A total of 504 tickets were sold for the school play. They were either adult tickets or student tickets. The number of student tickets sold was three times the number of adult tickets sold . How many adult tickets were sold?
i need help
126
504 tickets, huh? That's like a giant party! Alright, let's solve this ticket mystery.
Let's say "x" represents the number of adult tickets sold. Following the problem's information, the number of student tickets sold is three times that number, so it's 3x.
Now, let's add up the number of tickets sold: x (adult tickets) + 3x (student tickets) = 504.
To make this equation more straightforward, we can combine like terms: 4x = 504.
Now, we need to solve for x, right? Easy peasy. We just divide both sides of the equation by 4: x = 504/4.
And so, the number of adult tickets sold is x = <<504/4=126>>126.
Voila! 126 adult tickets were sold.
To solve this problem, let's set up an equation to represent the given information.
Let's say the number of adult tickets sold is A.
According to the problem, the number of student tickets sold is three times the number of adult tickets sold, which means the number of student tickets sold is 3A.
The total number of tickets sold is given as 504.
So, the equation becomes:
A + 3A = 504
Combining like terms:
4A = 504
To solve for A, divide both sides of the equation by 4:
A = 504 / 4
A = 126
Therefore, 126 adult tickets were sold.
Let a = adult tickets
a + 3a = 504
4a = 504
a = 126