The Burbank Buy More store is going to make an order which will include at the most 60 refrigerators. What is the maximum number of TVs which could also be delivered on the same 18- wheeler? Describe the restrictions this would add to the original graph. I must assume that they will get the maximum number of refrigerators and plug 60 into the linear inequality and solve for y..
To find the maximum number of TVs that can be delivered on the same 18-wheeler with a maximum of 60 refrigerators, we need to consider the restrictions imposed by the dimensions and weight capacity of the delivery vehicle.
Let's assume that each refrigerator takes up a certain amount of space and weight on the 18-wheeler, which we'll represent as 'R'. Similarly, each TV takes up a certain amount of space and weight, which we'll represent as 'T'.
Since we want to maximize the number of TVs, we'll use 'x' to represent the number of TVs we can deliver. We can set up the following linear inequality to represent the space and weight restrictions on the delivery vehicle:
R * 60 + T * x ≤ maximum space and weight capacity
However, since we are only interested in finding the maximum number of TVs, we need to isolate 'x' in the inequality.
Substituting the value of 'R * 60' as 60 into the inequality, we have:
60 + T * x ≤ maximum space and weight capacity
Now, we can solve this inequality for 'x' by subtracting 60 from both sides:
T * x ≤ maximum space and weight capacity - 60
Then, divide both sides of the inequality by 'T':
x ≤ (maximum space and weight capacity - 60) / T
The value obtained by dividing 'maximum space and weight capacity - 60' by 'T' will give us the maximum number of TVs that can be delivered on the same 18-wheeler, assuming we have the maximum number of refrigerators (60).
By plugging in the appropriate values for 'maximum space and weight capacity' and 'T', you can calculate the maximum number of TVs that can be delivered.
The restrictions this adds to the original graph would mainly be in terms of the space and weight limitations of the delivery vehicle, which would limit the number of TVs that can be delivered when the refrigerators are at their maximum quantity.