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Determine the solution that will best achieve the company’s goals in project selection, including the projects selected and the levels of goal achievement.
S = $590,000, interest is 10% compounded semiannually, payments made at the end of each semiannual period for 8 years.
Show that any function from a discrete metric space X into a metric space Y is continuous.
Formulate this situation as two-person zero-sum game and solve for the value of the game and each player's optimal strategies.
Consider the usual action of on the set {1, 2,3,4, 5 }, and define an action of on the set of all 2-element subsets of {1, 2, . . . ,5 }
i) Find the gcd (210, 48) using factorizations into primes, Prove that there are no integers x, y, and z such that x^2 + y^2 + z^2 = 999
It was unfortunate that Rose and the other four coworkers in her department live in different suburbs because otherwise they might have been able to carpool.
A survey of 10355 people restricted to those who were either female or Hispanic or over 16 years of age, produced the following data.
Can you explain what do Singleton bound, the sphere-packing bound and the Varshamor-Gilbert mean?
Give a matrix that describes the game and argue that a population consisting solely of LIONS isn't stable, nor is one consisting solely of LAMBS.
Eight coins are identical in appearance, but one coin is either heavier or lighter than the others, which all weigh the same.
Determine whether ~ [~ (p V ~q) p V ~q. Explain the method(s) you used to determine your answer.
The sequence whose terms are constructed sequentially as follows: start with 1, then add 1, then multiply by 1, then add 2, then multiply by 2 and so on.
At a fair run by a local charity organization, it costs 50 cents to try one’s luck in drawing an ace from a deck of 52 playing cards.
These five homeowners each drink a different kind of beverage, smoke different brand of cigar and keep a different pet.
Which of the properties: reflexive, antisymmetric and transitive are true for the given relation?
Draw the directed graph of the equivalence relation found in part (2). Find the equivalence on A determined by F.
Given A = {1, 2, 3}, B = {3, 4, 5, 6,}, and C = {3, 5, 7}. Evaluate each set
Prove that there is a positive integer that equals the sum of the positive integers not exceeding it. Is your proof constructive or nonconstructive?
For a fixed positive integer n, the set of all complex numbers x such that x^n=1(that is, the set of all nth roots of 1),with operation multiplication.
Consider below the branching tree diagram based on the number per 3000 American adults.
A student thinks of a polynomial p(x) of arbitrary degree, and non-negative integer coefficients.
Total profit is defined as total revenue minus total cost. R(x) and C(x) are the revenue and cost from the sale of x televisions.
A vertical pole casts a shadow that is 12 ft. At the same time a yardstick casts a shadow that is 4 ft. How tall is the pole?
Results of the survey indicate that eight students own a cat, 15 students own a dog, and 5 students own both a cat and a dog.