How is the claim “I am in New York only if I am in America” the same as "If I am in New York, then I am in America?What is the difference between “necessary” and “sufficient”?What are the truth tables for “necessary” and “sufficient”?What is a good argument against “ad populum”?What distinguishes logical necessity, logical consequence, logical truth, and tautology from one another?Connectives, polarity and logical atoms in Linear logicPeirce's law, law of the excluded middle, and intuitionism.Syllogistic Logic: Negation of a Categorical Proposition?Are there exceptions to the principle of the excluded middle?How can you rewrite without any conditionals 'If A then B; A; therefore B' ?Formal Logic: Truth-Value AnalysisCan one think outside of logical rules? If so how?Modus Ponens as Substitute for Syllogism
Can a Cauchy sequence converge for one metric while not converging for another?
Was any UN Security Council vote triple-vetoed?
dbcc cleantable batch size explanation
Important Resources for Dark Age Civilizations?
High voltage LED indicator 40-1000 VDC without additional power supply
How to source a part of a file
How do I deal with an unproductive colleague in a small company?
Why can't I see bouncing of switch on oscilloscope screen?
Theorems that impeded progress
Has there ever been an airliner design involving reducing generator load by installing solar panels?
Could an aircraft fly or hover using only jets of compressed air?
What does the "remote control" for a QF-4 look like?
Why is Minecraft giving an OpenGL error?
Paid for article while in US on F-1 visa?
Which country benefited the most from UN Security Council vetoes?
Can you really stack all of this on an Opportunity Attack?
What typically incentivizes a professor to change jobs to a lower ranking university?
How to determine what difficulty is right for the game?
Client team has low performances and low technical skills: we always fix their work and now they stop collaborate with us. How to solve?
What would happen to a modern skyscraper if it rains micro blackholes?
Did Shadowfax go to Valinor?
DC-DC converter from low voltage at high current, to high voltage at low current
How does one intimidate enemies without having the capacity for violence?
Can I make popcorn with any corn?
How is the claim “I am in New York only if I am in America” the same as "If I am in New York, then I am in America?
What is the difference between “necessary” and “sufficient”?What are the truth tables for “necessary” and “sufficient”?What is a good argument against “ad populum”?What distinguishes logical necessity, logical consequence, logical truth, and tautology from one another?Connectives, polarity and logical atoms in Linear logicPeirce's law, law of the excluded middle, and intuitionism.Syllogistic Logic: Negation of a Categorical Proposition?Are there exceptions to the principle of the excluded middle?How can you rewrite without any conditionals 'If A then B; A; therefore B' ?Formal Logic: Truth-Value AnalysisCan one think outside of logical rules? If so how?Modus Ponens as Substitute for Syllogism
It makes absolutely zero sense to me.
It would make sense if "I am in America" is the antecedent and the consequent is the former.
Even though it wouldn't be sound, it would make logical sense.
I hope someone could explain it in a way someone would to a beginner in logic.
Thanks
logic
edited 9 hours ago
Frank Hubeny
9,89251555
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
|
show 1 more comment
It makes absolutely zero sense to me.
It would make sense if "I am in America" is the antecedent and the consequent is the former.
Even though it wouldn't be sound, it would make logical sense.
I hope someone could explain it in a way someone would to a beginner in logic.
Thanks
logic
edited 9 hours ago
Frank Hubeny
9,89251555
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
1
Already discussed many times on this site; see e.g. what-is-the-difference-between-necessary-and-sufficient as well as what-are-the-truth-tables-for-necessary-and-sufficient
– Mauro ALLEGRANZA
10 hours ago
I made an edit which you may roll back or further edit.
– Frank Hubeny
9 hours ago
10
Are you perhaps interpreting the word "only" to be qualifying New York? A comma would help to clarify, as would an appropriate pause in the spoken sentence. In other words, do you understand this sentence to be "I am in New York, only if I am in America" or "I am in New York only, if I am in America." If you understood it to be the latter, then I agree that it is illogical. If you understood it to be the former, then hopefully the existing answers have helped you.
– Richard II
7 hours ago
Technically if you were in New York you might be in a foreign embassy and not in "America"
– Mark Schultheiss
3 hours ago
@MarkSchultheiss To take your technicality futher, are you still in new york if you are in an embassy? Is yes, then you are also in america (as you are saying the politics are irrelevant). If no, then you are also NOT in america
– user34150
2 hours ago
|
show 1 more comment
It makes absolutely zero sense to me.
It would make sense if "I am in America" is the antecedent and the consequent is the former.
Even though it wouldn't be sound, it would make logical sense.
I hope someone could explain it in a way someone would to a beginner in logic.
Thanks
logic
edited 9 hours ago
Frank Hubeny
9,89251555
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
It makes absolutely zero sense to me.
It would make sense if "I am in America" is the antecedent and the consequent is the former.
Even though it wouldn't be sound, it would make logical sense.
I hope someone could explain it in a way someone would to a beginner in logic.
Thanks
logic
logic
edited 9 hours ago
Frank Hubeny
9,89251555
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
edited 9 hours ago
Frank Hubeny
9,89251555
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
edited 9 hours ago
Frank Hubeny
9,89251555
edited 9 hours ago
Frank Hubeny
9,89251555
edited 9 hours ago
Frank Hubeny
9,89251555
9,89251555
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
asked 10 hours ago
MinigameZ moreMinigameZ more
8615
8615
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
New contributor
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
MinigameZ more is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
1
Already discussed many times on this site; see e.g. what-is-the-difference-between-necessary-and-sufficient as well as what-are-the-truth-tables-for-necessary-and-sufficient
– Mauro ALLEGRANZA
10 hours ago
I made an edit which you may roll back or further edit.
– Frank Hubeny
9 hours ago
10
Are you perhaps interpreting the word "only" to be qualifying New York? A comma would help to clarify, as would an appropriate pause in the spoken sentence. In other words, do you understand this sentence to be "I am in New York, only if I am in America" or "I am in New York only, if I am in America." If you understood it to be the latter, then I agree that it is illogical. If you understood it to be the former, then hopefully the existing answers have helped you.
– Richard II
7 hours ago
Technically if you were in New York you might be in a foreign embassy and not in "America"
– Mark Schultheiss
3 hours ago
@MarkSchultheiss To take your technicality futher, are you still in new york if you are in an embassy? Is yes, then you are also in america (as you are saying the politics are irrelevant). If no, then you are also NOT in america
– user34150
2 hours ago
|
show 1 more comment
1
Already discussed many times on this site; see e.g. what-is-the-difference-between-necessary-and-sufficient as well as what-are-the-truth-tables-for-necessary-and-sufficient
– Mauro ALLEGRANZA
10 hours ago
I made an edit which you may roll back or further edit.
– Frank Hubeny
9 hours ago
10
Are you perhaps interpreting the word "only" to be qualifying New York? A comma would help to clarify, as would an appropriate pause in the spoken sentence. In other words, do you understand this sentence to be "I am in New York, only if I am in America" or "I am in New York only, if I am in America." If you understood it to be the latter, then I agree that it is illogical. If you understood it to be the former, then hopefully the existing answers have helped you.
– Richard II
7 hours ago
Technically if you were in New York you might be in a foreign embassy and not in "America"
– Mark Schultheiss
3 hours ago
@MarkSchultheiss To take your technicality futher, are you still in new york if you are in an embassy? Is yes, then you are also in america (as you are saying the politics are irrelevant). If no, then you are also NOT in america
– user34150
2 hours ago
1
1
Already discussed many times on this site; see e.g. what-is-the-difference-between-necessary-and-sufficient as well as what-are-the-truth-tables-for-necessary-and-sufficient
– Mauro ALLEGRANZA
10 hours ago
Already discussed many times on this site; see e.g. what-is-the-difference-between-necessary-and-sufficient as well as what-are-the-truth-tables-for-necessary-and-sufficient
– Mauro ALLEGRANZA
10 hours ago
I made an edit which you may roll back or further edit.
– Frank Hubeny
9 hours ago
I made an edit which you may roll back or further edit.
– Frank Hubeny
9 hours ago
10
10
Are you perhaps interpreting the word "only" to be qualifying New York? A comma would help to clarify, as would an appropriate pause in the spoken sentence. In other words, do you understand this sentence to be "I am in New York, only if I am in America" or "I am in New York only, if I am in America." If you understood it to be the latter, then I agree that it is illogical. If you understood it to be the former, then hopefully the existing answers have helped you.
– Richard II
7 hours ago
Are you perhaps interpreting the word "only" to be qualifying New York? A comma would help to clarify, as would an appropriate pause in the spoken sentence. In other words, do you understand this sentence to be "I am in New York, only if I am in America" or "I am in New York only, if I am in America." If you understood it to be the latter, then I agree that it is illogical. If you understood it to be the former, then hopefully the existing answers have helped you.
– Richard II
7 hours ago
Technically if you were in New York you might be in a foreign embassy and not in "America"
– Mark Schultheiss
3 hours ago
Technically if you were in New York you might be in a foreign embassy and not in "America"
– Mark Schultheiss
3 hours ago
@MarkSchultheiss To take your technicality futher, are you still in new york if you are in an embassy? Is yes, then you are also in america (as you are saying the politics are irrelevant). If no, then you are also NOT in america
– user34150
2 hours ago
@MarkSchultheiss To take your technicality futher, are you still in new york if you are in an embassy? Is yes, then you are also in america (as you are saying the politics are irrelevant). If no, then you are also NOT in america
– user34150
2 hours ago
|
show 1 more comment
8 Answers
8
active
oldest
votes
Consider the sentence:
If I am in America then I am in New York.
One could make the antecedent, "I am in America", true by being in Chicago. But then the consequent, "I am in New York", would be false. So this conditional would be false unless we are given other information, such as travel plans, in addition to knowing that I am in America.
However, consider this sentence:
If I am in New York then I am in America.
Now whenever the antecedent, "I am in New York", is true, then so is the consequent, "I am in America". I don't need any additional information for that conditional to be true.
It would be similar for the following sentence:
I am in New York only if I am in America.
Here we are given that "I am in New York" and conclude that "I am in America". Except for English style this means the same as the previous sentence.
The authors of forall x provide a similar example using Paris and France in section "5.4 Condititional". They also provide this symbolization rule:
A sentence can be symbolized as A → B if it can be
paraphrased in English as ‘If A, then B’ or ‘A only if B’.
P. D. Magnus, Tim Button with additions by J. Robert Loftis remixed and revised by Aaron Thomas-Bolduc, Richard Zach, forallx Calgary Remix: An Introduction to Formal Logic, Fall 2018 bis. http://forallx.openlogicproject.org/
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
This way of converting the sentence to logic does not do justice to the sentence's implications in English. The "only" version of the sentence could easily be read as "if and only if" (that is, a two-way implication).
– Brilliand
1 hour ago
add a comment |
This is an example of the confusion inherent in switching between a natural language like English, and a formal language of logic.
The formulation
X only if Y
is rare in spoken English, but perfectly grammatical, and it typically has a logical meaning equivalent to
If X then Y
Both statements are saying you can't ever have X without Y. However, at first glance it looks closer to
If Y then X
which is entirely different. This represents how English has many different ways of saying the same thing (with incidental connotations and subtleties of meaning that are completely stripped out when you translate to a formal language).
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
add a comment |
"A only if B" and "if A, then B" mean the same.
The truth-condition for "if A, then B" excludes the case when A is True and B is False.
"A only if B" means that we cannot have A without B.
The two are equivalent.
See necessary and sufficient.
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
add a comment |
I see two interpretations of the sentence here. They mean logically different things. In both cases "only" is interpreted as "must be true and cannot be false".
I am in New York (only if I am in America).
If I am in New York, it can only be true that I am in America.
New York => America.
This is the interpretation everyone else is responding to. It is logically true.
I can be in (New York only) if I am in America.
If I am in America, then it can only be true that I am in New York.
America => New York.
This one is not logically true, you could be in Iowa.
answered 6 hours ago
usulusul
1312
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
My reading of the OP's first sentence could be paraphrased as "I am in New York, unless I am not in America". It's logically equivalent to your second version, I think, although reads like a statement about a particular person rather than a general statement about everyone.
– Brilliand
1 hour ago
add a comment |
The contrapositive of both statements is :
If I am not in America, then I cannot be in New York.
A conditional statement is logically equivalent to its contrapositive. It means both your statements are equivalent since they have the same contrapositive.
answered 2 hours ago
Eric DuminilEric Duminil
92649
1
I think this answer is correct.
– Mark Andrews
52 mins ago
add a comment |
These claims have distinctly different connotations. From a pure formal-logic perspective, the "X only if Y" is equivalent to "Y or not X" which is the same as "X implies Y", which is the same as "if X then Y". However, natural language carries more information than its simple-minded reduction to predicate logic.
The second formulation "If I am in NY then I am in USA" sounds like a simple statement of a containment relationship: it implies that "I" am an unbound variable and informs the listener that NY is within the USA.
The first formulation connotes something about the speaker's mental state: he entertains the possibility (perhaps even likelihood) of being outside the USA in a place confusingly-similar to NY.
answered 2 hours ago
IanIan
1212
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
add a comment |
LOL - The two statements are not equivalent.
You could be in New York - Lazio - Italy
answered 2 hours ago
MaxWMaxW
291
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
1
That means that "If I'm in New York then I'm in America" is false, but it doesn't mean that it's not equivalent to "I'm in New York only if I'm in America".
– Eliran
2 hours ago
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review
– Mark Andrews
28 mins ago
add a comment |
One way of analyzing the statements is to look at a truth table. Let's make the following definitions:
A := "I am in New York"
B := "I am in America".
X := "I am in New York only if I am in America"
Y := "If I am in New York, then I am in America"
If both A and B are true, then X is true. We can write that as X(TT) = T. We have X(TF) = F (If you are in New York but not in America, then the statement "I am in New York only if I am in America" must be false). X(FT) = T and X(FF) = T; X makes a statement about what has to be true when you're in New York, so if you're not in New York, then X isn't telling you anything so it can't be proven wrong.
If you analyze Y, you'll find that all the values are the same:
X(TT) = Y(TT) = T
X(TF) = Y(TF) = F
X(FT) = Y(FT) = T
X(FF) = Y(FF) = T
Since no matter the truth values of A and B, X has the same truth value as Y, X and Y are equivalent; if you have two statements such that it's not possible for one to be true and the other false, then the two statements are saying essentially the same thing.
One thing to keep in mind is that in Formal Logic, statements of the form "If S1 then S2" are considered true any time S1 is false; that is, "If S1 then S2" is interpreted as meaning "Whenever S1 is true, S2 is also true". Because of this, "If S1 then S2" is equivalent to "Either S1 is false, or S2 is true" (if S1 is false, then the statement is automatically true, because it doesn't say anything about the situation of S1 being true). And "S1 only if S2 " is also equivalent to "Either S1 is false, or S2 is true".
answered 1 hour ago
AcccumulationAcccumulation
812110
add a comment |
Your Answer
StackExchange.ready(function()
var channelOptions =
tags: "".split(" "),
id: "265"
;
initTagRenderer("".split(" "), "".split(" "), channelOptions);
StackExchange.using("externalEditor", function()
// Have to fire editor after snippets, if snippets enabled
if (StackExchange.settings.snippets.snippetsEnabled)
StackExchange.using("snippets", function()
createEditor();
);
else
createEditor();
);
function createEditor()
StackExchange.prepareEditor(
heartbeatType: 'answer',
autoActivateHeartbeat: false,
convertImagesToLinks: false,
noModals: true,
showLowRepImageUploadWarning: true,
reputationToPostImages: null,
bindNavPrevention: true,
postfix: "",
imageUploader:
brandingHtml: "Powered by u003ca class="icon-imgur-white" href="https://imgur.com/"u003eu003c/au003e",
contentPolicyHtml: "User contributions licensed under u003ca href="https://creativecommons.org/licenses/by-sa/3.0/"u003ecc by-sa 3.0 with attribution requiredu003c/au003e u003ca href="https://stackoverflow.com/legal/content-policy"u003e(content policy)u003c/au003e",
allowUrls: true
,
noCode: true, onDemand: true,
discardSelector: ".discard-answer"
,immediatelyShowMarkdownHelp:true
);
);
MinigameZ more is a new contributor. Be nice, and check out our Code of Conduct.
Sign up or log in
StackExchange.ready(function ()
StackExchange.helpers.onClickDraftSave('#login-link');
);
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
StackExchange.ready(
function ()
StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fphilosophy.stackexchange.com%2fquestions%2f61623%2fhow-is-the-claim-i-am-in-new-york-only-if-i-am-in-america-the-same-as-if-i-am%23new-answer', 'question_page');
);
Post as a guest
Required, but never shown
8 Answers
8
active
oldest
votes
8 Answers
8
active
oldest
votes
active
oldest
votes
active
oldest
votes
Consider the sentence:
If I am in America then I am in New York.
One could make the antecedent, "I am in America", true by being in Chicago. But then the consequent, "I am in New York", would be false. So this conditional would be false unless we are given other information, such as travel plans, in addition to knowing that I am in America.
However, consider this sentence:
If I am in New York then I am in America.
Now whenever the antecedent, "I am in New York", is true, then so is the consequent, "I am in America". I don't need any additional information for that conditional to be true.
It would be similar for the following sentence:
I am in New York only if I am in America.
Here we are given that "I am in New York" and conclude that "I am in America". Except for English style this means the same as the previous sentence.
The authors of forall x provide a similar example using Paris and France in section "5.4 Condititional". They also provide this symbolization rule:
A sentence can be symbolized as A → B if it can be
paraphrased in English as ‘If A, then B’ or ‘A only if B’.
P. D. Magnus, Tim Button with additions by J. Robert Loftis remixed and revised by Aaron Thomas-Bolduc, Richard Zach, forallx Calgary Remix: An Introduction to Formal Logic, Fall 2018 bis. http://forallx.openlogicproject.org/
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
This way of converting the sentence to logic does not do justice to the sentence's implications in English. The "only" version of the sentence could easily be read as "if and only if" (that is, a two-way implication).
– Brilliand
1 hour ago
add a comment |
Consider the sentence:
If I am in America then I am in New York.
One could make the antecedent, "I am in America", true by being in Chicago. But then the consequent, "I am in New York", would be false. So this conditional would be false unless we are given other information, such as travel plans, in addition to knowing that I am in America.
However, consider this sentence:
If I am in New York then I am in America.
Now whenever the antecedent, "I am in New York", is true, then so is the consequent, "I am in America". I don't need any additional information for that conditional to be true.
It would be similar for the following sentence:
I am in New York only if I am in America.
Here we are given that "I am in New York" and conclude that "I am in America". Except for English style this means the same as the previous sentence.
The authors of forall x provide a similar example using Paris and France in section "5.4 Condititional". They also provide this symbolization rule:
A sentence can be symbolized as A → B if it can be
paraphrased in English as ‘If A, then B’ or ‘A only if B’.
P. D. Magnus, Tim Button with additions by J. Robert Loftis remixed and revised by Aaron Thomas-Bolduc, Richard Zach, forallx Calgary Remix: An Introduction to Formal Logic, Fall 2018 bis. http://forallx.openlogicproject.org/
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
This way of converting the sentence to logic does not do justice to the sentence's implications in English. The "only" version of the sentence could easily be read as "if and only if" (that is, a two-way implication).
– Brilliand
1 hour ago
add a comment |
Consider the sentence:
If I am in America then I am in New York.
One could make the antecedent, "I am in America", true by being in Chicago. But then the consequent, "I am in New York", would be false. So this conditional would be false unless we are given other information, such as travel plans, in addition to knowing that I am in America.
However, consider this sentence:
If I am in New York then I am in America.
Now whenever the antecedent, "I am in New York", is true, then so is the consequent, "I am in America". I don't need any additional information for that conditional to be true.
It would be similar for the following sentence:
I am in New York only if I am in America.
Here we are given that "I am in New York" and conclude that "I am in America". Except for English style this means the same as the previous sentence.
The authors of forall x provide a similar example using Paris and France in section "5.4 Condititional". They also provide this symbolization rule:
A sentence can be symbolized as A → B if it can be
paraphrased in English as ‘If A, then B’ or ‘A only if B’.
P. D. Magnus, Tim Button with additions by J. Robert Loftis remixed and revised by Aaron Thomas-Bolduc, Richard Zach, forallx Calgary Remix: An Introduction to Formal Logic, Fall 2018 bis. http://forallx.openlogicproject.org/
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
Consider the sentence:
If I am in America then I am in New York.
One could make the antecedent, "I am in America", true by being in Chicago. But then the consequent, "I am in New York", would be false. So this conditional would be false unless we are given other information, such as travel plans, in addition to knowing that I am in America.
However, consider this sentence:
If I am in New York then I am in America.
Now whenever the antecedent, "I am in New York", is true, then so is the consequent, "I am in America". I don't need any additional information for that conditional to be true.
It would be similar for the following sentence:
I am in New York only if I am in America.
Here we are given that "I am in New York" and conclude that "I am in America". Except for English style this means the same as the previous sentence.
The authors of forall x provide a similar example using Paris and France in section "5.4 Condititional". They also provide this symbolization rule:
A sentence can be symbolized as A → B if it can be
paraphrased in English as ‘If A, then B’ or ‘A only if B’.
P. D. Magnus, Tim Button with additions by J. Robert Loftis remixed and revised by Aaron Thomas-Bolduc, Richard Zach, forallx Calgary Remix: An Introduction to Formal Logic, Fall 2018 bis. http://forallx.openlogicproject.org/
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
answered 9 hours ago
Frank HubenyFrank Hubeny
9,89251555
9,89251555
This way of converting the sentence to logic does not do justice to the sentence's implications in English. The "only" version of the sentence could easily be read as "if and only if" (that is, a two-way implication).
– Brilliand
1 hour ago
add a comment |
This way of converting the sentence to logic does not do justice to the sentence's implications in English. The "only" version of the sentence could easily be read as "if and only if" (that is, a two-way implication).
– Brilliand
1 hour ago
This way of converting the sentence to logic does not do justice to the sentence's implications in English. The "only" version of the sentence could easily be read as "if and only if" (that is, a two-way implication).
– Brilliand
1 hour ago
This way of converting the sentence to logic does not do justice to the sentence's implications in English. The "only" version of the sentence could easily be read as "if and only if" (that is, a two-way implication).
– Brilliand
1 hour ago
add a comment |
This is an example of the confusion inherent in switching between a natural language like English, and a formal language of logic.
The formulation
X only if Y
is rare in spoken English, but perfectly grammatical, and it typically has a logical meaning equivalent to
If X then Y
Both statements are saying you can't ever have X without Y. However, at first glance it looks closer to
If Y then X
which is entirely different. This represents how English has many different ways of saying the same thing (with incidental connotations and subtleties of meaning that are completely stripped out when you translate to a formal language).
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
add a comment |
This is an example of the confusion inherent in switching between a natural language like English, and a formal language of logic.
The formulation
X only if Y
is rare in spoken English, but perfectly grammatical, and it typically has a logical meaning equivalent to
If X then Y
Both statements are saying you can't ever have X without Y. However, at first glance it looks closer to
If Y then X
which is entirely different. This represents how English has many different ways of saying the same thing (with incidental connotations and subtleties of meaning that are completely stripped out when you translate to a formal language).
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
add a comment |
This is an example of the confusion inherent in switching between a natural language like English, and a formal language of logic.
The formulation
X only if Y
is rare in spoken English, but perfectly grammatical, and it typically has a logical meaning equivalent to
If X then Y
Both statements are saying you can't ever have X without Y. However, at first glance it looks closer to
If Y then X
which is entirely different. This represents how English has many different ways of saying the same thing (with incidental connotations and subtleties of meaning that are completely stripped out when you translate to a formal language).
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
This is an example of the confusion inherent in switching between a natural language like English, and a formal language of logic.
The formulation
X only if Y
is rare in spoken English, but perfectly grammatical, and it typically has a logical meaning equivalent to
If X then Y
Both statements are saying you can't ever have X without Y. However, at first glance it looks closer to
If Y then X
which is entirely different. This represents how English has many different ways of saying the same thing (with incidental connotations and subtleties of meaning that are completely stripped out when you translate to a formal language).
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
answered 8 hours ago
Chris SunamiChris Sunami
21.2k12964
21.2k12964
add a comment |
add a comment |
"A only if B" and "if A, then B" mean the same.
The truth-condition for "if A, then B" excludes the case when A is True and B is False.
"A only if B" means that we cannot have A without B.
The two are equivalent.
See necessary and sufficient.
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
add a comment |
"A only if B" and "if A, then B" mean the same.
The truth-condition for "if A, then B" excludes the case when A is True and B is False.
"A only if B" means that we cannot have A without B.
The two are equivalent.
See necessary and sufficient.
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
add a comment |
"A only if B" and "if A, then B" mean the same.
The truth-condition for "if A, then B" excludes the case when A is True and B is False.
"A only if B" means that we cannot have A without B.
The two are equivalent.
See necessary and sufficient.
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
"A only if B" and "if A, then B" mean the same.
The truth-condition for "if A, then B" excludes the case when A is True and B is False.
"A only if B" means that we cannot have A without B.
The two are equivalent.
See necessary and sufficient.
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
edited 8 hours ago
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
answered 10 hours ago
Mauro ALLEGRANZAMauro ALLEGRANZA
29.5k22065
29.5k22065
add a comment |
add a comment |
I see two interpretations of the sentence here. They mean logically different things. In both cases "only" is interpreted as "must be true and cannot be false".
I am in New York (only if I am in America).
If I am in New York, it can only be true that I am in America.
New York => America.
This is the interpretation everyone else is responding to. It is logically true.
I can be in (New York only) if I am in America.
If I am in America, then it can only be true that I am in New York.
America => New York.
This one is not logically true, you could be in Iowa.
answered 6 hours ago
usulusul
1312
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
My reading of the OP's first sentence could be paraphrased as "I am in New York, unless I am not in America". It's logically equivalent to your second version, I think, although reads like a statement about a particular person rather than a general statement about everyone.
– Brilliand
1 hour ago
add a comment |
I see two interpretations of the sentence here. They mean logically different things. In both cases "only" is interpreted as "must be true and cannot be false".
I am in New York (only if I am in America).
If I am in New York, it can only be true that I am in America.
New York => America.
This is the interpretation everyone else is responding to. It is logically true.
I can be in (New York only) if I am in America.
If I am in America, then it can only be true that I am in New York.
America => New York.
This one is not logically true, you could be in Iowa.
answered 6 hours ago
usulusul
1312
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
My reading of the OP's first sentence could be paraphrased as "I am in New York, unless I am not in America". It's logically equivalent to your second version, I think, although reads like a statement about a particular person rather than a general statement about everyone.
– Brilliand
1 hour ago
add a comment |
I see two interpretations of the sentence here. They mean logically different things. In both cases "only" is interpreted as "must be true and cannot be false".
I am in New York (only if I am in America).
If I am in New York, it can only be true that I am in America.
New York => America.
This is the interpretation everyone else is responding to. It is logically true.
I can be in (New York only) if I am in America.
If I am in America, then it can only be true that I am in New York.
America => New York.
This one is not logically true, you could be in Iowa.
answered 6 hours ago
usulusul
1312
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
I see two interpretations of the sentence here. They mean logically different things. In both cases "only" is interpreted as "must be true and cannot be false".
I am in New York (only if I am in America).
If I am in New York, it can only be true that I am in America.
New York => America.
This is the interpretation everyone else is responding to. It is logically true.
I can be in (New York only) if I am in America.
If I am in America, then it can only be true that I am in New York.
America => New York.
This one is not logically true, you could be in Iowa.
answered 6 hours ago
usulusul
1312
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
answered 6 hours ago
usulusul
1312
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
answered 6 hours ago
usulusul
1312
answered 6 hours ago
usulusul
1312
1312
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
New contributor
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
usul is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
My reading of the OP's first sentence could be paraphrased as "I am in New York, unless I am not in America". It's logically equivalent to your second version, I think, although reads like a statement about a particular person rather than a general statement about everyone.
– Brilliand
1 hour ago
add a comment |
My reading of the OP's first sentence could be paraphrased as "I am in New York, unless I am not in America". It's logically equivalent to your second version, I think, although reads like a statement about a particular person rather than a general statement about everyone.
– Brilliand
1 hour ago
My reading of the OP's first sentence could be paraphrased as "I am in New York, unless I am not in America". It's logically equivalent to your second version, I think, although reads like a statement about a particular person rather than a general statement about everyone.
– Brilliand
1 hour ago
My reading of the OP's first sentence could be paraphrased as "I am in New York, unless I am not in America". It's logically equivalent to your second version, I think, although reads like a statement about a particular person rather than a general statement about everyone.
– Brilliand
1 hour ago
add a comment |
The contrapositive of both statements is :
If I am not in America, then I cannot be in New York.
A conditional statement is logically equivalent to its contrapositive. It means both your statements are equivalent since they have the same contrapositive.
answered 2 hours ago
Eric DuminilEric Duminil
92649
1
I think this answer is correct.
– Mark Andrews
52 mins ago
add a comment |
The contrapositive of both statements is :
If I am not in America, then I cannot be in New York.
A conditional statement is logically equivalent to its contrapositive. It means both your statements are equivalent since they have the same contrapositive.
answered 2 hours ago
Eric DuminilEric Duminil
92649
1
I think this answer is correct.
– Mark Andrews
52 mins ago
add a comment |
The contrapositive of both statements is :
If I am not in America, then I cannot be in New York.
A conditional statement is logically equivalent to its contrapositive. It means both your statements are equivalent since they have the same contrapositive.
answered 2 hours ago
Eric DuminilEric Duminil
92649
The contrapositive of both statements is :
If I am not in America, then I cannot be in New York.
A conditional statement is logically equivalent to its contrapositive. It means both your statements are equivalent since they have the same contrapositive.
answered 2 hours ago
Eric DuminilEric Duminil
92649
answered 2 hours ago
Eric DuminilEric Duminil
92649
answered 2 hours ago
Eric DuminilEric Duminil
92649
answered 2 hours ago
Eric DuminilEric Duminil
92649
92649
1
I think this answer is correct.
– Mark Andrews
52 mins ago
add a comment |
1
I think this answer is correct.
– Mark Andrews
52 mins ago
1
1
I think this answer is correct.
– Mark Andrews
52 mins ago
I think this answer is correct.
– Mark Andrews
52 mins ago
add a comment |
These claims have distinctly different connotations. From a pure formal-logic perspective, the "X only if Y" is equivalent to "Y or not X" which is the same as "X implies Y", which is the same as "if X then Y". However, natural language carries more information than its simple-minded reduction to predicate logic.
The second formulation "If I am in NY then I am in USA" sounds like a simple statement of a containment relationship: it implies that "I" am an unbound variable and informs the listener that NY is within the USA.
The first formulation connotes something about the speaker's mental state: he entertains the possibility (perhaps even likelihood) of being outside the USA in a place confusingly-similar to NY.
answered 2 hours ago
IanIan
1212
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
add a comment |
These claims have distinctly different connotations. From a pure formal-logic perspective, the "X only if Y" is equivalent to "Y or not X" which is the same as "X implies Y", which is the same as "if X then Y". However, natural language carries more information than its simple-minded reduction to predicate logic.
The second formulation "If I am in NY then I am in USA" sounds like a simple statement of a containment relationship: it implies that "I" am an unbound variable and informs the listener that NY is within the USA.
The first formulation connotes something about the speaker's mental state: he entertains the possibility (perhaps even likelihood) of being outside the USA in a place confusingly-similar to NY.
answered 2 hours ago
IanIan
1212
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
add a comment |
These claims have distinctly different connotations. From a pure formal-logic perspective, the "X only if Y" is equivalent to "Y or not X" which is the same as "X implies Y", which is the same as "if X then Y". However, natural language carries more information than its simple-minded reduction to predicate logic.
The second formulation "If I am in NY then I am in USA" sounds like a simple statement of a containment relationship: it implies that "I" am an unbound variable and informs the listener that NY is within the USA.
The first formulation connotes something about the speaker's mental state: he entertains the possibility (perhaps even likelihood) of being outside the USA in a place confusingly-similar to NY.
answered 2 hours ago
IanIan
1212
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
These claims have distinctly different connotations. From a pure formal-logic perspective, the "X only if Y" is equivalent to "Y or not X" which is the same as "X implies Y", which is the same as "if X then Y". However, natural language carries more information than its simple-minded reduction to predicate logic.
The second formulation "If I am in NY then I am in USA" sounds like a simple statement of a containment relationship: it implies that "I" am an unbound variable and informs the listener that NY is within the USA.
The first formulation connotes something about the speaker's mental state: he entertains the possibility (perhaps even likelihood) of being outside the USA in a place confusingly-similar to NY.
answered 2 hours ago
IanIan
1212
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
answered 2 hours ago
IanIan
1212
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
answered 2 hours ago
IanIan
1212
answered 2 hours ago
IanIan
1212
1212
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
New contributor
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
Ian is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
add a comment |
add a comment |
LOL - The two statements are not equivalent.
You could be in New York - Lazio - Italy
answered 2 hours ago
MaxWMaxW
291
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
1
That means that "If I'm in New York then I'm in America" is false, but it doesn't mean that it's not equivalent to "I'm in New York only if I'm in America".
– Eliran
2 hours ago
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review
– Mark Andrews
28 mins ago
add a comment |
LOL - The two statements are not equivalent.
You could be in New York - Lazio - Italy
answered 2 hours ago
MaxWMaxW
291
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
1
That means that "If I'm in New York then I'm in America" is false, but it doesn't mean that it's not equivalent to "I'm in New York only if I'm in America".
– Eliran
2 hours ago
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review
– Mark Andrews
28 mins ago
add a comment |
LOL - The two statements are not equivalent.
You could be in New York - Lazio - Italy
answered 2 hours ago
MaxWMaxW
291
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
LOL - The two statements are not equivalent.
You could be in New York - Lazio - Italy
answered 2 hours ago
MaxWMaxW
291
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
answered 2 hours ago
MaxWMaxW
291
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
answered 2 hours ago
MaxWMaxW
291
answered 2 hours ago
MaxWMaxW
291
291
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
New contributor
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
MaxW is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
1
That means that "If I'm in New York then I'm in America" is false, but it doesn't mean that it's not equivalent to "I'm in New York only if I'm in America".
– Eliran
2 hours ago
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review
– Mark Andrews
28 mins ago
add a comment |
1
That means that "If I'm in New York then I'm in America" is false, but it doesn't mean that it's not equivalent to "I'm in New York only if I'm in America".
– Eliran
2 hours ago
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review
– Mark Andrews
28 mins ago
1
1
That means that "If I'm in New York then I'm in America" is false, but it doesn't mean that it's not equivalent to "I'm in New York only if I'm in America".
– Eliran
2 hours ago
That means that "If I'm in New York then I'm in America" is false, but it doesn't mean that it's not equivalent to "I'm in New York only if I'm in America".
– Eliran
2 hours ago
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review
– Mark Andrews
28 mins ago
While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. - From Review
– Mark Andrews
28 mins ago
add a comment |
One way of analyzing the statements is to look at a truth table. Let's make the following definitions:
A := "I am in New York"
B := "I am in America".
X := "I am in New York only if I am in America"
Y := "If I am in New York, then I am in America"
If both A and B are true, then X is true. We can write that as X(TT) = T. We have X(TF) = F (If you are in New York but not in America, then the statement "I am in New York only if I am in America" must be false). X(FT) = T and X(FF) = T; X makes a statement about what has to be true when you're in New York, so if you're not in New York, then X isn't telling you anything so it can't be proven wrong.
If you analyze Y, you'll find that all the values are the same:
X(TT) = Y(TT) = T
X(TF) = Y(TF) = F
X(FT) = Y(FT) = T
X(FF) = Y(FF) = T
Since no matter the truth values of A and B, X has the same truth value as Y, X and Y are equivalent; if you have two statements such that it's not possible for one to be true and the other false, then the two statements are saying essentially the same thing.
One thing to keep in mind is that in Formal Logic, statements of the form "If S1 then S2" are considered true any time S1 is false; that is, "If S1 then S2" is interpreted as meaning "Whenever S1 is true, S2 is also true". Because of this, "If S1 then S2" is equivalent to "Either S1 is false, or S2 is true" (if S1 is false, then the statement is automatically true, because it doesn't say anything about the situation of S1 being true). And "S1 only if S2 " is also equivalent to "Either S1 is false, or S2 is true".
answered 1 hour ago
AcccumulationAcccumulation
812110
add a comment |
One way of analyzing the statements is to look at a truth table. Let's make the following definitions:
A := "I am in New York"
B := "I am in America".
X := "I am in New York only if I am in America"
Y := "If I am in New York, then I am in America"
If both A and B are true, then X is true. We can write that as X(TT) = T. We have X(TF) = F (If you are in New York but not in America, then the statement "I am in New York only if I am in America" must be false). X(FT) = T and X(FF) = T; X makes a statement about what has to be true when you're in New York, so if you're not in New York, then X isn't telling you anything so it can't be proven wrong.
If you analyze Y, you'll find that all the values are the same:
X(TT) = Y(TT) = T
X(TF) = Y(TF) = F
X(FT) = Y(FT) = T
X(FF) = Y(FF) = T
Since no matter the truth values of A and B, X has the same truth value as Y, X and Y are equivalent; if you have two statements such that it's not possible for one to be true and the other false, then the two statements are saying essentially the same thing.
One thing to keep in mind is that in Formal Logic, statements of the form "If S1 then S2" are considered true any time S1 is false; that is, "If S1 then S2" is interpreted as meaning "Whenever S1 is true, S2 is also true". Because of this, "If S1 then S2" is equivalent to "Either S1 is false, or S2 is true" (if S1 is false, then the statement is automatically true, because it doesn't say anything about the situation of S1 being true). And "S1 only if S2 " is also equivalent to "Either S1 is false, or S2 is true".
answered 1 hour ago
AcccumulationAcccumulation
812110
add a comment |
One way of analyzing the statements is to look at a truth table. Let's make the following definitions:
A := "I am in New York"
B := "I am in America".
X := "I am in New York only if I am in America"
Y := "If I am in New York, then I am in America"
If both A and B are true, then X is true. We can write that as X(TT) = T. We have X(TF) = F (If you are in New York but not in America, then the statement "I am in New York only if I am in America" must be false). X(FT) = T and X(FF) = T; X makes a statement about what has to be true when you're in New York, so if you're not in New York, then X isn't telling you anything so it can't be proven wrong.
If you analyze Y, you'll find that all the values are the same:
X(TT) = Y(TT) = T
X(TF) = Y(TF) = F
X(FT) = Y(FT) = T
X(FF) = Y(FF) = T
Since no matter the truth values of A and B, X has the same truth value as Y, X and Y are equivalent; if you have two statements such that it's not possible for one to be true and the other false, then the two statements are saying essentially the same thing.
One thing to keep in mind is that in Formal Logic, statements of the form "If S1 then S2" are considered true any time S1 is false; that is, "If S1 then S2" is interpreted as meaning "Whenever S1 is true, S2 is also true". Because of this, "If S1 then S2" is equivalent to "Either S1 is false, or S2 is true" (if S1 is false, then the statement is automatically true, because it doesn't say anything about the situation of S1 being true). And "S1 only if S2 " is also equivalent to "Either S1 is false, or S2 is true".
answered 1 hour ago
AcccumulationAcccumulation
812110
One way of analyzing the statements is to look at a truth table. Let's make the following definitions:
A := "I am in New York"
B := "I am in America".
X := "I am in New York only if I am in America"
Y := "If I am in New York, then I am in America"
If both A and B are true, then X is true. We can write that as X(TT) = T. We have X(TF) = F (If you are in New York but not in America, then the statement "I am in New York only if I am in America" must be false). X(FT) = T and X(FF) = T; X makes a statement about what has to be true when you're in New York, so if you're not in New York, then X isn't telling you anything so it can't be proven wrong.
If you analyze Y, you'll find that all the values are the same:
X(TT) = Y(TT) = T
X(TF) = Y(TF) = F
X(FT) = Y(FT) = T
X(FF) = Y(FF) = T
Since no matter the truth values of A and B, X has the same truth value as Y, X and Y are equivalent; if you have two statements such that it's not possible for one to be true and the other false, then the two statements are saying essentially the same thing.
One thing to keep in mind is that in Formal Logic, statements of the form "If S1 then S2" are considered true any time S1 is false; that is, "If S1 then S2" is interpreted as meaning "Whenever S1 is true, S2 is also true". Because of this, "If S1 then S2" is equivalent to "Either S1 is false, or S2 is true" (if S1 is false, then the statement is automatically true, because it doesn't say anything about the situation of S1 being true). And "S1 only if S2 " is also equivalent to "Either S1 is false, or S2 is true".
answered 1 hour ago
AcccumulationAcccumulation
812110
answered 1 hour ago
AcccumulationAcccumulation
812110
answered 1 hour ago
AcccumulationAcccumulation
812110
answered 1 hour ago
AcccumulationAcccumulation
812110
812110
add a comment |
add a comment |
MinigameZ more is a new contributor. Be nice, and check out our Code of Conduct.
MinigameZ more is a new contributor. Be nice, and check out our Code of Conduct.
MinigameZ more is a new contributor. Be nice, and check out our Code of Conduct.
MinigameZ more is a new contributor. Be nice, and check out our Code of Conduct.
Thanks for contributing an answer to Philosophy Stack Exchange!
- Please be sure to answer the question. Provide details and share your research!
But avoid …
- Asking for help, clarification, or responding to other answers.
- Making statements based on opinion; back them up with references or personal experience.
To learn more, see our tips on writing great answers.
Sign up or log in
StackExchange.ready(function ()
StackExchange.helpers.onClickDraftSave('#login-link');
);
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
StackExchange.ready(
function ()
StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fphilosophy.stackexchange.com%2fquestions%2f61623%2fhow-is-the-claim-i-am-in-new-york-only-if-i-am-in-america-the-same-as-if-i-am%23new-answer', 'question_page');
);
Post as a guest
Required, but never shown
Sign up or log in
StackExchange.ready(function ()
StackExchange.helpers.onClickDraftSave('#login-link');
);
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
Sign up or log in
StackExchange.ready(function ()
StackExchange.helpers.onClickDraftSave('#login-link');
);
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
Sign up or log in
StackExchange.ready(function ()
StackExchange.helpers.onClickDraftSave('#login-link');
);
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
1
Already discussed many times on this site; see e.g. what-is-the-difference-between-necessary-and-sufficient as well as what-are-the-truth-tables-for-necessary-and-sufficient
– Mauro ALLEGRANZA
10 hours ago
I made an edit which you may roll back or further edit.
– Frank Hubeny
9 hours ago
10
Are you perhaps interpreting the word "only" to be qualifying New York? A comma would help to clarify, as would an appropriate pause in the spoken sentence. In other words, do you understand this sentence to be "I am in New York, only if I am in America" or "I am in New York only, if I am in America." If you understood it to be the latter, then I agree that it is illogical. If you understood it to be the former, then hopefully the existing answers have helped you.
– Richard II
7 hours ago
Technically if you were in New York you might be in a foreign embassy and not in "America"
– Mark Schultheiss
3 hours ago
@MarkSchultheiss To take your technicality futher, are you still in new york if you are in an embassy? Is yes, then you are also in america (as you are saying the politics are irrelevant). If no, then you are also NOT in america
– user34150
2 hours ago