Deck 16: Developing Strategies for Fraction Computation

A)Pattern Blocks.
B)Circular pieces.
C)Ruler.
D)Number line.

A)16÷ 3
B)56÷ 3
C)36÷ 3
D)3÷56

A)Luke ordered 3 pizzas.But before his guests arrive he got hungry and ate 38 of one pizza.What was left for the party?
B)Linda ran 1 12 miles on Friday.Saturday she ran 2 18 miles and Sunday 2 34.How many miles did she run over the weekend?
C)Lois gathered 34 pounds of walnuts and Charles gathered 78 pounds.Who gathered the most? How much more?
D)Estimate the answer to 1213+ 78.

A)Circular pieces.
B)Number Line.
C)Cuisenaire Rods.
D)Ruler.

A)A fraction divided by a fraction.
B)A whole number divided by a fraction.
C)A whole number divided by a mixed number.
D)A whole number divided by a whole number.

A)Multiply a fraction by a whole number.
B)Multiply a whole number by a fraction.
C)Subdividing the whole number.
D)Fraction of a fraction- no subdivisions.

A)Be done side by side with visuals and situations.
B)Be done with specific procedures.
C)Be done with units that are challenging to combine.
D)Be done mentally without paper and pencil.

A)Adding both numerator and denominator.
B)Not identifying the common denominator.
C)Difficulty with common multiples.
D)Use of invert and multiply.

A)Deal with the whole numbers first and then work with the fractions.
B)Always trade one of the whole number parts into equivalent parts.
C)Avoid this method until the student fully understands subtraction of numbers less than one.
D)Teach only the algorithm that keeps the whole number separate from the fractional part.

A)Address common misconceptions regarding computational procedures.
B)Estimating and invented methods play a big role in the development.
C)Explore each operation with a single model.
D)Use contextual tasks.

A)Area model.
B)Linear model.
C)Set model.
D)Circular model.

A)Decide whether fractions are closest to 0,12,or 1.
B)Look for ways different fraction parts are related.
C)Decide how big the fraction is based on the unit.
D)Look for the size of the denominator.

A)Area.
B)Set.
C)Measurement.
D)Linear.

A)Area.
B)Set.
C)Linear.
D)Length.

A)Should be introduced at first with tasks that require both fractions to be changed.
B)Is sometimes possible for students,especially if they have a good conceptual understanding of the relationships between certain fractional parts and a visual tool,such as a number line.
C)Is a concept understood especially well by students if the teacher compares different denominators to "apples and oranges."
D)Should initially be introduced without a model or drawing.

A)Half a pizza is left from the 2 pizzas Molly ordered.How much pizza was eaten?
B)Mary needs 3 13 feet of wood to build her fence.She only has 2 34 feet.How much more wood does she need?
C)Millie is at mile marker 2 12.Rob is at mile marker 1.How far behind is Rob?
D)What is the total length of these two Cuisenaire rods placed end to end?

A)Treating denominators the same as addition and subtraction.
B)Matching multiplication situations with multiplication situations.
C)Estimating the size of the answer incorrectly.
D)Multiplying the denominator and not numerator.

A)34 + 18
B)12 - 18
C)56 - 17
D)23 + 12

A)Will the answer be greater than 4?
B)Will the answer be greater than one?
C)Will the answer be greater than 12?
D)Will the answer be greater than 16?