Final answer:
Using a system of equations where x is the number of circular tables and y is the number of rectangular tables, we found that there are 5 circular tables and 4 rectangular tables at the banquet.
Step-by-step explanation:
To determine the number of round and rectangular tables set up for the banquet, we need to establish a system of equations based on the information given. First, we define our variables: let x be the number of circular tables and y be the number of rectangular tables. The problem states that each circular table has 8 chairs and each rectangular table has 10 chairs. There are a total of 9 tables and 80 chairs.
This information gives us two equations based on the counts of tables and chairs:
- x + y = 9 (the total number of tables)
- 8x + 10y = 80 (the total number of chairs)
To solve this system, we can use either substitution or elimination. In this case, we can easily use substitution since the first equation provides a direct relationship between x and y.
We solve the first equation for y: y = 9 - x. Then, we substitute this into the second equation:
8x + 10(9 - x) = 80
8x + 90 - 10x = 80
-2x = -10
x = 5.
Since x is 5, we can find y by substituting x back into the first equation: y = 9 - 5, which gives y = 4.
Therefore, there are 5 circular tables and 4 rectangular tables set up for the banquet.