Adolphe Quetelet (1796–1874) Belgian astronomer, mathematician, statistician and sociologist
Introductory
A Treatise on Man and the Development of His Faculties (1842)
Introductory
A Treatise on Man and the Development of His Faculties (1842)
Adolphe Quetelet (1796–1874) Belgian astronomer, mathematician, statistician and sociologist
Introductory
A Treatise on Man and the Development of His Faculties (1842)
William Ernest Hocking (1873–1966) American philosopher
Source: The Meaning of God in Human Experience (1912), Ch. XIV : The Need of an Absolute, p. 198.
Aristarchus of Samos ancient Greek astronomer and mathematician
p, 125
On the Sizes and Distances of the Sun and the Moon (c. 250 BC)
Paul Klee (1879–1940) German Swiss painter
I.13 Productive | Receptive, p. 33
1921 - 1930, Pedagogical Sketch Book, (1925)
Miguel de Unamuno (1864–1936) 19th-20th century Spanish writer and philosopher
The Tragic Sense of Life (1913), IX : Faith, Hope, and Charity
Context: Suffering is a spiritual thing. It is the most immediate revelation of consciousness, and it may be that our body was given us simply in order that suffering might be enabled to manifest itself. A man who had never known suffering, either in greater or less degree, would scarcely possess consciousness of himself. The child first cries at birth when the air, entering into his lungs and limiting him, seems to say to him: You have to breathe me in order to live!
Aristarchus of Samos ancient Greek astronomer and mathematician
p, 125
On the Sizes and Distances of the Sun and the Moon (c. 250 BC)
Bertrand Russell (1872–1970) logician, one of the first analytic philosophers and political activist
An Inquiry into Meaning and Truth (1940), Introduction, p. 15
1940s
Miguel de Unamuno (1864–1936) 19th-20th century Spanish writer and philosopher
The Tragic Sense of Life (1913), VIII : From God to God
Augustus De Morgan (1806–1871) British mathematician, philosopher and university teacher (1806-1871)
It is also frequently said, when a quantity diminishes without limit, that it has nothing, zero or 0, for its limit: and that when it increases without limit it has infinity or ∞ or 1⁄0 for its limit.
The Differential and Integral Calculus (1836)