Deck 18: Proportional Reasoning

A)Multiplicative comparison.
B)Ratio as a rate.
C)Cognitive task.
D)Composed unit.

A)Ratio as rates.
B)Ratio as quotients.
C)Ratio as part-whole.
D)Ratio as part-to-part.

A)A concrete strategy that can be done first and then connected to equations.
B)A strategy that connects ratio tables to graphs.
C)A common method to figure out how much goes in each equation.
D)A strategy that helps set up linear relationships.

A)Multiplicative relationship.
B)Difference relationship.
C)Additive relationship.
D)Multiplicative comparison.

A)Conversions.
B)Similarities.
C)Differences.
D)Rates.

A)Ratios as distinct entities.
B)Develop a specialized procedure for solving proportions.
C)Sense of covariation.
D)Recognize proportional relationships distinct from nonproportional relationships.

A)If 23= x15 ,find the cross products,30 = 3x,and then solve for x.x = 10.
B)Allison bought 3 pairs of socks for $12.To find out how much 10 pairs cost,find that $12 divided by 3 is $4 a pair,and multiply $4 by 10 for a total of $40.
C)A square with a length of 2 inches was enlarged by a scale factor of 4 and is now 8 inches long.
D)If 5 candy bars cost $4.50,then 10 would cost $9.(Because 5 × 2 = 10,multiply $4.50 by 2).

A)Conceptually,they are exactly the same thing.
B)They have the same meaning when a ratio is of the part-to-whole type.
C)They both have a fraction bar that causes students to mistakenly think they are related in some way.
D)Operations can be done with fractions while they can't be done with ratios.

A)For every 5 pounds of weight Billy's dog has,Sarah's dog has 4 pounds.
B)Billy's dog weighs 1 14 times what Sarah's dog does.
C)Sarah's dog weighs 8 out of a total of 10 dog pounds.
D)Billy's dog makes up 5/9 of the total dog weight.

A)The area of a rectangle is 8 square units and the length is four units long.How long is the width?
B)The negative slope of the line on the graph represents the fact that,for every 30 miles the car travels,it burns one gallon of gas.
C)The triangle has been enlarged by a scale factor of 2.How wide is the new triangle if its original width is 4 inches?
D)Sandy ate 14 of her Halloween candy and her sister also ate 12 of Sandy's candy.What fraction of Sandy's candy was left?

A)Janet and Jean were walking to the park,each walking at the same rate.Jean started first.When Jean has walked 6 blocks,Janet has walked 2 blocks.How far will Janet be when Jean is at 12 blocks?
B)Kendra and Kevin are baking muffins using the same recipe.Kendra makes 6 dozen and Kevin makes 3 dozen.If Kevin is using 6 ounces of chocolate chips,how many ounces will Kendra need?
C)Lisa and Linda are planting peas on the same farm.Linda plants 4 rows and Lisa plants 6 rows.If Linda's peas are ready to pick in 8 weeks,how many weeks will it take for Lisa's peas to be ready?
D)Two weeks ago,two flowers were measured at 8 inches and
12 inches,respectively.Today they are 11 inches and 15 inches tall.Did the 8-inch or 12-inch flower grow more?

A)Provide ratio and proportional tasks within many different contexts.
B)Provide examples of proportional and non-proportional relationships to students and ask them to discuss the differences.
C)Relate proportional reasoning to their background knowledge and experiences.
D)Provide practice in cross-multiplication problems.

A)Apples are 4 for $2.00.
B)2 apples for $1.00 and 1 for $0.50.
C)Apples at Meyers were 4 for $2.00 and at HyVee 5 for $3.00.
D)Apples sold 4 out of 5 over oranges.

A)Scaling up and down.
B)Ratio tables.
C)Graphs.
D)Cross products.

A)Allison bought 3 pairs of socks for $12.To find out how much ten pairs cost,find that $12 divided by 3 is $4 a pair,and multiply $4 by 10 for a total of $40.
B)A square with a length of 2 inches was enlarged by a scale factor of 4 and is now 8 inches long.
C)If 5 candy bars cost $4.50,then 10 would cost $9.(Because 5 × 2 = 10,multiply $4.50 by 2).
D)If 23= x15 ,find the cross products,30 = 3x,and then solve for x.x = 10.

A)Solving problems with rates.
B)Solving problems with scale drawings.
C)Solve problems with between ratios.
D)Solving problems with costs.