Login
Register
@
Dark Mode
Profile
Edit my Profile
Messages
My favorites
Register
Activity
Q&A
Questions
Unanswered
Tags
Subjects
Users
Ask
Previous Years
Blogs
New Blog
Exams
Dark Mode
Recent questions tagged kenneth-rosen
0
votes
1
answer
1111
Kenneth Rosen Edition 6th Exercise 1.1 Question 40 (Page No. 19)
Fuzzy logic is used in artificial intelligence. In fuzzy logic, a proposition has a truth value that is a number between 0 and 1, inclusive.A proposition with a truth value of 0 is false and one with a truth value of 1 is ... . What are the truth values of the statements Fred and John are happy and Neither Fred nor John is happy?
go_editor
asked
in
Mathematical Logic
Apr 16, 2016
by
go_editor
1.5k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
descriptive
0
votes
1
answer
1112
Kenneth Rosen Edition 6th Exercise 1.1 Question 39 (Page No. 19)
Fuzzy logic is used in artificial intelligence. In fuzzy logic, a proposition has a truth value that is a number between 0 and 1, inclusive.A proposition with a truth value of 0 is false and one with a truth value of 1 is ... of the proposition. What are the truth values of the statements Fred is not happy and John is not happy?
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
843
views
mathematical-logic
discrete-mathematics
kenneth-rosen
descriptive
3
votes
1
answer
1113
Kenneth Rosen Edition 6th Exercise 1.1 Question 38 (Page No. 19)
Evaluate each of these expressions. 1 1000 $\wedge$ (0 1011 $\vee$ 1 1011) (0 1111 $\wedge$ 1 0101) $\vee$ 0 1000 (0 1010 $\oplus$ 1 1011) $\oplus$ 0 1000 (1 1011 $\vee$ 0 1010) $\wedge$ (1 0001 ∨ 1 1011)
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
3.8k
views
mathematical-logic
discrete-mathematics
kenneth-rosen
descriptive
0
votes
0
answers
1114
Kenneth Rosen Edition 6th Exercise 1.1 Question 37 (Page No. 19)
Find the bitwise OR, bitwise AND, and bitwise XOR of each of these pairs of bit strings. 101 1110, 010 0001 1111 0000, 1010 1010 00 0111 0001, 10 0100 1000 11 1111 1111, 00 0000 0000
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
2.5k
views
kenneth-rosen
mathematical-logic
discrete-mathematics
2
votes
1
answer
1115
Kenneth Rosen Edition 6th Exercise 1.1 Question 36 (Page No. 19)
What is the value of x after each of these statements is encountered in a computer program, if x = 1 before the statement is reached? if x + 2 = 3 then x := x + 1 if (x + 1 = 3) OR (2x + 2 = 3) then x := x + 1 if (2x + 3 = 5) AND (3x + 4 = 7) then x := x + 1 if (x + 1 = 2) XOR (x + 2 = 3) then x := x + 1 if x < 2 then x := x + 1
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
5.8k
views
mathematical-logic
kenneth-rosen
discrete-mathematics
2
votes
1
answer
1116
Kenneth Rosen Edition 7 Exercise 1.1 Question 41 (Page No. 16)
Explain, without using a truth table, why $(p \vee q \vee r) \wedge (\neg p \vee \neg q \vee \neg r)$ is true when at least one of p, q, and r is true and at least one is false, but is false when all three variables have the same truth value.
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
3.5k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
descriptive
1
vote
2
answers
1117
Kenneth Rosen Edition 7 Exercise 1.1 Question 40 (Page No. 16)
Explain, without using a truth table, why$ (p \vee \neg q) \wedge (q \vee \neg r) \wedge (r \vee \neg p)$ is true when p, q, and r have the same truth value and it is false otherwise.
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
2.8k
views
mathematical-logic
discrete-mathematics
kenneth-rosen
descriptive
0
votes
0
answers
1118
Kenneth Rosen Edition 6th Exercise 1.1 Question 35 (Page No. 19)
Construct a truth table for $(p \leftrightarrow q) \leftrightarrow (r \leftrightarrow s)$
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
397
views
kenneth-rosen
discrete-mathematics
mathematical-logic
descriptive
0
votes
1
answer
1119
Kenneth Rosen Edition 6th Exercise 1.1 Question 34 (Page No. 19)
Construct a truth table for $((p \rightarrow q) \rightarrow r) \rightarrow s$
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
755
views
kenneth-rosen
discrete-mathematics
mathematical-logic
0
votes
0
answers
1120
Kenneth Rosen Edition 6th Exercise 1.1 Question 33 (Page No. 19)
Construct a truth table for each of these compound propositions. $p \rightarrow (\neg q \vee r)$ $\neg p \rightarrow (q \rightarrow r)$ $(p \rightarrow q) \vee (\neg p \rightarrow r)$ ... $(\neg p \leftrightarrow \neg q) \leftrightarrow (q \leftrightarrow r)$
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
481
views
mathematical-logic
discrete-mathematics
kenneth-rosen
0
votes
1
answer
1121
Kenneth Rosen Edition 6th Exercise 1.1 Question 32 (Page No. 19)
Construct a truth table for each of these compound propositions. $(p \vee q) \vee r$ $(p \vee q) \wedge r$ $(p \wedge q) \vee r$ $(p \wedge q) \wedge r$ $(p \vee q) \wedge \neg r$ $(p \wedge q) \vee \neg r$
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
465
views
kenneth-rosen
discrete-mathematics
mathematical-logic
0
votes
0
answers
1122
Kenneth Rosen Edition 6th Exercise 1.1 Question 31 (Page No. 19)
Construct a truth table for each of these compound propositions. $p \rightarrow \neg q$ $\neg p \leftrightarrow q$ $(p \rightarrow q) \vee (\neg p \rightarrow q)$ $(p \rightarrow q) \wedge (\neg p \rightarrow q)$ ... $(\neg p \leftrightarrow \neg q) \leftrightarrow (p \leftrightarrow q)$
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
438
views
mathematical-logic
discrete-mathematics
kenneth-rosen
0
votes
1
answer
1123
Kenneth Rosen Edition 6th Exercise 1.1 Question 30 (Page No. 19)
Construct a truth table for each of these compound propositions. $p \oplus p$ $p \oplus \neg p$ $p \oplus \neg q$ $\neg p \oplus \neg q$ $(p \oplus q) \vee (p \oplus \neg q)$ $(p \oplus q) \wedge (p \oplus \neg q)$
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
599
views
mathematical-logic
discrete-mathematics
kenneth-rosen
0
votes
0
answers
1124
Kenneth Rosen Edition 6th Exercise 1.1 Question 29 (Page No. 19)
Construct a truth table for each of these compound propositions. $(p \vee q) \rightarrow (p \oplus q)$ $(p \oplus q) \rightarrow (p \wedge q)$ $(p \vee q) \oplus (p \wedge q)$ ... $(p \leftrightarrow q) \oplus (\neg p \leftrightarrow \neg r)$ $(p \oplus q) \rightarrow (p \oplus \neg q)$
go_editor
asked
in
Mathematical Logic
Apr 15, 2016
by
go_editor
665
views
kenneth-rosen
discrete-mathematics
mathematical-logic
3
votes
1
answer
1125
Kenneth Rosen Edition 6th Exercise 1.1 Question 28 (Page No. 19)
Construct a truth table for each of these compound propositions. $p \rightarrow \neg p$ $p \leftrightarrow \neg p$ $p \oplus (p \vee q)$ $(p \wedge q) \rightarrow (p \vee q)$ $(q \rightarrow \neg p) \leftrightarrow (p \leftrightarrow q)$ $(p \leftrightarrow q) \oplus (p \leftrightarrow \neg q)$
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
1.1k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
0
votes
1
answer
1126
Kenneth Rosen Edition 6th Exercise 1.1 Question 27 (Page No. 19)
Construct a truth table for each of these compound propositions. $p \wedge \neg p$ $p \vee \neg p$ $(p \vee \neg q) \rightarrow q$ $(p \vee q) \rightarrow (p \wedge q)$ $(p \rightarrow q) \leftrightarrow (\neg q \rightarrow \neg p)$ $(p \rightarrow q) \rightarrow (q \rightarrow p)$
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
1.8k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
3
votes
1
answer
1127
Kenneth Rosen Edition 6th Exercise 1.1 Question 26 (Page No. 19)
How many rows appear in a truth table for each of these compound propositions? $(q \rightarrow \neg p) \vee (\neg p \rightarrow \neg q)$ $(p \vee \neg t) \wedge (p \vee \neg s)$ $(p \rightarrow r) \vee (\neg s \rightarrow \neg t) \vee (\neg u \rightarrow v)$ $(p \wedge r \wedge s) \wedge (q \wedge t) \vee (r \wedge \neg t)$
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
5.2k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
0
votes
2
answers
1128
Kenneth Rosen Edition 6th Exercise 1.1 Question 25 (Page No. 19)
How many rows appear in a truth table for each of these compound propositions? $p \rightarrow \neg p$ $(p \vee \neg r) \wedge (q \vee \neg s)$ $q \vee p \vee \neg s \vee \neg r \vee \neg t \vee u$ $(p \wedge r \wedge t) \leftrightarrow (q \wedge t)$
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
1.4k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
3
votes
1
answer
1129
Kenneth Rosen Edition 6th Exercise 1.1 Question 24 (Page No. 19)
State the converse, contrapositive, and inverse of each of these conditional statements. If it snows tonight, then I will stay at home. I go to the beach whenever it is a sunny summer day. When I stay up late, it is necessary that I sleep until noon.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
13.6k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
2
votes
3
answers
1130
Kenneth Rosen Edition 6th Exercise 1.1 Question 23 (Page No. 18)
State the converse, contrapositive, and inverse of each of these conditional statements. If it snows today, I will ski tomorrow. I come to class whenever there is going to be a quiz. A positive integer is a prime only if it has no divisors other than 1 and itself.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
11.1k
views
mathematical-logic
kenneth-rosen
discrete-mathematics
3
votes
1
answer
1131
Kenneth Rosen Edition 6th Exercise 1.1 Question 22 (Page No. 18)
Write each of these propositions in the form p if and only if q in English. For you to get an A in this course, it is necessary and sufficient that you learn how to solve discrete mathematics problems. If you read the newspaper ... can see the wizard only if the wizard is not in, and the wizard is not in only if you can see him.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
6.2k
views
kenneth-rosen
mathematical-logic
descriptive
3
votes
1
answer
1132
Kenneth Rosen Edition 6th Exercise 1.1 Question 21 (Page No. 18)
Write each of these propositions in the form p if and only if q in English. If it is hot outside you buy an ice cream cone, and if you buy an ice cream cone it is hot outside. For you to win the contest it ... . If you watch television your mind will decay, and conversely. The trains run late on exactly those days when I take it.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
6.1k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
1
vote
2
answers
1133
Kenneth Rosen Edition 6th Exercise 1.1 Question 20 (Page No. 18)
Write each of these statements in the form if p, then q in English. [Hint: Refer to the list of common ways to express conditional statements] I will remember to send you the address only if you send me an e-mail ... have a valid password to log on to the server. You will reach the summit unless you begin your climb too late.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
9.3k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
3
votes
1
answer
1134
Kenneth Rosen Edition 6th Exercise 1.1 Question 19 (Page No. 18)
Write each of these statements in the form if p, then q in English. [Hint: Refer to the list of common ways to express conditional statements.] It snows whenever the wind blows from the northeast. The apple trees will bloom ... if you bought your CD player less than 90 days ago. Jan will go swimming unless the water is too cold.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
6.9k
views
mathematical-logic
discrete-mathematics
kenneth-rosen
4
votes
1
answer
1135
Kenneth Rosen Edition 6th Exercise 1.1 Question 18 (Page No. 18)
Write each of these statements in the form if p, then q in English. [Hint: Refer to the list of common ways to express conditional statements.] It is necessary to wash the boss's car to get promoted. Winds ... a subscription fee. Getting elected follows from knowing the right people. Carol gets seasick whenever she is on a boat.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
9.0k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
3
votes
2
answers
1136
Kenneth Rosen Edition 6th Exercise 1.1 Question 17 (Page No. 18)
For each of these sentences, state what the sentence means if the logical connective or is an inclusive or (that is, a disjunction) versus an exclusive or. Which of these meanings of or do you think is intended? To take discrete ... column B. School is closed if more than 2 feet of snow falls or if the wind chill is below −100.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
6.4k
views
kenneth-rosen
discrete-mathematics
mathematical-logic
3
votes
3
answers
1137
Kenneth Rosen Edition 6th Exercise 1.1 Question 16 (Page No. 18)
For each of these sentences, determine whether an inclusive or, or an exclusive or, is intended. Explain your answer. Experience with C++ or Java is required. Lunch includes soup or salad. To enter the country you need a passport or a voter registration card. Publish or perish.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
8.3k
views
kenneth-rosen
mathematical-logic
descriptive
5
votes
2
answers
1138
Kenneth Rosen Edition 6th Exercise 1.1 Question 15 (Page No. 18)
For each of these sentences, determine whether an inclusive or, or an exclusive or, is intended. Explain your answer. Coffee or tea comes with dinner. A password must have at least three digits or be at least eight characters long. ... is a course in number theory or a course in cryptography. You can pay using U.S. dollars or euros.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
9.8k
views
mathematical-logic
discrete-mathematics
kenneth-rosen
descriptive
1
vote
1
answer
1139
Kenneth Rosen Edition 6th Exercise 1.1 Question 14 (Page No. 18)
Determine whether each of these conditional statements is true or false. If 1 + 1 = 3, then unicorns exist. If 1 + 1 = 3, then dogs can fly. If 1 + 1 = 2, then dogs can fly. If 2 + 2 = 4, then 1 + 2 = 3
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
7.6k
views
mathematical-logic
discrete-mathematics
kenneth-rosen
1
vote
1
answer
1140
Kenneth Rosen Edition 6th Exercise 1.1 Question 13 (Page No. 17)
Determine whether each of these conditional statements is true or false. If 1 + 1 = 2, then 2 + 2 = 5. If 1 + 1 = 3, then 2 + 2 = 4. If 1 + 1 = 3, then 2 + 2 = 5. If monkeys can fly, then 1 + 1 = 3.
go_editor
asked
in
Mathematical Logic
Apr 14, 2016
by
go_editor
7.8k
views
mathematical-logic
discrete-mathematics
kenneth-rosen
Page:
« prev
1
...
33
34
35
36
37
38
39
next »
Subscribe to GATE CSE 2024 Test Series
Subscribe to GO Classes for GATE CSE 2024
Quick search syntax
tags
tag:apple
author
user:martin
title
title:apple
content
content:apple
exclude
-tag:apple
force match
+apple
views
views:100
score
score:10
answers
answers:2
is accepted
isaccepted:true
is closed
isclosed:true
Recent Posts
Post GATE 2024 Guidance [Counseling tips and resources]
GATE CSE 2024 Result Responses
[Project Contest] Pytorch backend support for MLCommons Cpp Inference implementation
Participating in MLCommons Inference v4.0 submission (deadline is February 23 12pm IST)
IIITH PGEE 2024 Test Series by GO Classes
Subjects
All categories
General Aptitude
(3.5k)
Engineering Mathematics
(10.4k)
Digital Logic
(3.6k)
Programming and DS
(6.2k)
Algorithms
(4.8k)
Theory of Computation
(6.9k)
Compiler Design
(2.5k)
Operating System
(5.2k)
Databases
(4.8k)
CO and Architecture
(4.0k)
Computer Networks
(4.9k)
Artificial Intelligence
(79)
Machine Learning
(48)
Data Mining and Warehousing
(25)
Non GATE
(1.4k)
Others
(2.7k)
Admissions
(684)
Exam Queries
(1.6k)
Tier 1 Placement Questions
(17)
Job Queries
(80)
Projects
(11)
Unknown Category
(870)
64.3k
questions
77.9k
answers
244k
comments
80.0k
users
Recent questions tagged kenneth-rosen
Recent Blog Comments
category ?
Hi @Arjun sir, I have obtained a score of 591 in ...
download here
Can you please tell about IIT-H mtech CSE self...
Please add your admission queries here:...