INTRO LOGIC

INTRO LOGIC TRANSLATIONS IN SENTENTIAL LOGIC2 DAY 06

Schedule for Unit 1 40% of Exam 10 arguments 4 pts each 60% of Exam 12 translations5 pts each

Standard Connectives(have special symbols) and & or  not  if–then 

Non-Standard Connectives(must be paraphrased) …xor… neither-nor if-otherwise …if… unless-in-which-case only if necessary if and only if sufficient unless

Non-Standard Connectives – 1 • xor • or, butnotboth and • (  ) &( & ) •  • ( & ) (  & ) exclusive ‘or’

Non-Standard Connectives – 2 neither-nor neithernor notandnot &   (  )

Non-Standard Connectives – 3 • if • ifthen •  …if…

Non-Standard Connectives – 4 only if onlyif notifnot ifnot then not   

Non-Standard Connectives – 5 if and only if  if and onlyif  if and onlyif (  ) & (    )

Non-Standard Connectives – 6 unless  unless   if not   if not  if not  then    

…if…otherwise… • I will play tennis • if it is sunny; • otherwise, • I will play racketball T if S ;otherwise, R this answers two questions: what will I do if it's sunny? what will I do otherwise(i.e., if it is notsunny)? play tennis play racketball

if – otherwise (cont.) ifit’s sunny, then I’ll play tennis furthermore if it’s not sunny, then I’ll play racketball if S then T and ifnot S then R ( S  T ) & ( S  R )

…unless…in which case… • I will play tennis unless it rains, • in which case I will play squash T unless R, in which case S this answers two questions: what will I do unless it rains (i.e., if it does not rain)? what will I do in case it rains (i.e., if it doesrain)? play tennis play squash

unless-in-which-case (cont.) ifit doesnot rain, then I’ll play tennis furthermore if it does rain, then I’ll play squash ifR then T and if R then S ( R  T ) & ( R  S )

Necessary Conditions in order that I get an A it is necessary that I take 4 exams in order for me to get an A it is necessary for me to take 4 exams in order to get an A it is necessary to take 4 exams taking 4 exams is necessary for getting an A

Necessary Conditions (cont) • simplest paraphrase: • is necessary for This amounts to saying if does not happen, thenneither does  ifnot thennot 

Example taking 4 exams E is necessary forgetting an AA ifE does not happen, thenneither does A ifnot EthennotA EA

Sufficient Conditions in order that I get an A it is sufficient that I get a hundred in order for me to get an A it is sufficient for me to get a hundred in order to get an A it is sufficient to get a hundred getting a hundred is sufficient for getting an A

Sufficient Conditions (cont) • simplest paraphrase: • is sufficient for This amounts to saying ifdoes happen, thensodoes ifthen 

Example getting a hundred H is sufficient forgetting an AA ifHdoes happen, thensodoesA ifHthenA HA

Negations Of Necessity getting a hundred His notnecessary for getting an A A not ( H is nec for A ) ifnot H then not A  ( H  A ) it is not true that ifyou don’tget a hundred then you won’tget an A

Negations of Sufficiency taking all the exams Eis notsufficient forgetting an A A not ( E is suf for A ) if E then A  ( E  A ) it is not true that ifyou (merely) take all the exams then you will get an A

Basic Statements •  is necessary for  •  is sufficient for  •  is notnecessary for  •  is notsufficient for 

Combinations •  is bothnecessaryandsufficient for  •  is necessary, butnotsufficient, for  •  is sufficient, butnotnecessary, for  •  is neithernecessarynorsufficient for 

Example 1 • averaging (at least) fifty A • is bothnecessaryandsufficient for • passing P A is necessary for P ( A P ) and & A is sufficient for P ( A  P )

Example 2 • taking four exams E • is necessarybutnotsufficient for • getting an A A E is necessary for A ( E A ) but & E is not sufficient for A ( E  A )

Example 3 • getting a hundred H • is sufficientbutnotnecessaryfor • getting an A A H is sufficient for A ( H  A ) but & E is not necessary for A ( H A )

Example 4 • attending class A • is neithernecessarynorsufficient for • passing P A is not necessary for P ( A P ) and & A is notsufficient for P ( A  P )

THE END

INTRO LOGIC

INTRO LOGIC

Presentation Transcript

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

Intro to Logic

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

Intro to Logic

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC

INTRO LOGIC