An organization sold 30 regular tickets and 58 VIP tickets, raising $9,346. Today, 26 regular tickets and 59 VIP tickets were sold, bringing in a total of $9,209. How much do the different ticket types cost?
Let X be the price of a regular ticket.
The organization raised $30X from the regular tickets.
The organization raised $58(X + Y) from the VIP tickets.
The total amount raised from the regular and VIP tickets is 3030X + 58Y = $9,346.
Let Z be the price of the VIP tickets.
Today, the organization sold 26 regular tickets for a total of 26X.
Today, the organization sold 59 VIP tickets for a total of 59Z.
The total amount raised from the regular and VIP tickets today is 26X + 59Z = $9,209.
Thus, 3030X + 58Y = $9,209.
We also know that 26X + 59Z = $9,209.
Therefore, 3030X - 26X + 58Y - 59Z = $9,346 - $9,209.
3004X - Z = $137.
Let's choose the price of X so that the equation is true.
Let's choose X = $30.
3004 * 30 - Z = $137.
3010 - Z = $137.
The price of a VIP ticket Z = $3010 - $137 = $2873. Answer: \boxed{2873}.