1. Greece
The Greeks designed there pottery due to there different functions. ... All of the early Greek plays were always tragedies. ... The constructed a systematic methods of reasoning to prove the truth of mathematical statements. ... They tried to explain everything in mathematical terms. ... At first Greek societies were ruled by a king or queen. ...
There were other civilizations before Greek, however no such civilization contributed as much as Greek civilization did. ... The trading system was very good for Greece. ... There were great developments in the field of mathematics and medicine. ... Many scientific ideas were first discovered in Greek times, and the alphabet we use was based on the Greek alphabet. ... The Greeks were also interested in architecture of Greece and Greek colonies. ...
Throughout the years, the history of mathematics has taken its fair share of changes. ... Moving along the historical timeline, the Greeks were the next prominent mathematics society. ... Continuing the Greek methods were the Hindu mathematicians. ... Italian scholars and critics of this period proclaimed that their age had progressed beyond the barbarism of the past and had found its inspiration, and its closest parallel, in the civilizations of ancient Greece and Rome. A new phase of mathematics began in Italy around 1500. ...
Of course non-Greek students and Greek students have different opinions on this subject. ... This is a significant difference in study times between Greek and non-Greek males, whereas non-Greek females reported studying 7.6 hours a week. There was less than an hour difference in Greek and non-Greek females. ... It was also found that fraternity members had lower scores on "the reading comprehension, mathematics, and critical thinking modules of the CAAP (College Assessment of Academic Proficiency) exam, and sorority members only had lower scores on the reading comprehension module (Pike ...
But these conditions would not at all be possible without giving credit to ancient Greek society. ... Individual perspective and the free exchange of ideas were better tolerated in the Greek culture. Though the Egyptians may have been well endowed with mathematical brilliance, engineering, and vast resources. ... The Greek social structure revolved around the marketplace, known as the agora. ... The Greeks were accustomed to debate and the discussion of important matters in their daily course of life. ...
The most significant mathematical use to which Archimedes tried to put his spiral was to create a better method of determining the area of a circle. ... The Greeks and others before them had tried a number of methods for determining pi and figuring out the area of a circle. ... Since this triangle method can be carried out with equal accuracy with or without Archimedes' spiral, his method was really only of mathematical interest. ... There are two classical mathematical questions for which this spiral gives a simple solution: The quadrature of the circle was the quest to construct a squa...
Aeneas reflected very few Greek traits. ... Greek heroes were well rounded. Greeks would study music, dancing, rhetoric, philosophy, mathematics, physical training, and military science. Studying rhetoric, philosophy, and mathematics made Greeks more useful citizens. ... Greeks strove for arete`. ...
Fibonacci was taught mathematics in Bugia and traveled widely with his father, and he recognized the advantages of the mathematical systems used in the countries they visited. ... There he wrote a number of important texts which played an important role in reviving ancient mathematical skills and he also made significant contributions of his own. ... This is termed the golden ratio, and is often represented by the Greek letter phi. ... The spectacular Ancient-Greek building appear to follow some sort of pattern. It has been found that the Ancient-Greeks were aware of a certain ratio of...
The name Archimedes just rings out mathematics. Not just mathematics but, inventions, engineering marvels, physics and astronomy. ... " Well, this is the guy that coined that phrase, it's Greek for, 'I've Found It!' ... Archimedes came up with a value for π (pi) which we use today to calculate the area of a circle, one of the basic building blocks of mathematics. ... At the core of the story of the Syracusia is Archimedes working with the 'keel' of the ship or 'korone' in Greek. ...
Of the three columns found in Greece, Doric columns are the simplest. ... Doric, like most Greek styles, works well horizontally on buildings, that's why it was so good with the long rectangular buildings made by the Greeks. ... For the Greeks and Romans, the column, although obviously ornamental, was also structural, since it supported the roof. ... Mathematics and proportion determine size and shape of the columns. ... To compensate, the Greek architects made the columns slightly convex. ...
In Keynes complicated dissertation, his methodology--mathematically at least-- is inherently contradictory. ... Modern Greece is that exception. Greek was actually experiencing a fairly robust economy, yet government involvement and spending did not cease, that is, Keynesian economics was still being used. Paul Gregory of Forbes Magazine believes this is what caused Greek's cataclysmic economic demise. Usually governments will decrease spending during times of prosperity, that is why Keynesian economics usually does not have bad long term effects, but with Greece, the government persisted...
Before the invention of a theory of mathematical perspective, artists of the middle ages were more interested in depicting religious, spiritual truths rather than the real, physical world. ... He rediscovered the principals of linear perspective construction, a technique which had been known to the ancient Greeks and Romans but forgotten during the middle ages. ... This book 'Della Pittura' presented the use of perspective in a mathematical sense and laid the foundation for further developments of both the theoretical and the practical aspects of perspective. ... The ancient Greeks ...
From the evidence dating from around 3000 B.C.E. we have learned that Sumerians practiced mathematics, astronomy, mythology, and medicine. ... Traces of this code can be seen in Egyptian laws and later in Greek laws. ... Greek civilization also adopted a similar state-structure like the Sumerian's. ... Greeks seemed to have adopted a similar, but more democratic council system. During the age of Homer, Greek Kings were limited in power. ...
It was said that the historical writings began with the Hebrews and Greeks. ... Like the Jews the Greeks believed their gods were in control of nature and the outcome of social affairs, but the Greeks pioneered the writing of history ' 'in self-consciously human terms." By 600 BC Greek philosophers started to investigate natural events and as a result the beginnings of both Greek philosophy and science were established. ... Greek historians interpreted records with too much credulity and little skepticism. ... Positivism is a philosophical system that holds that every rational ...
Neuronal networks are computing mechanisms that effortlessly transform multi-dimensional vectors of one kind of mathematical value into other vectors of mathematical value. It is theorized, that an array of neuronal networks transforms the values of visual space into those of motor space by means of a mathematical tensor or formula, that that translates the multi-dimensional coordinates, or vectors, or visual space, into the vectors of motor space. Most reductive materialists agree that theory of mathematical transformations is one of the most promising explanations we have of how our brai...
Lit I Thomas Paine, Reasoning the Enlightenment In the first few lines of his argument against the church and state, Thomas Paine writes: "I do not believe in the creed professed by the Jewish church, Roman church, Greek church, Turkish church, Protestant church, nor by any church that I know of. ... This should not be interpreted as anything other than what Paine claims that he believes Jesus Christ to be a mortal man who is no different from Greek philosophers, or even a Quaker. ... He argues convincingly also that the religion itself (as distilled from The Bible) is a copy of old Greek m...
(Payne 247) The Ancient Greek style of architecture can be clearly seen in the Roman arches that they constructed with significance placed on key elements. ... (Vadnal 2) The temples were mainly built using Greek designs but the Romans changed the proportions to ones that better fit their needs. ... Gradients are still used today in physics and mathematics. ... Though many of the ideas came from earlier minds such as the Greeks, Babylonians, Persians, and Egyptians, the Romans took the engineering and architecture to greater levels of magnificence. ...
Monks lived a secular life, poverty; fasting and celibacy were rituals which were taught by the Greek bishop Saint Basil. ... Jerome translated the Hebrew Bible (the Old Testament) and the Greek books of the New Testament into Latin. Ambrose brought together Hebrew, Greek and Southwest Asian traditions to formulate Christian doctrine and liturgy. ... Scholarship in the Islamic World: Muslim scholars preserved hundreds of ancient Greek and Latin works. ... Muslims made big impacts in the fields of mathematics, astronomy, optics, chemistry, geography, philosophy and medicine. ...
q=humanism "A cultural and intellectual movement of the Renaissance that emphasized secular concerns as a result of the rediscovery and study of the literature, art, and civilization of ancient Greece and Rome." - Individualism - http://www.dictionary.com/search?... He painted pictures with both the themes of Classical Greece and Rome, and of Christianity. ... Later in his career he turned to mathematics, and, living up to his reputation, he excelled in the field. ... Also especially common during this era was the revival of Classical themes and work from the Ancient Greek and Roman times...
The Greek philosopher Aristotle attempted to derive this contemplation by practical, almost mathematical means, despite its variables being ridden with anomalies. ... While the people of Ancient Greece needed guidance, as they remain an isolated bubble of wisdom, an essay of this nature can profoundly alter a person and thereby prohibiting independent realization. ... The Greek Gods in ancient Greece were assumed to be perpetually contemplative, and therefore constantly happy. ...
His achievements in the retrieval of Greek and Roman traditions, including rhetoric, and his attempts to follow classical style lead to the movement itself (Humanism: Italy" 2). ... He became the first pope to openly advocate humanism, and he recruited scholars to come to Rome and translate ancient Greek texts (Humanism: Italy" 4). ... Evident in this selection were the ideals of classical Greek society that were mirrored in Castiglione's work. His advice to the courtier during a time of arms was to seek deserved glory, honor, and excellence, a reverberation of the Greek value of arete. ...
In ancient Greece and Rome it was essential for a free citizen in everyday civic life. ... The studies in this field has developed and changed over time, from grammar, rhetoric and logic in the ancient Greece and roman era. ... Even in modern day time's liberal arts education focus to develop you in a wide range of subjects and curriculums, immersing you in the arts, sciences and even mathematics. ...
The word philosophy originated from Greek words philia (love) and sophia (wisdom) carrying the meaning love of wisdom. ... Socrates a Greek philosopher, was able to set the standard for all subsequent Western philosophy, through his used of critical reasoning, his commitment to the truth and and through the vivid example of his own life. ... He tried to pass on the heritage of a Socratic style of thinking and to guide the progress of the students through mathematical learning to the achievement of abstract philosophical truth. ...
The word philosophy originated from Greek words philia (love) and sophia (wisdom) carrying the meaning love of wisdom. ... Socrates a Greek philosopher, was able to set the standard for all subsequent Western philosophy, through his used of critical reasoning, his commitment to the truth and and through the vivid example of his own life. ... He tried to pass on the heritage of a Socratic style of thinking and to guide the progress of the students through mathematical learning to the achievement of abstract philosophical truth. ...