Capital Expansion McJester's Burger Hut plans to expand by opening several new restaurants. The chain operates two type
Posted: Mon May 02, 2022 4:09 pm
Capital Expansion
McJester's Burger Hut plans to expand by opening several
new restaurants. The chain operates two types of restaurants:
drive-through and full-service.
A drive-through restaurant costs $111,000 to construct,
requires 7 employees, and has an expected annual revenue of
$205,000.
A full-service restaurant costs $184,000 to construct,
requires 17 employees, and has an expected annual revenue of
$565,000.
McJester's has $3,250,000 in capital available for
expansion.
Labor contracts require that they higher no more than
325 employees.
Licensing restrictions require that they open no more
than 25 new restaurants.
Let x be the number of drive-through restaurants and let
y be the number of full-service restaurants in this
expansion. Let R be the expected annual revenue in dollars
resulting from the expansion.
McJester's wants to maximize the expected revenue.
Set up the linear programming problem.
Answer the following questions about this linear
programming problem.
I PASTED THE ANSWER CHOICES BELOW
23
a= [ Select ]
["205000", "111000", "17", "184000", "325", "7", "25",
"565000"]
b= [ Select ] ["25",
"205000", "565000", "111000", "325", "17", "184000",
"7"]
24
a= [ Select ]
["111000", "0", "565000", "184000", "3250000", "7", "17", "25",
"205000", "1", "325"]
b= [ Select ] ["1",
"184000", "25", "17", "325", "7", "3250000", "111000", "565000",
"205000", "0"]
◻= [ Select ] [">", "=",
"≥", "≤", "<", "≠"]
c= [ Select ] ["17",
"184000", "565000", "0", "325", "205000", "25", "111000", "1",
"3250000", "7"]
25
a= [ Select ] ["1",
"205000", "7", "0", "184000", "3250000", "325", "111000", "17",
"565000", "25"]
b= [ Select ]
["3250000", "1", "565000", "0", "205000", "25", "111000", "7",
"184000", "17", "325"]
◻= [ Select ] ["≠",
">", "=", "≥", "<", "≤"]
c= [ Select ] ["0",
"184000", "17", "25", "3250000", "7", "111000", "565000", "1",
"325", "205000"]
26
a= [ Select ]
["565000", "7", "205000", "111000", "3250000", "25", "17", "325",
"1", "0", "184000"]
b= [ Select ] ["25",
"184000", "0", "111000", "1", "565000", "17", "3250000", "7",
"205000", "325"]
◻= [ Select ] ["≥",
"=", ">", "≤", "<", "≠"]
c= [ Select ]
["565000", "205000", "17", "0", "184000", "7", "25", "1", "111000",
"325", "3250000"]
27
◻= [ Select ] ["<",
"=", ">", "≤", "≠", "≥"]
c= [ Select ] ["1",
"3250000", "111000", "565000", "184000", "325", "17", "7", "0",
"205000", "25"]
Question 23 2 pts The objective function is R= ax + by, for some values a and b. Find a and b. Round to the nearest integer. a = 205000 b 565000 Question 24 2 pts The problem constraint arising from McJester's limited capital has the form ax + by Ic for some values a, b, c, and some sign I. Find a, b, O, and c. a = [ Select] b [ Select ] = [ Select] C= [ Select]
Question 25 2 pts The problem constraint arising from labor contracts has the form ax + by Ic, for some values a, b, c, and some sign I. C, Find a, b, , and C. a= [ Select ] b= [Select ] [ Select] c= [Select ]
Question 26 2 pts The problem constraint arising from licensing restrictions has the form ax + by c, for some values a, b, c, and some sign I. Find a, b, O, and c. a= [ Select] b = [ Select] [ Select] C = [ Select ] Question 27 1 pts The non-negative constraints have the form x, yc, for some value cand some sign I. Find and c. = 2 C = 0
McJester's Burger Hut plans to expand by opening several
new restaurants. The chain operates two types of restaurants:
drive-through and full-service.
A drive-through restaurant costs $111,000 to construct,
requires 7 employees, and has an expected annual revenue of
$205,000.
A full-service restaurant costs $184,000 to construct,
requires 17 employees, and has an expected annual revenue of
$565,000.
McJester's has $3,250,000 in capital available for
expansion.
Labor contracts require that they higher no more than
325 employees.
Licensing restrictions require that they open no more
than 25 new restaurants.
Let x be the number of drive-through restaurants and let
y be the number of full-service restaurants in this
expansion. Let R be the expected annual revenue in dollars
resulting from the expansion.
McJester's wants to maximize the expected revenue.
Set up the linear programming problem.
Answer the following questions about this linear
programming problem.
I PASTED THE ANSWER CHOICES BELOW
23
a= [ Select ]
["205000", "111000", "17", "184000", "325", "7", "25",
"565000"]
b= [ Select ] ["25",
"205000", "565000", "111000", "325", "17", "184000",
"7"]
24
a= [ Select ]
["111000", "0", "565000", "184000", "3250000", "7", "17", "25",
"205000", "1", "325"]
b= [ Select ] ["1",
"184000", "25", "17", "325", "7", "3250000", "111000", "565000",
"205000", "0"]
◻= [ Select ] [">", "=",
"≥", "≤", "<", "≠"]
c= [ Select ] ["17",
"184000", "565000", "0", "325", "205000", "25", "111000", "1",
"3250000", "7"]
25
a= [ Select ] ["1",
"205000", "7", "0", "184000", "3250000", "325", "111000", "17",
"565000", "25"]
b= [ Select ]
["3250000", "1", "565000", "0", "205000", "25", "111000", "7",
"184000", "17", "325"]
◻= [ Select ] ["≠",
">", "=", "≥", "<", "≤"]
c= [ Select ] ["0",
"184000", "17", "25", "3250000", "7", "111000", "565000", "1",
"325", "205000"]
26
a= [ Select ]
["565000", "7", "205000", "111000", "3250000", "25", "17", "325",
"1", "0", "184000"]
b= [ Select ] ["25",
"184000", "0", "111000", "1", "565000", "17", "3250000", "7",
"205000", "325"]
◻= [ Select ] ["≥",
"=", ">", "≤", "<", "≠"]
c= [ Select ]
["565000", "205000", "17", "0", "184000", "7", "25", "1", "111000",
"325", "3250000"]
27
◻= [ Select ] ["<",
"=", ">", "≤", "≠", "≥"]
c= [ Select ] ["1",
"3250000", "111000", "565000", "184000", "325", "17", "7", "0",
"205000", "25"]
- Capital Expansion Mcjester S Burger Hut Plans To Expand By Opening Several New Restaurants The Chain Operates Two Type 1 (75.12 KiB) Viewed 56 times
Question 25 2 pts The problem constraint arising from labor contracts has the form ax + by Ic, for some values a, b, c, and some sign I. C, Find a, b, , and C. a= [ Select ] b= [Select ] [ Select] c= [Select ]
Question 26 2 pts The problem constraint arising from licensing restrictions has the form ax + by c, for some values a, b, c, and some sign I. Find a, b, O, and c. a= [ Select] b = [ Select] [ Select] C = [ Select ] Question 27 1 pts The non-negative constraints have the form x, yc, for some value cand some sign I. Find and c. = 2 C = 0