Question
Angie and Kenny play online video games. Angie buys 2 software and 2 moths of game play. Kenny buys 1 software and 1 month of game play. Each software package costs $50 If their total cost is $210, what is the cost of one month of game play?
Answers
GPT 3.5
Let's say the cost of one month of game play is x.
The total cost of Angie's software packages is 2*50 = $<<2*50=100>>100
Angie's cost for game play is 2*x = $<<2*x=2x>>2x
The total cost for game play is 100+2x = $<<100+2*x=100+2x>>100+2x.
Kenny's total cost for software is 1*$50 = $<<1*50=50>>50
Kenny's cost for game play is 1*x = $<<1*x=x>>x
Kenny's total cost of game play and software is $50+x = $<<50+x=50+x>>50+x.
The total cost for game play and software is 50+x+100+2x = $210
Combining like terms shows that 3x+150=210.
Subtracting 150 from both sides of the equation gives 3x=210-150=60
Dividing both sides by 3 gives x=60/3=<<60/3=20>>20. Answer: \boxed{20}.
The total cost of Angie's software packages is 2*50 = $<<2*50=100>>100
Angie's cost for game play is 2*x = $<<2*x=2x>>2x
The total cost for game play is 100+2x = $<<100+2*x=100+2x>>100+2x.
Kenny's total cost for software is 1*$50 = $<<1*50=50>>50
Kenny's cost for game play is 1*x = $<<1*x=x>>x
Kenny's total cost of game play and software is $50+x = $<<50+x=50+x>>50+x.
The total cost for game play and software is 50+x+100+2x = $210
Combining like terms shows that 3x+150=210.
Subtracting 150 from both sides of the equation gives 3x=210-150=60
Dividing both sides by 3 gives x=60/3=<<60/3=20>>20. Answer: \boxed{20}.