„I think 2-D animation disappeared from Disney because they made so many uninteresting films. They became very conservative in the way they created them. It's too bad. I thought 2-D and 3-D could coexist happily.“

Letzte Aktualisierung 3. Juni 2021. Geschichte
Hayao Miyazaki Foto
Hayao Miyazaki3
japanischer Zeichentrickfilmregisseur 1941

Ähnliche Zitate

Brandon Boyd Foto

„Showing characters is where 3-D animation comes up short. It's hard to create lifelike figures that move in a realistic, believable manner-unless you're going to go into "dummy dolls."“

—  Rick Dyer (video game designer) American video game designer and writer

But when you take 3-D animation and put it into a first-person perspective and create a fly-through environment-well, that is where it shines. So what we're doing is using both mediums for their respective strengths.
Technician of Suspended Disbelief: Rick Dyer, Shadoan and the Frontier of Animated CD Entertainment https://www.awn.com/mag/issue1.1/articles/dyer.html (1996)

Marcus Orelias Foto
E. W. Hobson Foto

„A new point is determined in Euclidean Geometry exclusively in one of the three following ways:
Having given four points A, B, C, D, not all incident on the same straight line, then
(1) Whenever a point P exists which is incident both on (A, B) and on (C, D), that point is regarded as determinate.
(2) Whenever a point P exists which is incident both on the straight line (A, B) and on the circle C(D), that point is regarded as determinate.
(3) Whenever a point P exists which is incident on both the circles A(B), C(D), that point is regarded as determinate.
The cardinal points of any figure determined by a Euclidean construction are always found by means of a finite number of successive applications of some or all of these rules (1), (2) and (3). Whenever one of these rules is applied it must be shown that it does not fail to determine the point. Euclid's own treatment is sometimes defective as regards this requisite.
In order to make the practical constructions which correspond to these three Euclidean modes of determination, correponding to (1) the ruler is required, corresponding to (2) both ruler and compass, and corresponding to (3) the compass only.
…it is possible to develop Euclidean Geometry with a more restricted set of postulations. For example it can be shewn that all Euclidean constructions can be carried out by means of (3) alone…“

—  E. W. Hobson British mathematician 1856 - 1933

Quelle: Squaring the Circle (1913), pp. 7-8

Mckenna Grace Foto

„I became a vegetarian because I felt really bad for the animals and I love them a lot. Animals are very sweet, and I don't think that they deserve to be tortured.“

—  Mckenna Grace American child actress 2006

“Young Actors Visit a Rescued Animal Sanctuary,” video interview with PETA Kids (14 November 2016) https://www.youtube.com/watch?v=-jq4n3Pnku0.

C. N. R. Rao Foto
Amy Hempel Foto
Samuel Butler (poet) Foto

„Who thought he 'd won
The field as certain as a gun.“

—  Samuel Butler (poet) poet and satirist 1612 - 1680

Canto III, line 11
Quelle: Hudibras, Part I (1663–1664)

John Wallis Foto

„Suppose we a certain Number of things exposed, different each from other, as a, b, c, d, e, &c.; The question is, how many ways the order of these may be varied? as, for instance, how many changes may be Rung upon a certain Number of Bells; or, how many ways (by way of Anagram) a certain Number of (different) Letters may be differently ordered?
Alt.1,21) If the thing exposed be but One, as a, it is certain, that the order can be but one. That is 1.
2) If Two be exposed, as a, b, it is also manifest, that they may be taken in a double order, as ab, ba, and no more. That is 1 x 2 = 2. Alt.3
3) If Three be exposed; as a, b, c: Then, beginning with a, the other two b, c, may (by art. 2,) be disposed according to Two different orders, as bc, cb; whence arise Two Changes (or varieties of order) beginning with a as abc, acb: And, in like manner it may be shewed, that there be as many beginning with b; because the other two, a, c, may be so varied, as bac, bca. And again as many beginning with c as cab, cba. And therefore, in all, Three times Two. That is 1 x 2, x 3 = 6.
Alt.34) If Four be exposed as a, b, c, d; Then, beginning with a, the other Three may (by art. preceeding) be disposed six several ways. And (by the same reason) as many beginning with b, and as many beginning with c, and as many beginning with d. And therefore, in all, Four times six, or 24. That is, the Number answering to the case next foregoing, so many times taken as is the Number of things here exposed. That is 1 x 2 x 3, x 4 = 6 x 4 = 24.
5) And in like manner it may be shewed, that this Number 24 Multiplied by 5, that is 120 = 24 x 5 = 1 x 2 x 3 x 4 x 5, is the number of alternations (or changes of order) of Five things exposed. (Or, the Number of Changes on Five Bells.) For each of these five being put in the first place, the other four will (by art. preceeding) admit of 24 varieties, that is, in all, five times 24. And in like manner, this Number 120 Multiplied by 6, shews the Number of Alternations of 6 things exposed; and so onward, by continual Multiplication by the conse quent Numbers 7, 8, 9, &c.;
6) That is, how many so ever of Numbers, in their natural Consecution, beginning from 1, being continually Multiplied, give us the Number of Alternations (or Change of order) of which so many things are capable as is the last of the Numbers so Multiplied. As for instance, the Number of Changes in Ringing Five Bells, is 1 x 2 x 3 x 4 x 5 = 120. In Six Bells, 1 x 2 x 3 x 4 x 5 x 6 = 120 x 6 = 720. In Seven Bells, 720 x 7 = 5040. In Eight Bells, 5040 x 8 = 40320, And so onward, as far as we please.“

—  John Wallis English mathematician 1616 - 1703

Quelle: A Discourse of Combinations, Alterations, and Aliquot Parts (1685), Ch.II Of Alternations, or the different Change of Order, in any Number of Things proposed.

„Muslim historians credit all their heroes with many expeditions each of which “laid waste” this or that province or region or city or countryside. The foremost heroes of the imperial line at Delhi and Agra such as Qutbu’d-Dîn Aibak (1192-1210 A. D.), Shamsu’d-Dîn Iltutmish (1210-36 A. D.), Ghiyãsu’d-Dîn Balban (1246-66 A D.), Alãu’d-Dîn Khaljî (1296-1316 A. D.), Muhammad bin Tughlaq (1325-51 A. D.), Fîruz Shãh Tughlaq (135188 A. D.) Sikandar Lodî (1489-1519 A. D.), Bãbar (1519-26 A. D.) and Aurangzeb (1658-1707 A. D.) have been specially hailed for “hunting the peasantry like wild beasts”, or for seeing to it that “no lamp is lighted for hundreds of miles”, or for “destroying the dens of idolatry and God-pluralism” wherever their writ ran. The sultans of the provincial Muslim dynasties-Malwa, Gujarat, Sindh, Deccan, Jaunpur, Bengal-were not far behind, if not ahead, of what the imperial pioneers had done or were doing; quite often their performance put the imperial pioneers to shame. No study has yet been made of how much the human population declined due to repeated genocides committed by the swordsmen of Islam. But the count of cities and towns and villages which simply disappeared during the Muslim rule leaves little doubt that the loss of life suffered by the cradle of Hindu culture was colossal.“

—  Sita Ram Goel Indian activist 1921 - 2003

Hindu Temples – What Happened to Them, Volume I (1990)

Jean Piaget Foto

„Every thought that enters the head of a child of 2-3 does so from the first in the form of a belief and not in the form of a hypothesis to be verified.“

—  Jean Piaget Swiss psychologist, biologist, logician, philosopher & academic 1896 - 1980

Quelle: The Moral Judgment of the Child (1932), Ch. 2 : Adult Constraint and Moral Realism <!-- p. 165 -->
Kontext: !-- Every thought that enters the head of a child of 2-3 does so from the first in the form of a belief and not in the form of a hypothesis to be verified. Hence the very young child's almost systematic romancing as with others and to which one cannot yet give the name of pseudo-lie, so close is the connection between primitive romancing and assertive belief.
Hence finally, the pseudo-lie, which is a sort of romancing used for other people, and serving to pull the child out of any straight due to circumstances, from which he deems it perfectly natural to extricate himself by inventing a story. Just as, from the intellectual point of view the child will elude a difficult question by means of an improvised myth to which he will give momentary credence, so from the moral point of view, an embarrassing situation will give rise to a pseudo-lie. Nor does this involve anything more than an application of the general laws of primitive child thought, which is directed towards its own satisfaction rather than to objective truth. -->It is as his own mind comes into contact with others that truth will begin to acquire value in the child's eyes and will consequently become a moral demand that can be made upon him. As long as the child remains egocentric, truth as such will fail to interest him and he will see no harm in transposing facts in accordance with his desires.

Gabriel García Márquez Foto
John Wallis Foto

„Let as many Numbers, as you please, be proposed to be Combined: Suppose Five, which we will call a b c d e. Put, in so many Lines, Numbers, in duple proportion, beginning with 1. The Sum (31) is the Number of Sumptions, or Elections; wherein, one or more of them, may several ways be taken. Hence subduct (5) the Number of the Numbers proposed; because each of them may once be taken singly. And the Remainder (26) shews how many ways they may be taken in Combination; (namely, Two or more at once.) And, consequently, how many Products may be had by the Multiplication of any two or more of them so taken. But the same Sum (31) without such Subduction, shews how many Aliquot Parts there are in the greatest of those Products, (that is, in the Number made by the continual Multiplication of all the Numbers proposed,) a b c d e.“

—  John Wallis English mathematician 1616 - 1703

For every one of those Sumptions, are Aliquot Parts of a b c d e, except the last, (which is the whole,) and instead thereof, 1 is also an Aliquot Part; which makes the number of Aliquot Parts, the same with the Number of Sumptions. Only here is to be understood, (which the Rule should have intimated;) that, all the Numbers proposed, are to be Prime Numbers, and each distinct from the other. For if any of them be Compound Numbers, or any Two of them be the same, the Rule for Aliquot Parts will not hold.
Quelle: A Discourse of Combinations, Alterations, and Aliquot Parts (1685), Ch.I Of the variety of Elections, or Choice, in taking or leaving One or more, out of a certain Number of things proposed.

„if you ask me this election could end about 100 different ways:
1) trump gets 0% of the vote
2) trump gets 1% of the vote
3) trump gets 2% o“

—  Dril Twitter user

[ Link to tweet https://twitter.com/dril/status/796037882783928321]
Tweets by year, 2016

Philip K. Dick Foto
Herman Cain Foto
Idi Amin Foto
Marion Barry Foto

„Just as the Jews did after the Holocaust, never again will be allow this many murders in the streets of Washington, D. C. Never again.“

—  Marion Barry American politician and former mayor of Washington, D.C. 1936 - 2014

At his 1989 inauguration, as quoted in The Washington Post (3 January 1989), p. D1.

Rachel Caine Foto

Ähnliche Themen