Fibonacci number From Wikipedia‚ the free encyclopedia A tiling with squares whose side lengths are successive Fibonacci numbers An approximation of the golden spiral created by drawing circular arcs connecting the opposite corners of squares in the Fibonacci tiling; this one uses squares of sizes 1‚ 1‚ 2‚ 3‚ 5‚ 8‚ 13‚ 21‚ and 34. In mathematics‚ the Fibonacci numbers or Fibonacci series or Fibonacci sequence are the numbers in the following integer sequence:[1][2] 0‚\;1‚\;1‚\;2‚\;3
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_____________Download from www.JbigDeaL.com Powered By © JbigDeaL____________ NUMERICAL APTITUDE QUESTIONS 1 (95.6x 910.3) ÷ 92.56256 = 9? (A) 13.14 (B) 12.96 (C) 12.43 (D) 13.34 (E) None of these 2. (4 86%of 6500) ÷ 36 =? (A) 867.8 (B) 792.31 (C) 877.5 (D) 799.83 (E) None of these 3. (12.11)2 + (?)2 = 732.2921 (A)20.2 (B) 24.2 (C)23.1 (D) 19.2 (E) None of these 4.576÷ ? x114=8208 (A)8 (B)7 (C)6 (D)9 (E) None of these 5. (1024—263—233)÷(986—764— 156) =? (A)9 (B)6
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equivalent decimal values for presentation to or input from humans; computer programs express literals in decimal by default. (123.1‚ for example‚ are written as such in a computer program‚ even though many computer languages are unable to encode that number precisely.) Both computer hardware and software also use internal representations which are effectively decimal for storing decimal values and doing arithmetic. Often this arithmetic is done on data which are encoded using some variant of binary-coded
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Introduction: It is‚ precisely‚ in the modern art gallery of the Metropolitan Museum of Art in New York City‚ that Jackson Pollock’s painting‚ Number 28‚ 1950 hangs. On a wall of its own‚ neither too big nor too small‚ it would seem completely normal in relation to the art surrounding it. But the painting has an interesting quality; to some‚ it appears as a vague‚ brown‚ mess of paint‚ to others‚ as a mystical movement of color contained on a canvas. The techniques that Pollock utilizes to create
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Animal Kingdom: Phylum Chordata Veretebrate - an animal of a large group distinguished by the possession of a backbone or spinal column‚ including mammals‚ birds‚ reptiles‚ amphibian.. invertebrate - An animal lacking a backbone‚ such as an arthropod‚ mollusk‚ annelid‚ coelenterate‚ etc. The invertebrates constitute an artificial... swim bladder - A gas-filled sac present in the body of many bony fishes‚ used to maintain and control buoyancy. Gills - The paired respiratory organ of fishes
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Abstract An individual is typically referred by numerous name aliases on the web. Accurate identification of aliases of a given person name is useful in various web related tasks such as information retrieval‚ sentiment analysis‚ personal name disambiguation‚ and relation extraction. We propose a method to extract aliases of a given personal name from the web. Given a personal name‚ the proposed method first extracts a set of candidate aliases. Second‚ we rank the extracted candidates
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Why are names important? Names allow recognition. A unique name makes it easier to remember someone. People think names can influence several things. Often‚ people are given a very unique name or a very common name‚ I name that pops out should be easier to remember rather than a name that a few thousand have. Our names often can be linked to our destiny and our personality. My name‚ Steven is significant to my family as well as being a unique name. The name “Steven” contains an enormous amount
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Real Numbers -Real Numbers are every number. -Therefore‚ any number that you can find on the number line. -Real Numbers have two categories‚ rational and irrational. Rational Numbers -Any number that can be expressed as a repeating or terminating decimal is classified as a rational number Examples of Rational Numbers 6 is a rational number because it can be expressed as 6.0 and therefore it is a terminating decimal. -7 ½ is a rational number because it can be expressed as -7.5 which is a
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would be without irrational numbers? If the great Pythagorean hyppasus or any other mathematician would have not ever thought of such numbers? Before ‚understanding the development of irrational numbers ‚we should understand what these numbers originally are and who discovered them? In mathematics‚ an irrational number is any real number that cannot be expressed as a ratio a/b‚ where a and b are integers and b is non-zero. Irrational numbers are those real numbers that cannot be represented as
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REAL NUMBERS Q.1 Determine the prime factorization of the number 556920. (1 Mark) (Ans) 23 x 32 x 5 x 7 x 13 x 17 Explanation : Using the Prime factorization‚ we have 556920 = 2 x 2 x 2 x 3 x 3 x 5 x 7 x 13 x 17 = 23 x 32 x 5 x 7 x 13 x 17 Q.2 Use Euclid’s division algorithm to find the HCF of 210 and 55. (1 Mark) (Ans) 5 Explanation: 5 ‚ Given integers are 210 and 55 such that 210 > 55. Applying Euclid’s division leema to 210 and 55‚ we get 210 = 55 x 3 + 45 ………
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