Let's call the cost of each admission ticket "x". If there are 4 people in total, then there would be 4 admission tickets, so the total cost of the tickets without the coupon would be 4x.
If the coupon saves $20 off the total bill of $100, then the total bill after the coupon is applied is $100 - $20 = $80.
Since the total bill is equal to the cost of the admission tickets, we can set up the equation 4x = $80.
Solving for x, we divide both sides of the equation by 4:
4x/4 = $80/4
x = $20
Therefore, each admission ticket cost $20.
You and three friends each get an admission ticket to the town Carnival you have a coupon for $20 off the whole saved group money if the total bill is $100 how much did each admission ticket cost
3 answers
are you sure
I apologize for the confusion. Let's reevaluate the problem.
You and three friends each have an admission ticket to the town Carnival. There is a coupon available that gives a $20 discount for the entire group if the total bill is $100.
Let's represent the cost of each admission ticket as "x". The total cost of the admission tickets without the coupon is 4x because there are four people in total.
With the coupon discount, the total bill becomes $100 - $20 = $80.
Now we can solve for x:
4x = $80
Divide both sides of the equation by 4:
x = $80 / 4
x = $20
Therefore, each admission ticket costs $20.
I apologize for the previous confusion. Each admission ticket indeed costs $20.
You and three friends each have an admission ticket to the town Carnival. There is a coupon available that gives a $20 discount for the entire group if the total bill is $100.
Let's represent the cost of each admission ticket as "x". The total cost of the admission tickets without the coupon is 4x because there are four people in total.
With the coupon discount, the total bill becomes $100 - $20 = $80.
Now we can solve for x:
4x = $80
Divide both sides of the equation by 4:
x = $80 / 4
x = $20
Therefore, each admission ticket costs $20.
I apologize for the previous confusion. Each admission ticket indeed costs $20.