of surgical Staple Abstract: Summary: describes the structure of a new seed for brachytherapy practice in cancer patients with the help of a surgical approach that great care to deliver the desired dose distribution to the target cells. Methods: geometry ‚ source materials‚ components and environmental Monte Carlo simulation is done. Monte Carlo and the subsequent measurement of doses that are agitated by the foundation springs for Yb-169 this amount is negligible. Yb-169 in the form of a surgical
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Cartesian System of Rectangular Coordinates‚ Straight Lines and Family of Straight Lines‚ Circles‚ Conic Section‚ Trigonometry‚ Permutations and Combinations‚ Binomial Theorem‚ Statistics‚ Mathematical Logic‚ Limits‚ Probability‚ Introduction to 3-D Geometry. Section – II (Logical and Analytical Reasoning) : Verbal and Non-verbal Reasoning. Section – III (Computers and IT) : History‚ Generation and Types of Computers‚ Working with OS‚ Input‚ Output & Memory Devices‚ Data Representation‚ Basics of IT
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find the distance between two points on a coordinate plane and apply their leaning to find the distance between 2 perpendicular lines on a coordinate plane (Glencoe-Geometry 3.6 Perpendiculars and Distance)‚ transformations in the coordinate plane (Glencoe-Geometry 4.3 Congruent Triangles)‚ SSS on the coordinate plane (Glencoe-Geometry 4.4 Proving Congruence –SSS‚ SAS) and The Distance Formula (Glencoe-Algebra 1 11.5 The Distance Formula). Materials / Equipments: Computers‚ LCD projectors for demonstration
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Matho-Geometry Project The Geometry of Crop Circles INTRODUCTION A crop circle is an area in a field of crops where the plants have been mysteriously flattened into the shape of a circle or a more complex pattern. A crop circle is a sizable pattern created by the flattening of a crop such as wheat‚ barley‚ rye‚ maize‚ or rapeseed. Crop circles are also referred to as crop formations‚ because they are not always circular in shape. The documented cases have substantially increased from the 1970s
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Geometry in Real Life To become familiar with the fact that geometry (similar triangles) can be Description In this project I tried to find situations in daily life where geometrical notions can be effectively used‚ I selected the following examples: 2. To find height of a tower 1. To find the width of a river iC BS E .co used in real life to find height of certain things and width of many others. m Objective iC BS E.c om To find the width of a river Walked along
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Lecture 1 Math. Techniques 1 - Algebra 2 - Trigonometry 3 – Analytic geometry 4 - Computer simulation 5 – Calculus Algebra: Use symbols to stand for numbers. Example 101 lecture 1 2 2 – Trigonometry We start with right triangles. Trigonometry Example But there’s more to it than that. 101 lecture 1 3 3 – Analytic geometry The ellipse Use algebra (and calculus) to analyze geometry problems. Key technique: coordinates Rene DesCartes 101 lecture 1
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A PAPER PRESENTATION ON PRODUCT DESIGN AND DEVELOPMENT (DESIGN OF HELMET) [pic] Presented by: T.V.BAHEERATHAN GAUTHAM THANGAVELU Final year Final year Mechatronics Engineering Mechatronics Engineering Kumaraguru College of Kumaraguru College of Engineering. Engineering. 9843348433 9944202600 PRODUCT DESIGN AND DEVELOPMENT (DESIGN OF HELMET)
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A Review of Plato’s Meno Plato presents in his dialogue‚ titled Meno‚ the distinction between genuine knowledge and true opinion. In the text‚ he refers to knowledge as the form and definition of something that is changeless‚ where as true opinion can be altered and is not restricted in the way knowledge is by having standards of a form. Plato includes the characters of Socrates and Meno‚ a pupil of Gorgias‚ to discuss the nature of virtue and knowledge. The dialogue is provoked by Meno posing
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amateur mathematician. He became known because of the contribution he made in mathematics and physics in the twentieth century. Hilbert is well remembered for landmark researches he conducted in algebra. He also left an indelible mark in axiomatic geometry and mathematics. Hilbert also profoundly contributed in other areas such as invariant theory and mathematical physics. Hilbert studied at the university of Konigsberg‚ and during his studies‚ he made several trips to abroad. He visited Europe on
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the patterns and rules in mathematics and music‚ and invented the idea of a mathematical proof (Ancient Greek Science). Pythagoras is where we get our Pythagorean Theorem in geometry today. The ancient Greek culture was fixed on proving that everything was true‚ they did this by using a lot of geometry; this is why geometry became so big in their society. The math of ancient Greece can be broken up into three periods: the early period‚ the classical period‚ and the helenistic period. The early
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