Given that the total number of bedrooms in the entire complex is 7 thousand (7,000), we need to determine the number of three-bedroom units and four-bedroom units in the complex. Let's use the variables
�
x and
�
y to represent the number of three-bedroom and four-bedroom units respectively.
Each three-bedroom unit has 3 bedrooms, and each four-bedroom unit has 4 bedrooms. Therefore, we can set up the following equation to represent the total number of bedrooms in the complex:
3
�
+
4=
7000.
3x+4y=7000.
This equation reflects that the total number of bedrooms from three-bedroom units (3x) and four-bedroom units (4y) combined equals 7000.
To determine the number of three-bedroom units (x), we need more information.
It seems like the information provided isn't sufficient to directly solve for the values of x and y.
We need another equation or piece of information to find unique solutions for both variables.
If we're given another equation or information, such as the total number of units or a specific ratio of three-bedroom to four-bedroom units, we can proceed to solve the system of equations and find the values of
x and y.
In summary, with only the given information about the total number of bedrooms in the complex being 7,000, we need additional information or equations to determine the specific number of three-bedroom units and four-bedroom units in the complex.