Quotes about heron (12 quotes) | Quotes of famous people

“A philistine is a full-grown person whose interests are of a material and commonplace nature, and whose mentality is formed of the stock ideas and conventional ideals of his or her group and time. I have said "full-grown person" because the child or the adolescent who may look like a small philistine is only a small parrot mimicking the ways of confirmed vulgarians, and it is easier to be a parrot than to be a white heron. "Vulgarian" is more or less synonymous with "philistine": the stress in a vulgarian is not so much on the conventionalism of a philistine as on the vulgarity of some of his conventional notions. I may also use the terms genteel and bourgeois. Genteel implies the lace-curtain refined vulgarity which is worse than simple coarseness. To burp in company may be rude, but to say "excuse me" after a burp is genteel and thus worse than vulgar. The term bourgeois I use following Flaubert, not Marx. Bourgeois in Flaubert's sense is a state of mind, not a state of pocket. A bourgeois is a smug philistine, a dignified vulgarian.”

Vladimir Nabokov book Lectures on Russian Literature

Lectures on Russian Literature (1982)

Way , Idea , Nature , Sense

“I had long wondered," Lan said to Tam. "About the man who had given Rand that heron-marked blade. I wondered if he had truly earned it. Now I know." Lan raised his own sword in salute.”

Robert Jordan The Wheel of Time

Source: A Memory of Light

“The queen was settling on the edge of the bed, ungainly with hesitation and at the same time exquisite in her grace, like a heron landing in a treetop.”

Megan Whalen Turner The King of Attolia

Source: The King of Attolia

Time

“Rollers on the beach, wind in the pines, the slow flapping of herons across sand dunes, drown out the hectic rhythms of city and suburb, time tables and schedules. One falls under their spell, relaxes, stretches out prone. One becomes, in fact, like the element on which one lies, flattened by the sea; bare, open, empty as the beach, erased by today’s tides of all yesterday’s scribblings.”

Anne Morrow Lindbergh book Gift from the Sea

Gift from the Sea (1955)

Time , Sea

“As in hunting, so in hawking, the sportsmen had their peculiar impressions, and therefore the tyro in the art of falconry is recommended to learn the following arrangement of terms as they were to be applied to the different kinds of birds assembled in companies. A sege of herons, and of bitterns; an herd of swans, of cranes, and of curlews; a dopping of sheldrakes; a spring of teels; a covert of cootes; a gaggle of geese; a badelynge of ducks; a sord or sute of mallards; a muster of peacoccks; a nye of pheasants; a bevy of quails; a covey of partridges; a congregation of plovers; a flight of doves; a dule of turtles; a walk of snipes; a fall of woodcocks; a brood of hens; a building of rooks; a murmuration of starlings; an exaltation of larks; a flight of swallows; a host of sparrows; a watch of nightingales; and a charm of goldfinches.”

Joseph Strutt (1749–1802) British engraver, artist, antiquary and writer

pg. 37
The Sports and Pastimes of the People of England (1801), Collective nouns

Art , Spring , Bird , Learning

“Another feature of Alexandrian algebra is the absence of any explicit deductive structure. The various types of numbers… were not defined. Nor was there any axiomatic basis on which a deductive structure could be erected. The work of Heron, Nichomachus, and Diophantus, and of Archimedes as far as his arithmetic is concerned, reads like the procedural texts of the Egyptians and Babylonians… The deductive, orderly proof of Euclid and Apollonius, and of Archimedes' geometry is gone. The problems are inductive in spirit, in that they show methods for concrete problems that presumably apply to general classes whose extent is not specified. In view of the fact that as a consequence of the work of the classical Greeks mathematical results were supposed to be derived deductively from an explicit axiomatic basis, the emergence of an independent arithmetic and algebra with no logical structure of its own raised what became one of the great problems of the history of mathematics. This approach to arithmetic and algebra is the clearest indication of the Egyptian and Babylonian influences… Though the Alexandrian Greek algebraists did not seem to be concerned about this deficiency… it did trouble deeply the European mathematicians.”

Morris Kline (1908–1992) American mathematician

Source: Mathematical Thought from Ancient to Modern Times (1972), p.144

History , Mathematics , Problem , Reading

“I love to see the old heath's withered brake
Mingle its crimpled leaves with furze and ling,
While the old heron from the lonely lake
Starts slow and flaps its melancholy wing”

John Clare (1793–1864) English poet

Emmonsail's Heath in Winter
Poems Chiefly from Manuscript

Love

“Many scholars have felt that the Heronian passage [on a pipe-organ moved by an anemourion-like wheel] can be disregarded because it is not confirmed by other writings. Heron presumably mentioned the anemourion in a moment of distraction, forgetting that it had not been invented yet. We know that he was given to such lapses.”

Lucio Russo (1944) Italian historian and scientist

4.7, "Use of Natural Power", p. 126
The Forgotten Revolution: How Science Was Born in 300 BC and Why It Had to Be Reborn (2004)

Forgetting

“For the roar of Godzilla, I took out the lowest string of a contrabass and then ran a glove that had resin on it across the string. The different kinds of roars were created by playing the recording of the sound that I'd made at different speeds. Toho's sound engineers previously had tried to use the roars of many different animals for Godzilla's roar. They went to a zoo and recorded the roars of many different mammals, but no matter how the sounds were manipulated, they seemed too much like the roars of each of the animals. The sound engineers also tried to alter the call of a night heron bird, but that also was not successful.”

Akira Ifukube (1914–2006) Japanese composer

As quoted by David Milner, "Akira Ifukube Interview I" http://www.davmil.org/www.kaijuconversations.com/ifukub.htm, Kaiju Conversations (December 1992)

Bird , Success , Animals , Speed

“For these proofs Heron gave new proofs that avoided extending the lines, in order to meet the objection of anyone who would deny that the space was available for the extension.”

Morris Kline (1908–1992) American mathematician

Source: Mathematical Thought from Ancient to Modern Times (1972), p. 177
Context: Closely related to the problem of the parallel postulate is the problem of whether physical space is infinite. Euclid assumes in Postulate 2 that a straight-line segment can be extended as far as necessary; he uses this fact, but only to find a larger finite length—for example in Book I, Propositions 11, 16, and 20. For these proofs Heron gave new proofs that avoided extending the lines, in order to meet the objection of anyone who would deny that the space was available for the extension.

“I'm amazed by how compliant people are in this country. They go into service stations - 'cathedrals of despair', as I call them - where baseball-capped ghouls of the night lord it over their congealed bean kingdoms, their fried-bread twilights, their neon demi-mondes, tempting you to enter to become them, undead. "Ooh, beans on toast, £18.95, very reasonable. Oh no, I'm not going to complain. They probably pump them up from London in special tubes." God, £18.95? If that was the price, for my money, each bean would have to be carried over in a heron's beak and laid on an orchid and then placed on a very rare train set and carried all the way to my table on the train set and then pinged off by a tiny little rare vole and it rolls onto a beautiful silk leaf and I eat it with a Fabergé egg. Then you'd get your money's worth.
Ch. 16, 26:40”

Bill Bailey (1965) English comedian, musician, actor, TV and radio presenter and author

Bewilderness (DVD, 2001)

Money , God , People , Beauty

“Heron and Olympiodorus had pointed out in antiquity that, in reflection, light followed the shortest possible path, thus accounting for the equality of angles. During the medieval period Alhazen and Grosseteste had suggested that in refraction some such principle was also operating, but they could not discover the law.”

Carl B. Boyer (1906–1976) American mathematician

Source: The Rainbow: From Myth to Mathematics (1959), p. 205
Context: Fermat had recourse to the principle of the economy of nature. Heron and Olympiodorus had pointed out in antiquity that, in reflection, light followed the shortest possible path, thus accounting for the equality of angles. During the medieval period Alhazen and Grosseteste had suggested that in refraction some such principle was also operating, but they could not discover the law. Fermat, however, not only knew (through Descartes) the law of refraction, but he also invented a procedure—equivalent to the differential calculus—for maximizing and minimizing a function of a single variable. … Fermat applied his method … and discovered, to his delight, that the result led to precisely the law which Descartes had enunciated. But although the law is the same, it will be noted that the hypothesis contradicts that of Descartes. Fermat assumed that the speed of light in water to be less than that in air; Descartes' explanation implied the opposite.

Law , Light