STD 10 CHAPTER 9 TRIKON MITI NA UPYOGO VIDEO LESSION

STD 10 CHAPTER 9 TRIKON MITI NA UPYOGO VIDEO LESSION

STD 10 CHAPTER 9 TRIKON MITI NA UPYOGO VIDEO LESSION

STD 10 CHAPTER 8 TRIKON MITI NO PARICHAY  VIDEO LESSION
ALL VIDEO FOR SSC STUDENT
SSC MATHS VIDEO FOR STUDENT
SSC GANIT NA VIDEO STUDENT MATE
DHORAN 10 NA VIDYARTHIO MATE KHUB J UPYOGI VIDEO 
GHER BETHA SSC NA GANIT NA VIDEO JUO
VIDEO CHHANEL  NAME : maths by vataliya sir
VIDEO BANAVNAR NU NAME ; Ashvin sir vataliya

EKAM 8 TRIKON MITI NO PARICHAYVISHE VIDEO





The apparent plural form in English, like the French plural form les mathématiques (and the less commonly used singular derivative la mathématique), goes back to the Latin neuter plural mathematica (Cicero), based on the Greek plural Ï„á½° μαθηματικά (ta mathÄ“matiká), used by Aristotle (384–322 BC), and meaning roughly "all things mathematical", although it is plausible that English borrowed only the adjective mathematic(al) and formed the noun mathematics anew, after the pattern of physics and metaphysics, which were inherited from Greek. In English, the noun mathematics takes a singular verb. It is often shortened to maths or, in North America, math.
Mathematics has no generally accepted definition. Aristotle defined mathematics as "the science of quantity" and this definition prevailed until the 18th century. In the 19th century, when the study of mathematics increased in rigor and began to address abstract topics such as group theory and projective geometry, which have no clear-cut relation to quantity and measurement, mathematicians and philosophers began to propose a variety of new definitions. Three leading types of definition of mathematics today are called logicist, intuitionist, and formalist, each reflecting a different philosophical school of thought. All have severe flaws, none has widespread acceptance, and no reconciliation seems possible.

An early definition of mathematics in terms of logic was Benjamin Peirce's "the science that draws necessary conclusions" (1870). In the Principia Mathematica, Bertrand Russell and Alfred North Whitehead advanced the philosophical program known as logicism, and attempted to prove that all mathematical concepts, statements, and principles can be defined and proved entirely in terms of symbolic logic. A logicist definition of mathematics is Russell's "All Mathematics is Symbolic Logic" (1903).

Intuitionist definitions, developing from the philosophy of mathematician L. E. J. Brouwer, identify mathematics with certain mental phenomena. An example of an intuitionist definition is "Mathematics is the mental activity which consists in carrying out constructs one after the other." A peculiarity of intuitionism is that it rejects some mathematical ideas considered valid according to other definitions. In particular, while other philosophies of mathematics allow objects that can be proved to exist even though they cannot be constructed, intuitionism allows only mathematical objects that one can actually construct. Intuitionists also reject the law of excluded middle — a stance which forces them to reject proof by contradiction as a viable proof method as well.
Source wikipedia

STD 10 CHAPTER 8 TRIKON MITI NO PARICHAY  VIDEO LESSION
ALL VIDEO FOR SSC STUDENT
SSC MATHS VIDEO FOR STUDENT
SSC GANIT NA VIDEO STUDENT MATE
DHORAN 10 NA VIDYARTHIO MATE KHUB J UPYOGI VIDEO 
GHER BETHA SSC NA GANIT NA VIDEO JUO
VIDEO CHHANEL  NAME : maths by vataliya sir
VIDEO BANAVNAR NU NAME ; Ashvin  sir vataliya

EKAM 8 TRIKON MITI NO PARICHAYVISHE VIDEO
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