There is a pile of keys in the drawer. With each problem you solve, you can eliminate one key until only the key you need remains.
Nope, that wasn't right. Let's try that again.
50 gigabytes
AT&T has two different cell phone plans you can choose from. If you choose plan A, you will pay a flat fee of $150 and $8 per gigabyte. If you choose plan B, you will pay a flat fee of $350 for unlimited gigabytes. How many gigabytes do you need to use for plan A and plan B to cost the same?
10 gigabytes
25 gigabytes
20 gigabytes
$100
Alex is on the job hunt. He has narrowed it down to two options. He can sell cars for $300 plus 30% comission per sale. Or, he could sell boats for $500 plus 20% commission per sale. How much would Alex need to sell for both jobs to equal the same amount of pay?
$200
$1000
$2000
800
An office is printing 1000 copies of a document using two printers. Printer B prints four times as many copies as printer A. How many copies does printer B print?
500
700
600
7100
The tickets to a concert cost $12.30 for the lower level and $5.25 for the upper level. A total of 12,400 tickets were sold for a total amount of $102,465. How many lower level tickets were sold?
5300
8000
4500
1.05x + 0.99y < 23.00
A candy company sells chocolate-covered cherries and chocolate-covered strawberries in a box. Each strawberry, x, costs $1.05 and each cherry, y, costs $.99. Which symbol would correctly complete the inequality that would describe the number of cherries and strawberries you can buy if you can spend a maximum of $23?
1.05x + 0.99y < 23.00
1.05x + 0.99y > 23.00
1.05x + 0.99y > 23.00
125x + 100y < 500
An electronics store makes $125 profit on every TV sold and $100 on every computer sold. The store owner wants to make a profit of at least $500 a day on selling these items. Write an inequality that satisfies the situation.
125x + 100y < 500
125x + 100y > 500
125x + 100y > 500
5x + 10y > 45
At Northwest Electronics, audiotapes cost $5 per package, and videotapes cost $10 per package. Write an inequality that best describes the number of packages of audiotapes, x, and the number of packages of videotapes, y, that can be purchased if you have $45.00.
5x + 10y > 45
5x + 10y < 45
5x + 10y < 45
n + q = 7
.05n + .25q = 1.15
You have 7 coins in your pocket. They are either nickels or quarters. The total amount of money you have is $1.15. Write a system of equations that represents this situation.
n + q = 1.15
.05n + .25q = 7
n + q = 7
5n + 25q = 1.15
You are signing up for college classes. Core classes count as 2 credits while electives count as 1 credit. You sign up for 7 classes that count for a total of 13 credits. Write a system of equations that represents this situation.
2x + 1y = 7
x + y = 13
2x + 1y = 13
x + y = 7
GOLDRUSH
You found a key! It should help you open the sheriff's treasure when you find it.
Back to Town
Old West Jail
Kim Hampton
Created on January 13, 2021
Start designing with a free template
Discover more than 1500 professional designs like these:
View
Decisions and Behaviors in the Workplace
View
Tangram Game
View
Process Flow: Corporate Recruitment
View
Weekly Corporate Challenge
View
Wellbeing and Healthy Routines
View
Match the Verbs in Spanish: Present and Past
View
Planets Sorting Game
Explore all templates
Transcript
There is a pile of keys in the drawer. With each problem you solve, you can eliminate one key until only the key you need remains.
Nope, that wasn't right. Let's try that again.
50 gigabytes
AT&T has two different cell phone plans you can choose from. If you choose plan A, you will pay a flat fee of $150 and $8 per gigabyte. If you choose plan B, you will pay a flat fee of $350 for unlimited gigabytes. How many gigabytes do you need to use for plan A and plan B to cost the same?
10 gigabytes
25 gigabytes
20 gigabytes
$100
Alex is on the job hunt. He has narrowed it down to two options. He can sell cars for $300 plus 30% comission per sale. Or, he could sell boats for $500 plus 20% commission per sale. How much would Alex need to sell for both jobs to equal the same amount of pay?
$200
$1000
$2000
800
An office is printing 1000 copies of a document using two printers. Printer B prints four times as many copies as printer A. How many copies does printer B print?
500
700
600
7100
The tickets to a concert cost $12.30 for the lower level and $5.25 for the upper level. A total of 12,400 tickets were sold for a total amount of $102,465. How many lower level tickets were sold?
5300
8000
4500
1.05x + 0.99y < 23.00
A candy company sells chocolate-covered cherries and chocolate-covered strawberries in a box. Each strawberry, x, costs $1.05 and each cherry, y, costs $.99. Which symbol would correctly complete the inequality that would describe the number of cherries and strawberries you can buy if you can spend a maximum of $23?
1.05x + 0.99y < 23.00
1.05x + 0.99y > 23.00
1.05x + 0.99y > 23.00
125x + 100y < 500
An electronics store makes $125 profit on every TV sold and $100 on every computer sold. The store owner wants to make a profit of at least $500 a day on selling these items. Write an inequality that satisfies the situation.
125x + 100y < 500
125x + 100y > 500
125x + 100y > 500
5x + 10y > 45
At Northwest Electronics, audiotapes cost $5 per package, and videotapes cost $10 per package. Write an inequality that best describes the number of packages of audiotapes, x, and the number of packages of videotapes, y, that can be purchased if you have $45.00.
5x + 10y > 45
5x + 10y < 45
5x + 10y < 45
n + q = 7
.05n + .25q = 1.15
You have 7 coins in your pocket. They are either nickels or quarters. The total amount of money you have is $1.15. Write a system of equations that represents this situation.
n + q = 1.15
.05n + .25q = 7
n + q = 7
5n + 25q = 1.15
You are signing up for college classes. Core classes count as 2 credits while electives count as 1 credit. You sign up for 7 classes that count for a total of 13 credits. Write a system of equations that represents this situation.
2x + 1y = 7
x + y = 13
2x + 1y = 13
x + y = 7
GOLDRUSH
You found a key! It should help you open the sheriff's treasure when you find it.
Back to Town