:Ĭonverting fractions, equivalent fractions, simplifying fractionsįraction multiplication and division worksheets Our fraction worksheets start with the introduction of the concepts of " equal parts", "parts of a whole" and "fractions of a group or set" and proceed to operations on fractions and mixed numbers. What it shows you are values multiplied by different variations of fractions equal to “1”.Fraction worksheets for grade 1 through grade 6 The table below lists some common fractions and their equivalents. If you remember to use the cross-multiply method, you should not have any problems verifying equivalent fractions. Okay, let’s do one with numbers where the fractions are not equivalent… As you can see by this example, 1/2 is not an equivalent fraction of 2/3. The graphic below shows you how to cross multiply… If they are equal, then the two fractions are equivalent fractions. Now compare the two answers to see if they are equal. A simple way to look at how to check for equivalent fractions is to do what is called “cross-multiply”, which means multiple the numerator of one fraction by the denominator of the other fraction. So we know that 3/4 is equivalent to 9/12, because 3×12=36 and 4×9=36. 3/4 is equivalent (equal) to 9/12 only if the product of the numerator ( 3) of the first fraction and the denominator ( 12) of the other fraction is equal to the product of the denominator ( 4) of the first fraction and the numerator ( 9) of the other fraction. Now let’s plug the numbers into the Rule for equivalent fractions to be sure you have it down “cold”. That sounds like a mouthful, so let’s try it with numbers… What this Rule says is that two fractions are equivalent (equal) only if the product of the numerator ( a) of the first fraction and the denominator ( d) of the other fraction is equal to the product of the denominator ( b) of the first fraction and the numerator ( c) of the other fraction.Ī product simply means you multiply. The rule for equivalent fractions can be a little tough to explain, but hang in there, we will clear things up in just a bit. So, let’s look at the Rule to check to see if two fractions are equivalent or equal. And yes grasshopper, 2/4 is an equivalent fraction for 4/8 too.As you already know, we are nuts about rules. Therefore, we can say that 1/2 is equal to 2/4, and 1/2 is also equal to 4/8. Take a look at the four circles above.Can you see that the one “1/2”, the two “1/4” and the four “1/8” take up the same amount of area colored in orange for their circle?Well that means that each area colored in orange is an equivalent fraction or equal amount. So we can say that 1/2 is equivalent (or equal) to 2/4.ĭon’t let equivalent fractions confuse you! The best way to think about equivalent fractions is that they are fractions that have the same overall value.įor example, if we cut a pie exactly down the middle, into two equally sized pieces, one piece is the same as one half of the pie.Īnd if another pie (the same size) is cut into 4 equal pieces, then two pieces of that pie represent the same amount of pie that 1/2 did. Equivalent fractions represent the same part of a whole
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