1.1. Intricacy

It hardly needs to be said that any prospect of interpreting the puzzles must take into account the intricacy of the relevant background: the incipient discussion of Theaetetus' first definition of knowledge (ἐπιστήμη) as ‘nothing other than perception (αἴσθησις)’ (151e2–3), followed by the first exposition of the core of the Protagorean/Heraclitean theory (152a–154a) which goes far beyond the bare import of the ‘Man the Measure’ dictum (152a3–4). More precisely, the pair of puzzles occupies the exact middle of the textual arch leading from the so called ‘Secret Doctrine’ – ‘as a result of movement, change and mixture with one another (πρὸς ἄλληλα), all the things which we say are, are coming to be’ (152d7–8) – to the causal account of the Heraclitean mechanism of αἴσθησις (156a–157c1). The question therefore arises whether the puzzles constitute an insulated digression – perhaps devoid of any substantive function, on Bertrand Russell's trenchant view: ‘the puzzles are not very germane to the argument, and may be ignored’Footnote ⁶ – or rather an integral aspect of the discussion of the Protagorean/Heraclitean doctrine as a whole.

Moreover, the puzzles are embedded within a dialogue phase that exhibits Plato's ability to use the same material to different ends. Socrates is pursuing a strategy on Protagoras' behalf: he presents the Protagorean/Heraclitean metaphysical and epistemological theses in such a way as to demonstrate the equation of knowing with perceiving. From the outset sense perception gains infallibility – Plato's hallmark of knowledge – by virtue of the relational nature of sensible qualities (152c5–6). At the same time, Socrates' investigation of the Protagorean/Heraclitean doctrine is creative, aiming to transform Theaetetus from passive reader of a text by Protagoras (‘you've read that, I take it?’, 152a4; cf. 155e1; 161c4; 162a1–3; 166d2; 170e9–171a1; 171b7, c6) into an active participant in the process of understanding extraneous doctrines. Socrates' effort to shore up the Protagorean theory is displayed to the extent that Theaetetus signals his inability to tell whether Socrates is expressing his personal opinions or testing him out (ἀποπειρῶμαι) (157c4–6). Socrates will, however, dismantle this intellectual apparatus piece by piece in later stages of the discussion (161c–183c). Hence the commentator is encouraged to appraise whether Socrates' discussion of the puzzles envisages built-in elements of an anti-Protagorean agenda.

At any rate the discussion of the puzzles ends with Theaetetus acknowledging his state of wonder and Socrates famously characterising this condition/affection (πάθος) as the exclusive source of philosophy (154c8–d8).Footnote ⁷ This means that the reader should be more inclined to ponder the philosophical significance of these puzzles as a source of wonder than to regard them as unsophisticated muddles, within a dialogue riddled with references to astonishment from the very first words of the prologue (142a3). Hence the quest for an interpretation that produces a level of philosophical significance strong enough to justify the evocation of wonder, the most epistemic of human emotions.

1.2. 154b

After formulating and defending a thesis of the Protagorean/Heraclitean world view, Socrates introduces at 154c2–5 the example of the dice (henceforth: (Dice)) as a little παράδειγμα of the ‘astonishing and ridiculous’ statements (θαυμαστὰ καὶ γελοῖα) that, according to Protagoras, the non-Protagorean (154b6–8) is forced (ἀναγκάζω) to accept. It is customary to assume that astonishing and ridiculous are the conclusions that the non-Protagorean draws from assumptions other than those employed by the Protagorean. But granted the feeling of necessity, it remains far from obvious how this train of thought is supposed to run. After all, if Plato's aim is to indicate the gulf between the non-Protagorean and the Protagorean stance, then the words θαυμαστὰ καὶ γελοῖα are unnecessarily strong: why should the sophist qualify commonsensical statements about change as astonishing and ridiculous, if it would suffice to say that he considers them to be wrong? I have an alternative interpretation for what Socrates might have in mind which, since it embodies substantive claims I will make in the course of the paper, I will postpone until the last section.

The Protagorean thesis and its explanation occupy this highly compressed portion of text (154b1–6):

The negative thesis just enunciated by Socrates is clear enough in placing ontological constraints on the Protagorean epistemology:

The verb παραμετρέω (154b1; b4) is evidently homage to Protagoras' term of art μέτρον and appears nowhere else in the Platonic corpus. The thesis (T) links up with the preceding universal claim that ‘nothing is one thing just by itself’ ((μηδὲν αὐτὸ καθ᾽ αὑτὸ ἓν ὂν), 153e4–5; 152d3–2; 156e8–157a1; 182b3–4). Details of this claim have just been provided by Socrates in discussing the ontology of colours. It is argued that there is no way to ascribe any chromatic property to an object without mentioning its reciprocal partner, i.e. the individual percipient for whom exclusively at a certain temporal point that property exists (153d8–154a2).Footnote ⁹ However, even though (T) hinges upon the interaction between an external object perceived and a perceiving subject (or his sense organs), I agree with Bluck in assuming that the range of τὸ παραμετρούμενον at 154b4 is intended to include human subjects as well as physical particulars whatsoever they may be, including dice.Footnote ¹⁰

Disappointingly, however, the explanation for (T) is cryptic enough to lead to uncertainty as to why (Dice) is set out as a case in point at this stage of the discussion. To limit myself to the first part of (T), the corresponding explanation is embedded in the counterfactual conditional (protasis: εἰ + imperfect indicative; apodosis: ἄν + pluperfect indicative ἐγεγόνει; plus the string αὐτό γε μηδὲν μεταβάλλον). At least from Cornford forward, the dominant reading of the counterfactual is as follows:

Hence: the thing we measure ourselves against becomes different without undergoing any change itself. For ease of reference, let us call this rendering of the participial expression αὐτό γε μηδὲν μεταβάλλον the No Change Interpretation (henceforth: (NC-I)).Footnote ¹² Now, (NC-I), as it stands, produces a discontinuity in the Heraclitean landscape too striking to be ignored.Footnote ¹³ (NC-I) is not assimilable to any of the various brands of Heracliteanism expounded in the dialogue, on the wake of the initial claim, based on a sapientium consensus, that ‘nothing ever is, but things are always coming to be’ (152e1). And in particular (NC-I) turns out to be antithetical to the version of the doctrine of flux which will emerge later in the course of the discussion as the ‘correct’ (i.e., logically inescapable) one: the hyper-flux version (181e5–182a1). In response, it might be suggested that at this stage of the exposition it is still possible that Socrates introduced the specification αὐτό γε μηδὲν μεταβάλλον with the purpose of making the flux doctrine somewhat less radical and thus giving it a new appearance of plausibility. But, we may ask, if Plato intended this specification to convey a novelty or a doctrinal compromise in the discussion, why encapsulate it within the coda of a counterfactual? And how can we reconcile a substantive new condition with an explanatory goal? It is thus difficult to resist the conclusion that without a clear understanding of the philosophical role that such deradicalisation of the flux doctrine is supposed to play, the message of (NC-I) becomes utterly mysterious from a general Heraclitean standpoint.

Let us examine the genesis of the explanation of (T) a little more carefully. The οὐκοῦν of 154b1 is asserted, Gilbert Ryle would say, with a ‘logical tone of voice’: it is inferential (‘and so/therefore’). More precisely, Socrates develops an argument from certain premises that have been introduced under the guise of rhetorical questions (154a6–8):

The text contains three distinct claims. Rephrased from a third-person perspective, each of them can be presented as a universal statement:

1. (C1) Everything appears different to everyone;

2. (C2) Nothing appears the same to oneself;

3. (C3) Nobody remains the same person over time.

Both claims (C1) and (C2) are epistemological insofar as they involve the notion of appearance. The third claim (C3), introduced as an explanation of (C2), concerns the ontology of person: the perceiver never remains the same from time t to t′.Footnote ¹⁵ From a logical standpoint, it is worth remarking that (C2) is not an independent claim, for it is implied by (C1) and (C3). Indeed, if nothing appears to the individual S like the way it appears to another individual, and S has to be regarded as a succession of momentary subjects, then at a later time t′ nothing can appear to S as at t, there being at t′ a subject S′ that is different from the preceding self S.Footnote ¹⁶

Anyway the passage at 154b does not directly apply (C1), but a proposition that a Protagorean takes as its direct consequence, i.e.:

Presumably the line of reasoning leading to (C1′) rests on the claim that if everything appears different to everyone (C1), then everything is different for everyone (by 152a6–8), where ‘being different’ boils down to ‘becoming different’ (152e1; 157a1–2). However, it seems to me that another drawback of (NC-I) is that it reduces the explanatory credentials of the counterfactual at 154b1–6 regarding the thesis (T) that things are not large or white or hot. Indeed, if, as per (C1′), every object x we measure ourselves against becomes different by bumping into a different perceiving subject, then the coda ‘even while x does not undergo any change itself’ is either dispensable in explaining (T), or might even be adverse to it. Let us call this the explanatory objection. The lesson from it is that we cannot assess the explanatory role of the counterfactual at 154b1–3 without determining the additional value of the string αὐτό γε μηδὲν μεταβάλλον. This is what we shall do in section 2.

1.3. Lost in intuition

Other conceptual obscurities in the passage come from two salient gaps between the formulation of (Dice) and the question at 154c8–9 which follows at its heel. Modern translators tend to isolate the modal profile of the question: ‘is it possible to become […]?’ (Levett/Burnyeat); ‘can anything become […]?’ (Fowler, Cornford). McDowell's translation of ἔσθ᾽ ὅπως τι μεῖζον ἢ πλέον γίγνεται ἄλλως ἢ αὐξηθέν is sufficiently literal in respecting the prevalence of the how over the whether:

The first disturbing gap (Gap 1, for short) is that (Q154c8–9) raises expressis verbis a problem about becoming, while in (Dice) such a notion is conspicuous only by its absence, as made apparent by the verb εἶναι representing the numerical relations. Rather, (Q154c8–9) seems to take us back to the lines at 154b prefacing (Dice). Accordingly, one way to close Gap 1 is simply to rephrase (Dice) in terms of (relational) becoming: the six dice become more than the four. At first glance, this move seems perfectly consistent with a doctrine whereby everything is constantly changing: the replacement of ‘be’ with ‘become’ is the norm in Heraclitean jargon (157b2–3; 152d7–e1). Yet, on reflection such rephrasing proves not to be pertinent. First, even though (Dice) is part of a Protagorean training under the influence of the flux doctrine, its mathematical language seems to be exempt from the constraints of a special doctrinal commitment.Footnote ¹⁷ However, the very deliberateness of the arithmetical background, as we shall see in subsection 3, can be subsumed under another kind of philosophical goal.

Second, most importantly, the option of rephrasing (Dice) in terms of becoming is highly suspect from a theoretical point of view. The reason is that it entails the claim that the group of six dice becomes more/less numerous than another group which, in respect to a hypothetical surface, comes out of nowhere (‘take six dice. If you put four beside them […]’). In other words, this option clashes with a strong intuition we have about the way an object becomes comparatively different in relation to something else: it is possible that when John enters a room he becomes the tallest person there; but it sounds odd to say that John becomes taller than the others present, or that they become shorter than John. By sudden relational becoming (SRB, for short), I mean the becoming of something in relation to the sudden occurrence of something else. It is rather surprising that (SRB) has not aroused grave misgivings. In presuming to close Gap 1 by means of an application of (SRB), most commentators on the passage are largely unaware of (SRB)'s failure to accommodate a basic intuition about relational becoming.

1.4. A play of ambiguity?

Beyond this, (Dice) manifests relationality within numerical invariance: it is adamant that the group of six dice is more numerous than the group of four dice and less numerous than the group of twelve. Thus, at another focal point, a further gap – let us call it Gap 2 – unfolds between the comparative numerical constructions in (Dice) and the question at 154c8–9 taken at face-value, i.e. (Q154c8–9), which is unconcerned with comparative numerosities. Call this reading the intrinsic view.

Gap 2 may induce the commentator to transmit the relational pattern of (Dice) to the subsequent question by supplementing ‘larger or more numerous’ in (Q154c8–9) with a ‘than’ clause. Let us call this reading the relational view:

A corollary of the relational view is that Plato licenses his audience to regard (Q154c8–9) as an ambiguous question. Perhaps – as has frequently been supposed – the ambiguity in (Q154c8–9) should be understood as the first of a series of other intentional ambiguities working subtly in the whole stretch of text (see subsection 5.2). Admittedly, it seems circular to maintain that the demand for disambiguation fails to do justice to the face-value of the question raised at 154c8–9, for it is precisely this face-value reading that is challenged by (Q154c8–9) ^r .

However, I hold the intrinsic view, and thus maintain that the focus on the intrinsic/relational ambiguity is misleading for the assessment of the passage. The matter is to be settled by considering the respondent's reactions to the two candidates (Q154c8–9) and (Q154c8–9) ^r . The answer to (Q154c8–9) branches out into these alternatives:

• (N-A) There is no way in which something can become larger or more numerous (than it was before), other than by undergoing increase.

• (P-A) There is a way in which something can become larger or more numerous (than it was before) other than by undergoing increase.

The answer to (Q154c8–9) ^r instead branches out into:

• (N-A) ^r There is no way in which something can become larger or more numerous than something else, other than by undergoing increase.

• (P-A) ^r There is a way in which something can become larger or more numerous than something else, other than by undergoing increase.

The first point I wish to make is just that (Q154c8–9) ^r is philosophically unimpressive. But it is not so because ‘it is natural to answer negatively’, as Job van Eck thinks.Footnote ¹⁹ On the contrary, its answer is obviously affirmative, for both the Protagorean and the non-Protagorean. It is indeed easy to imagine the case in which the subtraction of three dice from a group G of six causes a group G′ of four dice to become more numerous than G. According to van Eck, the answer (N-A) ^r is warranted by the fact that ‘the sentence “x becomes more/larger than y” suggests that x is the subject of the change involved but in the case of six dice x does not undergo the change itself’.Footnote ²⁰ The second part of the remark will be discussed in section 3, where I will argue that (Dice) does not require us to endorse the conclusion that the six dice do not change. As for the first part, I do not see clear reasons for assuming that the sentence ‘x becomes more/larger than y’ should invite us to exempt y from change. As a matter of fact, such an assumption is challenged by real-life situations. For example, when x and y vary over football teams and we say that during a match x gains a numerical superiority over y, the most immediate explanation is that the superiority of x is the effect of the changed numerical status of y (someone from this team has been sent off). In sum, since the subtraction case is far from being sui generis, but is at the root of our conception of relational quantitative becoming, if the first half of Theaetetus' answer were (N-A) ^r , then it would be irredeemably false.

Van Eck argues further:

Hence van Eck's account leaves us with the special problem that we mentioned above. The ‘contradiction’ is avoidable only by resort to (SRB): the six dice have become more than the four dice springing from nowhere. To sum up so far: the first and negative half of Theaetetus' alleged response, (N-A) ^r , constitutes a simply flawed answer (for the subtraction case), whereas its second and positive half, (P-A) ^r , does inadvertently correct the mistake by appealing to (SRB). In other words, the communication between (N-A) ^r and (Q154c8–9) ^r breaks down. The fact that these two horns diverge should alert us to the fact that the intended question is not (Q154c8–9) ^r , but (Q154c8–9).

I believe that the two-part nature of Theaetetus' answer exemplifies a dialectical interplay. Accordingly, the connection of the answer to (Dice) is subtler than has been supposed. On a common line of interpretation followed by van Eck, Theaetetus' own ruminations on (Dice) propel him from the first half of the answer to the second.Footnote ²² When he takes into account the example just illustrated by Socrates, he no longer entertains the thought of (N-A) (or (N-A) ^r ) but the thought of (P-A) (or (P-A) ^r ).Footnote ²³ Now, from what I have said so far, I concede that (N-A) cannot be conceived of as a direct reaction to (Dice). Otherwise, Theaetetus would assert (N-A) because he understands (Dice) either as describing some groups of objects that under numerical invariance can become greater/lesser only relatively, or as describing some groups of objects that under numerical invariance can be greater/lesser only relatively. In the first case, (SRB) is again in force; in the second, Gap 1 (see section 1.3). My warning is against the supposed impact of (Dice) on the boy's reply after the first half.

In my view, the effect of (Dice) turns out to be retrospective rather than prospective. The idea is not that (Dice) argues for (P-A), but that (P-A) creates the logical space for activating (Dice) as its field of operation. Theaetetus' answer matches an ordered pair given by a general thesis, (N-A), trivially true according to a common view of quantitative change, and its denial, (P-A), which confers on (Dice) the status of a counterexample to (N-A): there is a way in which something (e.g., a group of dice) can become larger or more numerous (than it was before) other than by undergoing increase. This automatically offers the simplest explanation for the ordering of the two horns of the answer. Moreover, in section 4, in contrast with most commentators, I explore evidence and reasons for revising Theaetetus' own attitude towards (N-A) and (P-A). Pace McDowell, the boy's state of mind is not divided by ‘two contradictory inclinations’. His answer to (Q154c8–9) is not: ‘no and yes’, but rather: ‘no for me’ and ‘yes for Protagoras’, where ‘yes for Protagoras’ is a marker for the underlying purpose of understanding the Protagorean doctrine. In short, (Dice) comes retrospectively to the fore as a Protagorean counterexample to (N-A).

1.5. A fallacy secundum quid?

Some commentators believe instead that (P-A) is the conclusion to which Theaetetus is drawn by a deviant conditional. Such a conditional could be written semi-formally as:

Again, the antecedent of (Num) takes (SRB) on board. But more to the point, it is odd to find Theaetetus committed to (Num) as a whole, since (Num) involves the fallacy a dicto secundum quid ad dictum simpliciter by shifting from a relational use of ‘more/less numerous’ to a non-relational one. Hence Theaetetus should be given low marks for ignoring Euthydemus, Plato's anti-eristic work, wherein this kind of blatant fallacy is described and diagnosed (cf. 284d–e; 293c–d; 294b; 295b2–296d4; 297e–298c).Footnote ²⁵ But, of course, it is even more uncharitable to charge a brilliant mathematician able to generalise the proof of the irrationality of square roots of non-square integers (147d3–148b2) with embracing a disastrous conditional about numerosity like (Num). I am not referring only to the fact that the Platonic reader would hardly expect a mathematical mind to endorse the view that becoming more numerous simpliciter for a set of objects may be parasitic upon the set's relations to sets of objects distinct from itself. A further counter-indication is particularly pressing: if (Dice), by means of something objective such as the comparison of cardinalities of sets, promotes the first encounter between the Protagorean credo and the demands of the intersubjective activity of counting and measuring (‘we can't allow the case to be differently described’ (154b4–5); cf. Euthyphr. 7b6–c1), then it would be incomprehensible for a mathematician to forfeit this chance.Footnote ²⁶

On the other hand, Theaetetus' endorsement of the (Platonic) wrong horn (P-A) coupled with (Num) implies that the sophist has conceptual resources for dispelling the boy's confusion. Nevertheless, we expect this solution to be explained by a feature that is specifically Protagorean, and there is nothing distinctively Protagorean in the manoeuvre of restoring appropriate qualifiers circumventing the fallacy a dicto secundum quid. And still worse, an explicit manoeuvre against the fallacy might be conceived of as an outcome inappropriate for a Protagorean: it cannot be part of a Protagorean agenda to offer a solution to (Num) capable of being objectively acknowledged as such.

1.6. Simultaneity?

There is a long tradition in the literature, going back to Lewis Campbell, of tracing here a relevant connection to Plato's analysis of comparative properties in the middle-period dialogues and especially in the Phaedo.Footnote ²⁷ Such properties are regarded as the most serious threat to the Principle of Opposites: ‘the same thing will not do or suffer opposites (τἀναντία ποιεῖν ἢ πάσχειν) in the same respect in relation to the same thing and at the same time’ (Rep. IV, 436b8–9; cf. Phaed. 105a). In the Phaedo, Socrates explains the fact that Simmias is taller than Socrates but shorter than Phaedo by assigning to Simmias both tallness (in relation (πρός) to Socrates) and shortness (in relation to Phaedo) (102b3–103a2; cf. also Rep. IV, 436e8–437a2; Charm. 168b; Soph. 255c12–13). A discussion of Plato's treatment of comparative properties would take us too far afield. However, all that needs to be granted for my purpose is that Plato's concern over comparative properties arises from their simultaneous occurrence. More generally, in order to challenge the Principle of Opposites any putative counterexample must involve the relation of simultaneity (see, for instance, Rep. IV, 436c9–10; 436d4–5).

In the Theaetetus the notion of simultaneity is at the core of the first example elucidating Protagoras' Measure Doctrine: the same wind is cold for one perceiver and warm for another (152b1–6). So the thing x which appears F in a context involving an observer may be simultaneously not-F in a context involving another observer. But the context-dependency of perceptual properties prevents the sophist from jumping to the conclusion that x is both F and not-F. Now, with (Dice), the discussion turns to comparative properties, but the example does not tackle their simultaneous occurrence. An array of six dice is not brought into comparison at once with two arrays of dice, with the result that six dice are simultaneously more than the four and fewer than the twelve. On the contrary, the actual example exhibits two comparisons, the first generated once four dice are placed next to six, the second once twelve dice are placed next to the six. In sum, to instantiate a case of the type: ‘Simmias is taller than Socrates but shorter than Phaedo’, the example should have a pattern of this kind:

On the other hand, nothing in the description of (Dice) induces us to concatenate the numerical relations among the dice (and, in the end, the question at 154c8–9 focuses exclusively on something's becoming more numerous). The presence in (Dice) of the pair of particles μέν … δέν can be stressed as follows:

But this does not mean that (Dice) points out that six dice are more than four but less than twelve. Pace Russell and many others readers, there is no ‘but’ between the two numerical relations. There is a ‘but’ between two distinct juxtapositions.