¹ Wolfson, H. A., The Philosophy of Spinoza, New York, Meridian Books, 1960, (first ed., 1934), p. 45Google Scholar.

² Ibid., p. 44.

³ Ibid., p. 54.

⁴ Ibid., p. 55.

⁵ Philosophical Works of Descartes, Vol. II, tr. Haldane, F. S. and Ross, G. R. T., New York, Dover Publications, 1955, (republication of 1934 edition, Cambridge University Press), p. 29Google Scholar.

⁶ Ibid., p. 48.

⁷ Ibid., p. 49.

⁸ Ibid.

⁹ Spinoza, B., The Principles of Descartes' Philosophy, tr. and introd. Britan, H. H., La Salle, Ill., The Open Court Publ. Co., 1961, (first published, 1905), p. 7Google Scholar.

¹⁰ “Introduction,” Spinoza, B., Earlier Philosophical Writings, tr. Hayes, F. A., Indianapolis, Bobbs-Merrill Co., 1963, p. xivGoogle Scholar.

¹¹ A few instances of this tendency to so characterize Spinoza will document this point. John Caird alleged that “What Spinoza aimed at was a system of knowledge in which everything should follow by strict necessity of thought from the first principle with which it starts.” (Spinoza, Edinburgh, Blackwood & Sons, 1903, p. 113) Richard Falckenberg contended that the chief thought which captivated Spinoza was “the rationalistic belief in the power of the human spirit to possess itself of the truth by pure thought, together with confidence in the omnipotence of the mathematical method.” (History of Modern Philosophy, New York, Henry Holt & Co., 1897, p. 119Google Scholar) Halbert H. Britan, in a lengthy discussion of Spinoza's use of the more geometrico, presented essentially the same argument of pedagogic utility given by Wolfson and considered Spinoza as infatuated by deduction. “Instead of accepting the conclusions of Descartes as the starting point, viz., his cogito ergo sum, and his proof of God's veracity, by which empirical knowledge is made credible, and employing the method of Bacon to build this foundation already laid, Spinoza turns back a step and begins anew the impossible task of deducing the world in thought. … Individual facts of human experience were not data on which conclusions could be based, but phenomena to be explained by deducing them from some primary, and fundamental principle.” (“Introduction,” B. Spinoza, The Principles of Descartes' Philosophy, La Salle, Ill., Open Court Publ. Co., 1961, p. xivGoogle Scholar) Finally, Stuart Hampshire has written: “If therefore Descartes was a rationalist, in the sense that he advocated the solution of all problems of natural knowledge by the application of the mathematical method of pure reasoning, Spinoza was doubly a rationalist in this sense; in fact no other philosopher has ever insisted more uncompromisingly that all problems, whether metaphysical, moral or scientific, must be formulated and solved as purely intellectual problems, as if they were theorems in geometry. Principally for this reason he wrote both his early exposition of Descartes' philosophy and his own great definitive work, the Ethics, in the geometrical manner, as a succession of propositions with supporting proofs, lemmas, and corollaries.” (Spinoza, Harmondsworth, Penguin Books, 1951, pp. 24–5Google Scholar) A somewhat different position is taken by Joachim (Joachim, H. H., A Study of the Ethics of Spinoza, New York, Russell & Russell, 1964, pp. 9–13Google Scholar) and by Pollock (Pollock, Frederick, Spinoza, His Life and Philosophy, London, Duckworth, 2nd ed., 1899, P. 201Google Scholar). Hallett (Hallett, H. F., Benedict De Spinoza, The Elements of His Philosophy, London, The Athlone Press, 1957Google Scholar) is practically silent on this issue.

¹² Wolfson, op. cit., p. 58.

¹³ Ibid., pp. 46 and 50.

¹⁴ McKeon, R., “Philosophy and Method”, Journal of Philosophy, Vol. 48, No. 22, Oct. 25, 1951, pp. 653–82CrossRefGoogle Scholar.

¹⁵ Wolfson, op. cit., p. 55.

¹⁶ Ibid., pp. 23–34.