The letters cost does notincrease at a constant rate.Thereare two different pricesdepending on the weight ofthe letter. The graph willnot be a straight line, sothis is not a proportionproblem.The paintershould mix 61/4 pints ofyellow paintwith 10 pints ofred paint.No, the graphdoes not show aproportionalrelationship. Thegraph does notpass through theorigin.p=0.45wFor a graph torepresent aproportionalrelationship, it mustbe a straight lineand pass throughthe origin.proportiond=45.25hThe ratios areall equivalent,so it is aproportionalrelationship.constant ofproportionalityFREE!Adam'scontainer isthe betterdeal.proportionalrelationshipThe cost of flyersincreases at aconstant rate, andthe cost is $0for 0 dozen flyers.This is a proportionalrelationship.Theperimeter ofthe squareis 48 cm.The ratios arenot all thesame, so it isnot aproportionalrelationship.All ratios are 4/1and equivalent.The perimeterand the sidelengths areproportional.The letters cost does notincrease at a constant rate.Thereare two different pricesdepending on the weight ofthe letter. The graph willnot be a straight line, sothis is not a proportionproblem.The paintershould mix 61/4 pints ofyellow paintwith 10 pints ofred paint.No, the graphdoes not show aproportionalrelationship. Thegraph does notpass through theorigin.p=0.45wFor a graph torepresent aproportionalrelationship, it mustbe a straight lineand pass throughthe origin.proportiond=45.25hThe ratios areall equivalent,so it is aproportionalrelationship.constant ofproportionalityFREE!Adam'scontainer isthe betterdeal.proportionalrelationshipThe cost of flyersincreases at aconstant rate, andthe cost is $0for 0 dozen flyers.This is a proportionalrelationship.Theperimeter ofthe squareis 48 cm.The ratios arenot all thesame, so it isnot aproportionalrelationship.All ratios are 4/1and equivalent.The perimeterand the sidelengths areproportional.

Pre-Algebra Topic 3 Analyze and Use Proportional Relationships - Call List

(Print) Use this randomly generated list as your call list when playing the game. There is no need to say the BINGO column name. Place some kind of mark (like an X, a checkmark, a dot, tally mark, etc) on each cell as you announce it, to keep track. You can also cut out each item, place them in a bag and pull words from the bag.


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  1. The letters cost does not increase at a constant rate. There are two different prices depending on the weight of the letter. The graph will not be a straight line, so this is not a proportion problem.
  2. The painter should mix 6 1/4 pints of yellow paint with 10 pints of red paint.
  3. No, the graph does not show a proportional relationship. The graph does not pass through the origin.
  4. p=0.45w
  5. For a graph to represent a proportional relationship, it must be a straight line and pass through the origin.
  6. proportion
  7. d=45.25h
  8. The ratios are all equivalent, so it is a proportional relationship.
  9. constant of proportionality
  10. FREE!
  11. Adam's container is the better deal.
  12. proportional relationship
  13. The cost of flyers increases at a constant rate, and the cost is $0 for 0 dozen flyers. This is a proportional relationship.
  14. The perimeter of the square is 48 cm.
  15. The ratios are not all the same, so it is not a proportional relationship.
  16. All ratios are 4/1 and equivalent. The perimeter and the side lengths are proportional.