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JeopardyMotion Problems
MixtureProblems
Coin Problems
Cost Problems
PerimeterProblems
Q $100
Q $200
Q $300
Q $400
Q $500
Q $100 Q $100Q $100 Q $100
Q $200 Q $200 Q $200 Q $200
Q $300 Q $300 Q $300 Q $300
Q $400 Q $400 Q $400 Q $400
Q $500 Q $500 Q $500 Q $500
Final JeopardySource: http://jc-schools.net/tutorials/PPT-games/
$200 Question from Motion Problems
A train leaves Fairhope traveling east at 80 km/hr. One hour later another train leaves on a parallel track traveling in the same direction at a speed of 120 km/hr. When the two trains meet what variable of the rate formula will have the same value for both trains?
$300 Question from Motion Problems
A train leaves Fairhope traveling east at 80 km/hr. One hour later another train leaves on a parallel track traveling in the same direction at a speed of 120 km/hr. How far from Fairhope will the trains meet?
$400 Question from Motion Problems
A train leaves Fairhope traveling east at 80 km/hr. One hour later another train leaves on a parallel track traveling in the same direction at a speed of 120 km/hr. For what period of time t was each train traveling on the track?
$400 Answer from Motion Problems
What is 3 hours for the slow train?What is 2 hours for the fast train?
$500 Question from Motion Problems
A car leaves Hartford traveling north at 56 km/hr. Another car leaves Hartford one hour later traveling north on the same road at 84 km/hr. How far from Hartford will the second car overtake the first car? ( Hint: The cars travel the same distance.)
$100 Question from Mixture Problems
How many liters of acid are contained in a 100 liter solution that is 50% acid?
$300 Question from Mixture Problems
If x represents the number of liters of solution A and y represents the numbers of liters of solution B what are the two system of equations that can be written for the following word problem?
Solution A contains 80% acid and solution B contains 30% acid. How much of each solution is needed to make a 200 liter solution that contains 62% acid?
$400 Question from Mixture Problems
Solve the following system of equations below to determine the number of liters x and the number of liters y that are necessary to create a new solution of 200 liters that contains 62 % acid.
x + y = 200 and .8x + .3y = 124
$500 Question from Mixture Problems
Solution A is 50 % acid and Solution B is 80% acid. How much of each should be used to create a new solution of 100 milliliters that contains 68% acid? Let x represent the number of milliliters of solution A needed and let y represent the number of milliliters of solution B needed.
$300 Question from Coin Problems
On a table there are 20 coins, some quarters and some dimes. There value is $3.05.
Write the system of equations for the problem statement above. Let q represent the number of quarters.Let d represent the number of dimes.
$400 Question from Coin Problems
Solve the system of equations below to determine the number of dimes and the number of quarters that are needed to produce a monetary value of $3.05.
d + q = 20 and .1d + .25q = 3.05
$500 Question from Coin Problems
Calvin paid his $1.35 skate rental with dimes and nickels only. There were 19 coins in all. How many of each coin were there?
Let n = the number of nickels.Let d = the number of dimes.
$100 Question from Cost Problems
If a company charges $25 dollars a day to rent a car, how much would it cost to rent the car for 5 days?
$200 Question from Cost Problems
If movie tickets cost $5 dollars each, how much would it cost for you and five of your friends to watch a movie at the local theater on Friday night?
$300 Question from Cost Problems
Six apples and three oranges cost $3.36. Two apples and five oranges cost $ 3.04.
For the problem statement above write the system of equations that can be used to determine the cost of a single apple and a single orange.
Let x represent the cost of a single apple.Let y represent the cost of a single orange
$400 Question from Cost Problems
Solve the system of equations listed below to determine the cost of a single apple x and single orange y.
6x + 3y = 3.36 and 2x + 5y = 3.04
$400 Answer from Cost Problems
What is x = 32 cents the cost of a single appleWhat is y = 48 cents the cost of a single
$500 Question from Cost Problems
Four oranges and five apples cost $3.56. Three oranges and four apples cost $2.76. Find the cost of a single orange and a single apple.
Let x represent the cost of a single orange.Let y represent the cost of a single apple.
$500 Answer from Cost Problems
What is x = 44 cents, the cost of a single orange.What is y = 36 cents, the cost of a single apple.
$300 Question from Perimeter Problems
The perimeter of a rectangle is 76 cm. The length is 17cm more than the width. Find the length and the width.
From the problems statement above write the system of equations which determine the length and the width of the rectangle.
$400 Question from Perimeter Problems
Solve the system of equations below to determine the length and the width of the rectangle in question.
2L + 2W = 76 and L = W + 17
$500 Question from Perimeter Problems
The perimeter of a rectangle is 160ft. One fourth the length is the same as twice the width. Find the dimensions of the rectangle
Final Jeopardy
A student walks and jogs to college each day. The student averages 5 km/h walking and 9 km/h jogging. The distance from home to college is 8 km, and the student makes the trip in 1 hour. How far does the student jog?