Student: The beauty of nature or art is something much more important and realistic for me then Mathematics. I must disagree with you Master. I don’t see anything in this subject‚ that could be perceived by me as beautiful. Maths consists only of numbers and symbols. The Master sits down on the rock‚ inviting his student to join him. Master: Sit down here‚ Peter. Instead of learning Maths at school‚ you will learn right now‚ that Maths possesses not only truth in its calculations but also supreme
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The Golden Ratio Body‚ art‚ music‚ architecture‚ nature – all connected by a simple irrational number – the Golden Ratio. According to Posamentier & Lehmann in their work The (Fabulous) Fibonacci Numbers‚ there is reason to believe that the letter φ (phi) was used because it is the first letter of the name of the celebrated Greek sculptor Phidias (490-430 BCE). He produced the famous statue of Zeus in the Temple of Olympia and supervised the construction of the Parthenon in Athens
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The Fibonacci principle is often defined as the Fibonacci sequence. The Fibonacci sequence starts at 0 and then the next number is found by adding the two numbers before it. This sequence is seen in sunflower through their seed arrangement; other flowers also show the Fibonacci sequence in the number of petals the flowers have. The problem is that the Fibonacci sequence found in the flowers may just be a result of the laws of physics
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Please note down your project number according to your Roll Number. Roll Number | Project Number | 1-5 | 1 | 6-10 | 2 | 11-15 | 3 | 16-20 | 4 | 21-25 | 5 | 26-30 | 1 | 31-35 | 2 | 36-40 | 3 | 41-45 | 4 | 46-50 | 5 | * A project has a specific starting date and an end date. * It has specific objectives. * List the sources of the information collected. * General lay-out of the project report has the following format ferws Page Number | Content | Cover Page |
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The Number Devil The Number Devil - A Mathematical Adventure‚ by Hans Magnus Enzensberger‚ begins with a young boy named Robert who suffers from reoccurring nightmares. Whether he’s getting slurped up by a giant fish‚ sliding down an endless slide into a black hole‚ or falling into a raging river‚ his incredibly detailed dreams always seem to have a negative effect on him. Robert’s nightmares either frighten him‚ make him angry‚ or disappoint him. His one wish is to never dream again; however‚
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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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remembered well after their time‚ for their work. Their works of art whether it be a sculpture or painting‚ is visited by thousands daily. This is because of the renaissance artists’ use of the golden ratio. To fully appreciate this revolutionary number sequence‚ this paper will demonstrate the effectiveness of this ratio in artwork. First by explaining the golden ratio‚ and where it had been developed. Then paper will highlight the past artworks that used the golden ratio and how it complemented
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since ancient times. Our human eye perceives the golden rectangle as a beautiful geometric form. The symbol for the Golden Ratio is the Greek letter Phi. The Fibonacci Series was discovered around 1200 A.D. Leonardo Fibonacci discovered the unusual properties of the numeric series‚ that’s how it was named. It is not proven that Fibonacci even noticed the connection between the Golden Ratio meaning and Phi. The Renaissance used the Golden Mean and Phi in their sculptures and paintings to achieve
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coefficients. The system after French mathematician Blaise Pascal. The set of numbers that form Pascal’s triangle were known before Pascal. However‚ Pascal developed many uses of it and was the first one to organize all the information together in his treatise‚ Traité du triangle arithmétique (1653). The numbers originally arose from Hindu studies of combinatorics and binomial numbers and the Greeks’ study of figurate numbers. The earliest explicit depictions of a triangle of binomial coefficients occur
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geometric shapes‚ which lead to special numbers. The simplest example of these are square numbers‚ such as 1‚ 4‚ 9‚ 16‚ which can be represented by squares of side 1‚ 2‚ 3‚ and 4. Triangular numbers are defined as “the number of dots in an equilateral triangle uniformly filled with dots”. The sequence of triangular numbers are derived from all natural numbers and zero‚ if the following number is always added to the previous as shown below‚ a triangular number will always be the outcome: 1 = 1
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