Reference no: EM13366541

PART A     

1. m mod n   will have values ranging from  0 to n-1.     

T or F

2. 42 MOD 6 and 49 MOD 7 are congruent.

T or F

3. The base system of the value 375 must be either decimal or octal.

T or F 

4. The value 638 has a maximum of 25 possible prime factors because the square root of 638 is 25+.

T or F

5. A Permutation of the elements of a set is an ordered arrangement of the elements of the set.     

 T or F     

6. P(9,2) = 72; C(7,4) = 35

T or F

7. Consider the following relations on {1, 2, 3 } :     

            R1 = { (1,1),  (2,2),  (3,3) },  and     

            R2 = { (1,2),  (1,3),  (3,2) }  

            R1 is symmetrical and R2 is transitive    

 

T or F     

8. Using members of the set {1, 3, 4, 5, 7, 8}, the next larger P(6,3) permutation after 342  is  343.     

T or F     

 

9. According to the Pigeonhole principle, when (m+7) items are to be placed in (m+5) boxes, there  will be more than one item in at least one box.     

T or F

 

10. Pascal's Triangle yields the value of the coefficients of an algebraic expansion.     

T or F

 

11. The probability of picking a "face" card (Jack, Queen or King) from a standard deck of playing cards is C(52,12).     

            T or F     

12. P(n,r) is equal to or greater than C(n,r) when n => 1.     

            T or F     

 

13. There are 101 positive integers not exceeding 457 that are divisible by either 7 or 11.     

T or F     

 

14. A brand of shirt comes in three basic colors, has male, female and unisex versions and has five  

      sizes for each.  This brand has a maximum of 11 different varieties.

T or F

PART B     

Divided questions are worth 3 points for each section - or as indicated.      

SHOW ALL WORK (within reason) in intermediate stages.  Clearly identify the final answer.     

1.         Determine:     

                        A).   -51 MOD 6     

                        B).   -83 MOD 7 

2.  Determine the Base10 expansion of (EC4) Base16     

3.  Define if the each set of integers are mutually relatively prime.  Defend your conclusion.     

                        A).   {8, 44, 55}     

                        B).   {7, 15, 26, 29, 37, 42}      

 

4.  Find the prime factors of the value 92,565.  Show the result  in proper exponential form. 

5.  Given:     

          A =   2750

          B =   2205   

                        Define by factoring:     

                        A).   gcd (A, B)           show in exponential form     

                        B).   lcm (A, B)           show in exponential form     

6.         Using the Euclidean Algorithm, determine:       

          GCD (23400, 770).     

7.   Convert  (1010 1011) Base2  to:     

                        A).   (          ) Base16     

                        B).   (          ) Base10      

 

8. Given 3419BASE10.  Determine the equivalent value in BASE5.   Hint: Use the Euclidean Algorithm

9. Define: (show intermediate work)     

     A.  P(9,7) =     

     B.  C(11,8) =      

 

10. What is the coefficient of  ( x^4 y^3 )  in the expansion  (x - 3y)^7 ?  You may leave the answer in a proper intermediate form.

11. Each locker in a building is labeled with three upper-case  alpha characters followed by two Base 16 characters.  What  is the maximum number of different locker numbers that can be  generated? 

12. A group of seven fair coins are flipped five times.  What is the probability that each result has three heads in each flip?

13. f(n)= 2*f(n/2) - 5 when n is even and f(1) = -3.

      a.  What is the value of f(4)?

      b.  What is the value of f(8)?

14. How many positive integers not exceeding 7235 are divisible by neither 15 nor 12?

15. Given |A| = |B| = |C| = 75,  |A INT B| = 20,

    |A INT C| = 40,  |A INT B INT C| = 10, and     

    |A  UNION  B  UNION  C| = 145 elements.

    |B INT C| = ?

16. List the next SIX terms of the lexicographic ordering of the n-tuple 36257 where each digit is in the set {2,3,5,6,7}.

17. Which lottery presents the player with the best odds for winning,  (A or B)?  Defend your answer.     

     A =  C(37,5)     

     B =  C(38,4)     

18. Determine if the following zero-one matrix is:    

 

    a. reflexive       T or F           |  1  1  1  |     

   b. symmetric    T or F           |  1  0  0  |

   c. transitive      T or F           |  1  0  1  |     

    Defend your answers.

.......................................................     

OPTIONAL QUESTION   DO ONE.     

 

A   Develop the Basis Step of the algorithm to determine the number of terms (cardinality) of the union of n mutually intersecting sets.  Show your work.

    For example, the cardinality of the union of three mutually intersecting sets is

            C(3,1) + C(3,2) + C(3,3) = 3+3+1 = 7. 

B.  Determine the Base3 value of 1642Base8.  Show your work

C.  In the past, US radio stations had call three or four letter call signs beginning with either K or W.  For example:  KSO, KDKA, WHO and WINZ.   What is the maximum possible number of   station call signs?    Defend your answer.