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Math Discrete Mathematics and Its Applications

Determine which amounts of postage can be formed using just 4-cent and 11-cent stamps. Prove your answer to (a) using the principle of mathematical induction. Be sure to state explicitly your inductive hypothesis in the inductive step. c) Prove your answer to (a) using strong induction. How does the inductive hypothesis in this proof differ from that in the inductive hypothesis for a proof using mathematical induction?

Determine which amounts of postage can be formed using just 4-cent and 11-cent stamps. Prove your answer to (a) using the principle of mathematical induction. Be sure to state explicitly your inductive hypothesis in the inductive step. c) Prove your answer to (a) using strong induction. How does the inductive hypothesis in this proof differ from that in the inductive hypothesis for a proof using mathematical induction?

Discrete Mathematics and Its Applications

Discrete Mathematics and Its Applications

8th Edition

ISBN: 9781260501759

Author: ROSEN

Publisher: MCG

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Chapter 5.3, Problem 5E

Determine which amounts of postage can be formed using just 4-cent and 11-cent stamps.

Prove your answer to (a) using the principle of mathematical induction. Be sure to state explicitly your inductive hypothesis in the inductive step.

c)Prove your answer to (a) using strong induction. How does the inductive hypothesis in this proof differ from that in the inductive hypothesis for a proof using mathematical induction?

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Chapter 5.3, Problem 4E

Chapter 5.3, Problem 6E

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Chapter 5 Solutions

Discrete Mathematics and Its Applications

Ch. 5.1 - re are infinite]y many stations on a train route....Ch. 5.1 - pose that you know that a golfer plays theho1e of...Ch. 5.1 - P(n) be the statement...Ch. 5.1 - P(n) be the statementthat 13+ 23+ ... + n3=...Ch. 5.1 - ve...Ch. 5.1 - ve that1.1!+2.2!+...n.n!=(n+1)!1whenevernis a...Ch. 5.1 - ve that3+3.5+3.52+...+3.5n=3(5n+11)/4whenevernis a...Ch. 5.1 - ve that22.7+2.72...+2(7)n=(1(7)n+1)/4whenevernis a...Ch. 5.1 - a)Find a formula for the sum of the firstneven...Ch. 5.1 - a) Find a formula for 112+123++1m(n+1) by...

Ch. 5.1 - a) Find a formula for 12+14+18+...+12n by...Ch. 5.1 - ve that j=0n(12)=2n+1+(1)n32n whenevernis a...Ch. 5.1 - ve that1222+32...+(1)n1n2=(1)n1n(n+1)/2whenevernis...Ch. 5.1 - ve that for every positive...Ch. 5.1 - ve that for every positive integern,...Ch. 5.1 - ve that for every positive integern,...Ch. 5.1 - ve thatj=1nj4=n(n+1)(2n+1)(3n2+3n1)/30whenevernis...Ch. 5.1 - P(n) be the statement thatn!< nn, where n is an...Ch. 5.1 - P(n)be tie statement that 1+14+19+...+1n221n,...Ch. 5.1 - ve that3nn!if n is an integer greater than6.Ch. 5.1 - ve that2nn2ifnis an integer greater than 4.Ch. 5.1 - Prob. 22E Ch. 5.1 - which nonnegative integersnis2n+32n?Prove your...Ch. 5.1 - ve that1/(2n)[1.3.5..(2n1)]/(2.4....2n)whenevernis...Ch. 5.1 - ve that ifhi,then1+nh(1+h)nfor all nonnegative...Ch. 5.1 - pose that a and b are real numbers with o< b< a....Ch. 5.1 - ve that for every positive integern,...Ch. 5.1 - ve thatn27n+12is nonnegative whenevernis an...Ch. 5.1 - Prob. 29E Ch. 5.1 - ve that H1+H2+...+Hn=(n+1)Hnn Ch. 5.1 - mathematical induction in Exercises 31-37 to prove...Ch. 5.1 - mathematical induction in Exercises 31-37 to prove...Ch. 5.1 - mathematical induction in Exercises 31-37 to prove...Ch. 5.1 - mathematical induction in Exercises 31-37 to prove...Ch. 5.1 - mathematical induction in Exercises 31-37 to prove...Ch. 5.1 - mathematical induction in Exercises 31-37 to prove...Ch. 5.1 - Prob. 37E Ch. 5.1 - Prob. 38E Ch. 5.1 - Prob. 39E Ch. 5.1 - mathematical induction in Exercises 38-46 to prove...Ch. 5.1 - mathematical induction in Exercises 38-46 to prove...Ch. 5.1 - mathematical induction in Exercises 38-46 to prove...Ch. 5.1 - Prob. 43E Ch. 5.1 - mathematical induction in Exercises 38-46 to prove...Ch. 5.1 - mathematical induction in Exercises 38-46 to prove...Ch. 5.1 - mathematical induction in Exercises 38-46 to prove...Ch. 5.1 - Exercises 47 and 48 we consider the problem of...Ch. 5.1 - In Exercises 47 and 48 we consider the problem of...Ch. 5.1 - rcises 49-51 present incorrect proofs using...Ch. 5.1 - Exercises 49-51 present incorrect proofs using...Ch. 5.1 - rcises 49-51 present incorrect proofs using...Ch. 5.1 - pose thatmandnare positive integers withm >nandfis...Ch. 5.1 - Prob. 53E Ch. 5.1 - mathematical induction to show that given a set...Ch. 5.1 - Prob. 55E Ch. 5.1 - Prob. 56E Ch. 5.1 - 57.(Requires calculus) use mathematical induction...Ch. 5.1 - pose that A and B are square matrices with the...Ch. 5.1 - Prob. 59E Ch. 5.1 - Prob. 60E Ch. 5.1 - Prob. 61E Ch. 5.1 - w that n lines separate the plane into (n2+n+ 2)/...Ch. 5.1 - A=(a1+a2+...+an)/nG= and the geometric mean of...Ch. 5.1 - Prob. 64E Ch. 5.1 - Prob. 65E Ch. 5.1 - Prob. 66E Ch. 5.1 - Prob. 67E Ch. 5.1 - Prob. 68E Ch. 5.1 - pose there arenpeople in a group, each aware of a...Ch. 5.1 - pose there arenpeople in a group, each aware of a...Ch. 5.1 - Prob. 71E Ch. 5.1 - pose there arenpeople in a group, each aware of a...Ch. 5.1 - Prob. 73E Ch. 5.1 - etimes ire cannot use mathematical induction to...Ch. 5.1 - Prob. 75E Ch. 5.1 - etimes we cannot use mathematical induction to...Ch. 5.1 - nbe an even integer. Show that it is people to...Ch. 5.1 - Prob. 78E Ch. 5.1 - .Construct a ling using right triominoes of the 8...Ch. 5.1 - ve or disprovethatall checkerboards of these...Ch. 5.1 - w that a three-dimensional2n2n2ncheckerboard with...Ch. 5.1 - w that annncheckerboard with on square removed can...Ch. 5.1 - w that acheckerboard with a corner square removed...Ch. 5.1 - Prob. 84E Ch. 5.1 - Prob. 85E Ch. 5.2 - Use strong induction to show that if you can run...Ch. 5.2 - strong induction to show that all dominoes fall in...Ch. 5.2 - P(n)be the statement that a postage ofncents can...Ch. 5.2 - P(n)be the statement that a postage of n cents can...Ch. 5.2 - a)Determine which amounts of postage can be formed...Ch. 5.2 - a)Determine which amounts of postage can be formed...Ch. 5.2 - ch amount of money can b formed using just two...Ch. 5.2 - pose that a store offers gift certificates in...Ch. 5.2 - song induction to prove that2is irrational. [Hint:...Ch. 5.2 - Assume that a chocolate bar consists ofnsquares...Ch. 5.2 - sider this variation of the game of Nim. The game...Ch. 5.2 - . Use strong induction to show that every positive...Ch. 5.2 - A jigsaw puzzle is put together by successively...Ch. 5.2 - Supposeyou begin with apile ofnstones and split...Ch. 5.2 - Prob. 15E Ch. 5.2 - ve that the first player has a winning strategy...Ch. 5.2 - strong induction to show that if a simple polygon...Ch. 5.2 - strong induction to show that a simple po1gonPwith...Ch. 5.2 - Prob. 19E Ch. 5.2 - Prob. 20E Ch. 5.2 - the proof ofLemma 1we mentioned that many...Ch. 5.2 - rcises 22 and 23 present examples that show...Ch. 5.2 - Prob. 23E Ch. 5.2 - Prob. 24E Ch. 5.2 - pose thatP(n) is a propositional function....Ch. 5.2 - pose that ifp(n) is a propositional function....Ch. 5.2 - w that if the statement is for infinitely many...Ch. 5.2 - bbe a fix integer and a fixed positive integer....Ch. 5.2 - Prob. 29E Ch. 5.2 - d the flaw with the following "proof" thatan=1 for...Ch. 5.2 - w that strong induction is a valid method of proof...Ch. 5.2 - Prob. 32E Ch. 5.2 - Prob. 33E Ch. 5.2 - ve that (math) for all positive integerskandn,...Ch. 5.2 - Prob. 35E Ch. 5.2 - well-orderingproperty can be used to show that...Ch. 5.2 - a be an integer and b be a positive integer. Show...Ch. 5.2 - Prob. 38E Ch. 5.2 - you u se th e well - ord ering pr operty to pr o v...Ch. 5.2 - Prob. 40E Ch. 5.2 - w that the well-ordering property can be proved...Ch. 5.2 - w that principle of mathematical induction and...Ch. 5.2 - Prob. 43E Ch. 5.3 - Findf(1),f(2),f(3), andf(4) iff(n) is defined...Ch. 5.3 - Findf(1),f(2),f(3),f(4), andf(5)iff(n)is defined...Ch. 5.3 - LetP(n) bethestatementthata postage ofncents can...Ch. 5.3 - Prob. 4E Ch. 5.3 - Determine which amounts of postage can be formed...Ch. 5.3 - Determine which amounts of postage can be formed...Ch. 5.3 - e a recursive definition of the...Ch. 5.3 - Give a recursive definition of the sequence...Ch. 5.3 - Fbe the function such thatF(n) is the sum of the...Ch. 5.3 - en a recursive definition ofsm(n), the sum of the...Ch. 5.3 - e a recursive definition ofPm(n), the product of...Ch. 5.3 - Exercises 12—19fnis the nth Fibonacci 12.Prove...Ch. 5.3 - Exercises1219fnis the nth Fibonacci number....Ch. 5.3 - Exercises 12—l9fnis the nth Fibonacci *14.Show...Ch. 5.3 - Prob. 15E Ch. 5.3 - Prob. 16E Ch. 5.3 - Exercises 12-19fnis thenthFibonacci number....Ch. 5.3 - Exercises 12-19fnis thenthFibonacci number. 18....Ch. 5.3 - Prob. 19E Ch. 5.3 - e a recursive definition of the if functions max...Ch. 5.3 - Prob. 21E Ch. 5.3 - Prob. 22E Ch. 5.3 - Prob. 23E Ch. 5.3 - e a recursive definition of a)the set of odd...Ch. 5.3 - e a recursive definition of a)the set of even...Ch. 5.3 - Sbe the set of positive integers defined by Basis...Ch. 5.3 - Sbe the set of positive integers defined by Basis...Ch. 5.3 - Sbe the subset of the set of ordered pairs of...Ch. 5.3 - Sbe the subset of the set of ordered pairs of...Ch. 5.3 - e a recursive definition of each ofthesesets of...Ch. 5.3 - e arecursive definition of each of these sets of...Ch. 5.3 - ve that in a bit string, the string 01 occurs at...Ch. 5.3 - ine well-formed formulae of sets, variables...Ch. 5.3 - Prob. 34E Ch. 5.3 - Give a recursive definition of the...Ch. 5.3 - d the reversal of the following bit strings....Ch. 5.3 - e a recursive definition of the reversal of a...Ch. 5.3 - structural induction to prove that(w1w2)R=w2Rw1R.Ch. 5.3 - Prob. 39E Ch. 5.3 - the well-ordermg property to show that ifxandyare...Ch. 5.3 - n does a swing belong to eset Aof bit stings...Ch. 5.3 - ursively define the set of bit strings that have...Ch. 5.3 - Prob. 43E Ch. 5.3 - Prob. 44E Ch. 5.3 - structural induction to show thatn(T)>&[I)+inhere...Ch. 5.3 - Prob. 46E Ch. 5.3 - Prob. 47E Ch. 5.3 - generalized induction as was doneinExample 13to...Ch. 5.3 - A partition of a positive integer nis amy to...Ch. 5.3 - Prob. 50E Ch. 5.3 - sider the Mowing inductive definition of a version...Ch. 5.3 - Prob. 52E Ch. 5.3 - Prob. 53E Ch. 5.3 - sider the Mowing inductive definition of a version...Ch. 5.3 - sider the Mowing inductive definition of a version...Ch. 5.3 - Prob. 56E Ch. 5.3 - sider the Mowing inductive definition of a version...Ch. 5.3 - Prob. 58E Ch. 5.3 - Prob. 59E Ch. 5.3 - Prob. 60E Ch. 5.3 - Prob. 61E Ch. 5.3 - rcises 62-64 deal with iterations of the logarithm...Ch. 5.3 - rcises 62-64 deal with iterations of the logarithm...Ch. 5.3 - Prob. 64E Ch. 5.3 - Prob. 65E Ch. 5.3 - f(n)=n/2.Find a formula forf(k)(n).What is the...Ch. 5.3 - Prob. 67E Ch. 5.4 - ce Algorithm 1when it is givenn= 5 as input, That...Ch. 5.4 - Prob. 2E Ch. 5.4 - Prob. 3E Ch. 5.4 - Prob. 4E Ch. 5.4 - ce Algorithm 4 when it is given In=5,n= 11, andb=3...Ch. 5.4 - ce Algorithm 4 when it ism=7,n=10, andb=2 as...Ch. 5.4 - Prob. 7E Ch. 5.4 - e a recursive algorithm for finding the sum of the...Ch. 5.4 - Prob. 9E Ch. 5.4 - e a recursive algorithm for finding the maximum of...Ch. 5.4 - Prob. 11E Ch. 5.4 - ise a recursive algorithm for...Ch. 5.4 - e a recursive algorithm for...Ch. 5.4 - Give a recursive algorithm for finding mode of a...Ch. 5.4 - ise a recursive algorithm for computing the...Ch. 5.4 - ve that the recursive algorithm for finding the...Ch. 5.4 - Prob. 17E Ch. 5.4 - ve that Algorithm 1 for computingn! whennis a...Ch. 5.4 - Prob. 19E Ch. 5.4 - Prob. 20E Ch. 5.4 - Prob. 21E Ch. 5.4 - ve that the recursive algorithm that you found in...Ch. 5.4 - ise a recursive algorithm for computing for...Ch. 5.4 - ise a recursive algorithm to finda2n, whereais a...Ch. 5.4 - Prob. 25E Ch. 5.4 - the algorithm in Exercise 24 to devise an...Ch. 5.4 - does the number of multiplication used by the...Ch. 5.4 - many additions are used by the recursive and...Ch. 5.4 - ise a recursive algorithm to find thenthterm of...Ch. 5.4 - ise an iterative algorithm to find the nth term of...Ch. 5.4 - Prob. 31E Ch. 5.4 - ise a recursive algorithm to find the nth term of...Ch. 5.4 - Prob. 33E Ch. 5.4 - the recursive or the iterative algorithm for...Ch. 5.4 - Prob. 35E Ch. 5.4 - Prob. 36E Ch. 5.4 - e algorithm for finding the reversal of a bit...Ch. 5.4 - Prob. 38E Ch. 5.4 - Prob. 39E Ch. 5.4 - ve that the recursive algorithm for finding the...Ch. 5.4 - Prob. 41E Ch. 5.4 - Prob. 42E Ch. 5.4 - Prob. 43E Ch. 5.4 - a merge sort to sort 4.3,2,5, i, 8, 7, 6 into...Ch. 5.4 - Prob. 45E Ch. 5.4 - many comparisons are required to merge these pairs...Ch. 5.4 - Prob. 47E Ch. 5.4 - What theleast number comparisons needed to merge...Ch. 5.4 - ve that the merge sort algorithm is correct.Ch. 5.4 - Prob. 50E Ch. 5.4 - Prob. 51E Ch. 5.4 - quick sort is an efficient algorithm. To...Ch. 5.4 - Prob. 53E Ch. 5.4 - Prob. 54E Ch. 5.4 - Prob. 55E Ch. 5.5 - ve that the program segment y:=1z:=x+y is correct...Ch. 5.5 - ify that the program segment ifx0thenx:=0 is...Ch. 5.5 - ify that the progr am segment is correct with...Ch. 5.5 - Prob. 4E Ch. 5.5 - ise a rule of inference for verification of...Ch. 5.5 - the rule of inference developed in Exercise 5 to...Ch. 5.5 - Prob. 7E Ch. 5.5 - Prob. 8E Ch. 5.5 - Prob. 9E Ch. 5.5 - Prob. 10E Ch. 5.5 - Prob. 11E Ch. 5.5 - Prob. 12E Ch. 5.5 - a loop invariant to verify thattheEuclidean...Ch. 5 - Can you use theprinciple of mathematical induction...Ch. 5 - a) For which positive integersnis iin+ 17 S b)...Ch. 5 - Which amounts of postage can be formed using only...Ch. 5 - e two different examples of proofs that use strong...Ch. 5 - a) State the well-ordering property for the set of...Ch. 5 - Prob. 6RQ Ch. 5 - Prob. 7RQ Ch. 5 - Prob. 8RQ Ch. 5 - Prob. 9RQ Ch. 5 - Prob. 10RQ Ch. 5 - Prob. 11RQ Ch. 5 - Prob. 12RQ Ch. 5 - Prob. 13RQ Ch. 5 - Prob. 14RQ Ch. 5 - Prob. 15RQ Ch. 5 - Prob. 16RQ Ch. 5 - Prob. 1SE Ch. 5 - Prob. 2SE Ch. 5 - mathematica1 induction to show...Ch. 5 - Prob. 4SE Ch. 5 - Prob. 5SE Ch. 5 - mathematical induction to show...Ch. 5 - Prob. 7SE Ch. 5 - d an integ N such that2nn4whenevernan integer...Ch. 5 - Prob. 9SE Ch. 5 - Prob. 10SE Ch. 5 - Prob. 11SE Ch. 5 - Prob. 12SE Ch. 5 - Prob. 13SE Ch. 5 - Prob. 14SE Ch. 5 - Prob. 15SE Ch. 5 - Prob. 16SE Ch. 5 - Prob. 17SE Ch. 5 - Prob. 18SE Ch. 5 - mulate a conjecture about which Fibonacci nubs are...Ch. 5 - Prob. 20SE Ch. 5 - Prob. 21SE Ch. 5 - w thatfn+fn+2=ln+1whenevernis a positive integer,...Ch. 5 - Prob. 23SE Ch. 5 - Prob. 24SE Ch. 5 - Prob. 25SE Ch. 5 - Prob. 26SE Ch. 5 - Prob. 27SE Ch. 5 - (Requires calculus)Suppose that the...Ch. 5 - w ifnis a positive integer withn>2, then...Ch. 5 - Prob. 30SE Ch. 5 - Prob. 31SE Ch. 5 - (Requires calculus) Use mathematical induction and...Ch. 5 - Prob. 33SE Ch. 5 - Prob. 34SE Ch. 5 - Prob. 35SE Ch. 5 - mathematical induction to prove that ifx1,x2,...Ch. 5 - mathematical induction to prove that ifnpeople...Ch. 5 - pose that for every pair of cities in a country...Ch. 5 - Prob. 39SE Ch. 5 - Prob. 40SE Ch. 5 - Prob. 41SE Ch. 5 - Prob. 42SE Ch. 5 - Use mathematical induction to show that ifnis a...Ch. 5 - Prob. 44SE Ch. 5 - Prob. 45SE Ch. 5 - Prob. 46SE Ch. 5 - Prob. 47SE Ch. 5 - Prob. 48SE Ch. 5 - Prob. 49SE Ch. 5 - w thatnplanes divide three-dimensional...Ch. 5 - Prob. 51SE Ch. 5 - Prob. 52SE Ch. 5 - Prob. 53SE Ch. 5 - Prob. 54SE Ch. 5 - Prob. 55SE Ch. 5 - Prob. 56SE Ch. 5 - Prob. 57SE Ch. 5 - Prob. 58SE Ch. 5 - Prob. 59SE Ch. 5 - d all balanced string of parentheses with exactly...Ch. 5 - Prob. 61SE Ch. 5 - Prob. 62SE Ch. 5 - Prob. 63SE Ch. 5 - Prob. 64SE Ch. 5 - e a recursive algorithm for finding all balanced...Ch. 5 - Prob. 66SE Ch. 5 - Prob. 67SE Ch. 5 - Prob. 68SE Ch. 5 - Prob. 69SE Ch. 5 - Prob. 70SE Ch. 5 - Prob. 71SE Ch. 5 - Prob. 72SE Ch. 5 - Prob. 73SE Ch. 5 - Prob. 74SE Ch. 5 - Prob. 75SE Ch. 5 - Prob. 76SE Ch. 5 - Prob. 77SE Ch. 5 - Prob. 1CP Ch. 5 - Prob. 2CP Ch. 5 - Prob. 3CP Ch. 5 - Prob. 4CP Ch. 5 - Prob. 5CP Ch. 5 - Prob. 6CP Ch. 5 - Prob. 7CP Ch. 5 - Prob. 8CP Ch. 5 - Prob. 9CP Ch. 5 - Prob. 10CP Ch. 5 - en a nonnegative integern,find the nth Fibonacci...Ch. 5 - Prob. 12CP Ch. 5 - Prob. 13CP Ch. 5 - Prob. 14CP Ch. 5 - en a list of integers, sort these integers using...Ch. 5 - Prob. 1CAE Ch. 5 - Prob. 2CAE Ch. 5 - Prob. 3CAE Ch. 5 - Prob. 4CAE Ch. 5 - Prob. 5CAE Ch. 5 - Prob. 6CAE Ch. 5 - Prob. 7CAE Ch. 5 - pare either number of operations or the needed to...Ch. 5 - cribe the origins of mathematical induction. Who...Ch. 5 - lain how to prove the Jordan curve theorem for...Ch. 5 - Prob. 3WP Ch. 5 - cribe a variety of different app1icaons of the...Ch. 5 - Prob. 5WP Ch. 5 - e die recursive definition of Knuth’s up-arrow...Ch. 5 - Prob. 7WP Ch. 5 - lain how the ideas and concepts of program...

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