Deck 15: Developing Fraction Concepts

A)Size of the whole.
B)Parts all the same size.
C)Fractional parts are parts of the same size whole.
D)Relationship between part and whole.

A)What does the denominator in a fraction tell us?
B)What does the equal symbol mean with fractions?
C)What might a fraction equal to one look like?
D)How do know if a fraction is greater than,less than 1?

A)Location of a point in relation to 0 and other values.
B)Part of area covered as it relates to the whole unit.
C)Count of objects in the subset as it relates to defined whole.
D)A unit or length involving fractional amounts.

A)They are the same because you can simplify 46 and get 23.
B)Start with 23 and multiply the top and bottom by 2 and you get 46.
C)If you have 6 items and you take 4 that would be 46.You can make 6 groups into 3 groups and 4 into 2 groups and that would be 23 .
D)If you multiply 4 x 3 and 6 x 2 they're both 12.

A)Graph of slope
B)Shapes created on dot paper
C)Plastic,circular area models
D)Clock faces

A)Equal shares.
B)Equal-sized parts.
C)Equivalent fractions.
D)Subset of the whole.

A)There are not many real-world uses.
B)Knowing the size of the subset rather than the number of equal sets
C)Knowing the number of equal sets rather than the size of subsets
D)There are not many manipulatives to model the collections.

A)Comparing fractions to benchmark numbers.
B)Find out the fractional part of the class are wearing glasses.
C)Collect survey data and find out what fractions of the class choose each item.
D)Use paper folding to identify equivalence.

A)Is a clear term,as it helps students realize that there is something unacceptable about the format.
B)Should be taught separately from proper fractions.
C)Are best connected to mixed numbers through the standard algorithm.
D)Should be introduced to students in a relevant context.

A)Finding equivalent numerators.
B)Finding equivalent denominators.
C)Finding multipliers and divisors.
D)Finding equivalent fractions with no common whole number factors.

A)Part-whole.
B)Measurement.
C)Iteration.
D)Division.

A)Estimating with fractions.
B)Iteration skills.
C)Whole number knowledge.
D)Fraction equivalence.

A)Use incorrect notation.
B)Change the unit.
C)Use incorrect subsets.
D)Count the tick marks rather than the space.

A)Pattern blocks.
B)Tangrams.
C)Cuisenaire rods.
D)Geoboards.

A)Iterating and partitioning.
B)Procedural algorithm for equivalence.
C)Emphasis on number sense and fractional meaning.
D)Link fractions to key benchmarks.

A)Measure.
B)Reciprocity.
C)Division.
D)Ratio.

A)Number line.
B)Cuisenaire rods.
C)Measurement tools.
D)Folded paper strips.

A)Many meanings of fractions.
B)Fractions written in a unique way.
C)Students overgeneralize their whole-number knowledge
D)Teachers present fractions late in the school year.

A)Iterating.
B)Equivalent fraction algorithm.
C)Estimating.
D)Partitioning.