Let's assume that the regular price of each ticket is p dollars.
Since the tickets are on sale for $1.50 off the regular price, the sale price of each ticket is p - $1.50.
Dea buys 6 tickets, so her total cost is 6 times the sale price: 6(p - $1.50).
According to the given information, her total cost is $51, so we can write the equation: 6(p - $1.50) = $51.
To solve the equation, we can first distribute the 6: 6p - $9 = $51.
Then, we can isolate the variable by adding $9 to both sides: 6p = $60.
Finally, we divide both sides by 6 to get the value of p: p = $10.
Therefore, the regular price of each ticket is $10.
A sentence to explain the answer: The regular price of each ticket is $10 because Dea's cost is $51 for 6 tickets, which is $1.50 off the regular price per ticket.
Tickets to the baseball game are on sale for $1.50 off the regular price. Dea buys 6 tickets. If her cost is $51, what is the regular price of each ticket? Write and solve an equation of the form p(xplus minus q)=r. Then write a sentence to explain your answer
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