Respuesta :
Answer:
The correct option is;
C. 100
Step-by-step explanation:
Here we have
Maximum profit = 50X + 60Y
8X + 10Y ≤ 800 (labor hours)
X + Y ≤ 120 (total units demanded)
4X + 5Y ≤ 500 (raw materials)
All variables ≥ 0
Then we have
(i) 8X + 10Y ≤ 800
X = 0 or 100
Y = 80 or 0
(ii) X + Y ≤ 120
X = 0 or 120
Y = 120 or 0
(iii) 4X + 5Y ≤ 500
X = 0 or 125
Y = 100 or 0
from a chart of the above values we have in the most possible region, we have
Y intercept at X = 0 and Y = 80
Origin at X = 0, Y = 0
X intercept at X = 100 and Y = 0
Therefore, to maximize profit we have z(50X + 60Y)
At Y intercept (0, 80) = 4800
At origin = 0
At X intercept (100, 0) = 5000
Therefore, the number of units of regular model, X for maximum profit should be 100.
In this exercise we have to analyze the functions and mark the alternative that best corresponds, that way we have:
The correct option is C
Here we have maximum profit equal to [tex]50X + 60Y[/tex]
[tex]8X + 10Y \leq 800 \\X + Y \leq 120 \\4X + 5Y \leq 500[/tex]
Then we have:
(i) The first equation is:
[tex]8X + 10Y \leq 800\\X = 0 \ or \ 100\\Y = 80 \ or \ 0[/tex]
(ii) The second equation is:
[tex]X + Y \leq 120\\X = 0 \ or\ 120\\Y = 120 \ or \ 0[/tex]
(iii) The third equation is:
[tex]4X + 5Y \leq 500\\X = 0 \ or \ 125\\Y = 100 \ or \ 0[/tex]
From a chart of the above values we have in the most possible region, we have:
- Y intercept at X = 0 and Y = 80
- Origin at X = 0, Y = 0
- X intercept at X = 100 and Y = 0
Therefore, to maximize profit we have:
- At Y intercept [tex](0, 80) = 4800[/tex]
- At origin = 0
- At X intercept [tex](100, 0) = 5000[/tex]
Therefore, the number of units of regular model, X for maximum profit should be 100.
See more about functions at brainly.com/question/5245372
