ADM 2302
Midterm Exam
Problem 1 (12 points) Consider the following linear program: Max Z = X1 2X2 Subject to 4X1 + 3X2 <= 3 X1 X2 <= 3 X1, X2 >= 0 a) Graph the feasible region for the problem. (4 points) b) Is the feasible region unbounded? Explain. (2 po
SOLUTION ADM 2302 Business Decision Models FINAL EXAM December 7, 2005 Last Name: _ Student #: _ First Name: _ Section: _ Michalowski (B) Jaber(C and D)
Professor (circle): Lane (A)
Instructions:
1. Please answer all the questions in the space provided. P
ADM 2302 Problem 1 Part a)
Midterm Exam
Winter 04
Let xij = number of ads of type i (1=N, 2=T, 3=R) to be produce at MRj (j: 1. 2, 3, 4) Minimize 16x11 + 10x12 + 12x13 + 12x14 + 26x21 + 20x22 + 30x23 + 21x24 + 22x31 + 15x32 + 23x33 + 14x34 subject to : x1
ADM 2302
Midterm Exam
Winter 04
ADM 2302 Winter, 2004 Section: E, F, and G MIDTERM EXAM February 14, 2004
Duration: 2 hours Student Name:
Student ID #:
Section: _
Instructions: 1. Please answer all the questions in the space provided. If you require more
ADM 2302
Midterm Exam
Student Name:
Student #:
Section:
_
Please answer all the questions in the space provided (If you require more space you may use the back of the page). Only answers in this booklet will be marked. You may use separate pages for the s
Problem #1 X1= 4, X2 = 2 (intersection of constraint 2 with constraint 3) Z = 18 Problem #2: a) If it costs $70 to produce 1000 tools at plant 1 and ship them to customer 1, what would be
the new solution to the problem and the profit? ( 1 point) This cor
MIDTERM EXAM ADM 2302 C INTRODUCTIION TO MANAGEMENT SCIENCE PROFESSOR: Rim Jaber Duration: 90 minutes
Question # 1 (6 points): Find the complete optimal solution to this Linear Programming problem. Min Z = 3x1 + 3x2 Subject to 12x1 + 4x2 >= 48 10x1 + 5x2