Critical thinking: A concise guide by Bowell & Kemp (4th edition) - a summary
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Critical thinking
Chapter 5
The practice of argument-reconstruction
The first step in reconstructing an argument is to make a list of the argument’s premises and conclusion as concisely and clearly as possible.
Making such a list is only the first step towards a complete reconstruction.
Expressive epithet: terms used to refer to some person, group or other entity but that characterize the entity referred to for rhetorical purposes.
When reconstructing arguments we should strive to display the logical relationships in an argument in the simplest, clearest and most familiar ways possible.
This is not always possible, and doing it will sometimes distract us from other points we are trying to make.
Not only do actual statements of arguments typically include a lot of material that is inessential to the argument, they often exclude some of what is essential to the argument.
Our task is to make the argument fully explicit.
A proposition is implicit: the proposition is part of the argument intended by the arguer but it has not actually been stated by the arguer.
To make a proposition explicit: to state it.
Connecting premise: the premise which you have to make explicit in order to make an argument valid.
Usually, when people give arguments, the premises they give explicitly will be only those which pertain to the particular facts or subject matter they are talking about.
Arguers very often leave implicit the more general assumptions they make.
We cannot assume that whenever an argument, as explicitly given, is neither valid nor inductively forceful, the intended argument is valid or inductively forceful.
It is not always the case that the arguer is implicitly relying on an appropriate connecting premise.
In other cases, the implicit connecting premise is just not true, in which case the argument is unsound.
Connecting premises are usually generalisations.
Covering generalisations need not be hard generalisations.
In such a case the inference from generalisation to instance is inductive rather than deductive.
Generalisations of the ‘All A are B’ sort are themselves conditionals, except they are generalised. The same goes for ‘No A are B’ form.
Very often, when people assert conditionals, they do so on the basis of some covering generalisation.
Connecting premises are almost always necessary, but they can fail to be sufficient to bring out the real basis of an argument.
When a proposition stated by the arguer is irrelevant to the reasoning that delivers the conclusion, that proposition should not be included in a reconstruction of the argument.
Why not include irrelevant material?
The truth-values of the premises actually advanced by an arguer can be more or less relevant to the soundness of the argument. Sometimes is is highly relevant that a given premise is false, sometimes is its much less so. It depends upon the nature of the mistake, and upon the role played in the argument by the premise.
Ambiguity
In reconstructing arguments, we have to eliminate any ambiguities in the original statement of the argument.
A primary purpose of reconstruction is to represent the propositions that constitute an argument in the clearest way.
There is not guarantee that we will not change or distort the arguer’s thinking, but there is no point in allowing ambiguous language to remain unchanged. We can simply not evaluate an argument if we do not know exactly what argument we are evaluating.
If we cannot decide between two interpretations of an ambiguity, we must give both interpretations of the argument, and evaluate the two arguments independently.
Vagueness
Important for critical reasoning are words whose meanings are vague.
We often have the feeling that these things are bad, or that they are good, without any precise idea of what they mean.
What they signify is typically a whole group or cluster of things that are not unified in any exact way.
(Like liberal or love).
In reconstructing arguments, the best thing to do with vague words is simply to eliminate them.
Many of the most rhetorically highly charged words in public discourse are vague. Eliminating them four our argument-reconstructions achieves two things:
The best thing to do with ambiguous or vague language is to replace it with language that is not vague or ambiguous.
The aim is to employ language that will express the intended propositions without ambiguity or vagueness.
But, this is not always possible.
Soft generalisations are very often expressed without any quantifier at all.
Since there is often confusion over the difference between hard and soft generalisations, we should, when constructing arguments, always make clear whether a generalisation is hard or soft. (The one exception to this is the case of statements about cause and effect).
The way to eliminate the ambiguity is to add an explicit quantifier.
The scope of generalisation
Subjects of generalisations: what the generalisations are about.
The scope of generalisations: how big the subject is.
It can be wider and narrower.
(For example: all cows or all black cows).
We can compare generalisation scopes only when the subject of one is a subset of the subject of the other.
It can sometimes be important to adjust the scope of a generalisation, making it either narrower or wider.
Usually, in reconstructing arguments, we have to narrow them.
By narrowing the generalisation, the issue is defined more exactly.
When reconstructing arguments, we should take care not to employ a hard generalisation that is wider in scope than we need if there is anything doubtful about the wider one that could be eliminated by employing a narrower one.
If a narrower (but hard) generalisation will suffice for constructing an argument for the desired conclusion, when we should employ the narrower one.
This is not to say we should always choose narrow generalisations whenever possible!
In some cases there is not natural word or phrase for the class of cases we wish to generalise about. In such cases we have to reduce the scope of a generalisation by explicitly accepting a certain class of what would otherwise be counterexamples.
Practical conclusions: a conclusion that enjoins or commends a particular action.
What the argument says is that doing one thing in necessary if a certain desirable outcome or end is to be achieved.
Practical reasoning: means-end reasoning.
Based upon two sorts of considerations:
But:
In reconstructing arguments, we need to incorporate both of the points above as premises.
Practical reasoning involves a weighing of one value (the value of the desired result) against another value (the negative value of the cost of the envisaged means of bringing about the desired result).
Almost any action could, in principle, be rationalised by practical reason.
In cases when the argument must be represented as inductive, we have to juggle three factors
There are only rough estimates. No one assumes that anyone can specify exactly how bad or how good outcomes would be relative to each other.
Expected value: for each possible outcome of the action, you multiply the probability of the outcome by its value (its cost or benefit, as the case may be). Then you add these figures together.
When given a range of possible actions, one should do whatever maximises expected value.
There is a certain limit to the application of expected value calculations: the expected value of a proposed action tells us whether or not it would be rational to do something, unless it is overridden by the existence of rights or moral rules.
In an explanation, the truth-value of that proposition is not in question.
Use the word ‘cause’ or ‘because’ in the conclusion.
Abduction
The generalisations appealed to in arguments of this kind are often soft rather than hard, and more generally the arguments can be inductive rather than deductive.
Abductive argument: an inductive explanation.
The best and most likely explanation.
Causal statements often appear as generalisations about types of events or states of affairs.
The word ‘cause’ does not always, or even typically, indicate hard generalisation of this kind.
In order to infer a causal relationship from a correlation between X and Y, we need to know that the correlation holds, or would hold, even when other possible causes of Y are absent or were present.
Where an argument contains a conditional among its premises, we have, in order to infer the consequent of the conditional, to write down its antecedent as a separate premise.
If P2 is a conditional whose antecedent is P1, instead of rewriting P1 out in full, we may abbreviate its simply as ‘P1’.
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This is a summary of the book 'Critical thinking: A concise guide' by Bowell and Kemp. The topics in this summary are about constructing arguments and recognizing good from bad arguments. In this summary, everything second year psychology students at the uva need in the
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