http://powermathematics.blogspot.com/silaturahim matematika
Most of the defining figures in mathematics vary. Some of the figures and definitions of mathematics are as follows: According to Thales, mathematics is the science of speech is not natural science. According to Plato, mathematics is abstract and mathematical examples that are concrete. We all can actually do math problems with ease. If we can not do, it's because we are not yet familiar with the matter of mathematics. According to Pythagoras, mathematics is a coherent science and mathematics that the number can actually manage natural. However, we are difficult to distinguish between the natural sciences with mathematics. Mathematics that need verification, proof is proof that Pythagoras. According to Aristoteles, mathematics and logic is the logic of the proposition-proposition. Mathematics is apodictic. Its mathematical foundation and is postulat axiom. According to Euclides, and mathematics are the main aksiomatik of mathematics is geometry. Method is deduction. The most famous is postulat 5. According to Bacon, Locke, Berkely and Hume, the empirical and mathematical problem is a concrete day-to-day. According to René Descartes, mathematics are deductive, and begins from the doubt-doubt. According to Immanuel Kant, mathematics is synthetic a priori. According to Leibniz, Frege and Russell, is actually the logic of mathematics and calculus is an example statement. According to Brouwer, mathematics is not simply given, but to understand. According to Lakatos, mathematics must be observed. According to Hilbert, the mathematical rigor. More to the system of mathematics and system truly singular. Mathematics requires a strong base and is called as usual formalism. According to Wittgenstein mathematics, mathematics as a language form. Although mathematics is empirical, but it still is a mathematical logic. Mathematics is not influenced by the concrete objects and their accuracy from the values. So that mathematics is often referred to as absolutisme. According to Godel mathematics, mathematics that when complete, then the mathematics is not consistent. However, if the mathematics is not fully consistent. According to Aristoteles, Piaget, Paul and Ernest, the soul of mathematics is konstructivis. According Ebutt and Strakker, that mathematics is the main patterns and relationships. Mathematics can also be defined as communication. In addition, the mathematics can be referred to as the investigation that require research. Mathematics by Paul Ernest, mathematics can also be objective and subjective. We must be able to understand the math so that we can distinguish the mathematics of subjective and objective. According Lobachevski, the field of mathematics is not flat but curved. Mathematics is single and its foundation is solid. But, as many people call this myth. Mathematics is universal and many people also call this as a myth. Mathematics is the certainty of its guarantee. And mathematics is also a guarantee objective. So, mathematics is a single, universal, objective and definitive.
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