(Task 1) Convert decimal number (125) into binary. 125 /2 = 62 remainder5 1(lsd) 62 /2 = 31 remainder0 o 31 /2 = 15 remainder5 1 15 /2 = 7 remainder5 1 7 /2 = 3 remainder5 1 3 /2 = 1 remainder 5 1 1 /2 = .5 remainder 0 1 .5 /2 = 0 remainder 0 0 Convert your answer back to decimal to prove your answer. 0 1 1 1 1 1 0 1 0+64+32+16+8+4+2+1=125 (task 2) Convert the binary number(10101101) into decimal.
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Soto Perelló 1 Eva Soto Perelló Professor Donna Singleton English Comp. 15 April 2010 Why There Is No Need For a Binary System of Gender Every human being is‚ from birth‚ placed in different categories depending on the social conditions. Society’s assumptions about gender‚ race‚ creed and culture are used to define one’s identity‚ ignoring individuality. The factors that have the greatest impact on one’s lifestyle‚ such as gender‚ are those that are supposedly predetermined by nature and not chosen
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Q1) What is the use of RADAR 2) COHO in MTI Radar uses which freq.? 3) CMRR of amplifier? 4) Binary to hexadecimal conversion? 5) Decimal to hexadecimal conversion? 6) Firewalls are used for? 7) Full form of FPGA? 8) Numerical based on Duty cycle and peak power? 9) IF transmitted power is increased by 16 than range is increased by a) 16‚ b)8‚ c)4‚ d) noneof these? 10) 10.AGC is used in which of the stage a) receiver b) oscillator c) both a and b d) none of these? 11)
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also the study and description of these developments. One of the earliest forms of written expression is cuneiform. Writing systems are distinguished from other possible symbolic communication systems in that one must usually understand something of the associated spoken language to comprehend the text. By contrast‚ other possible symbolic systems such as information signs‚ painting‚ maps‚ and mathematics often do not require prior knowledge of a spoken language. Every human community
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UNIT-5 NUMBER SYSTEM Number system:-writing system for expressing numbers i.e. it is a notation for representing numbers of a given set ‚using digits or other symbols in a consistent manner. It will * Represent all set of numbers * Give every number a unique representation * Reflect the algebraic and arithmetic structure of numbers It is of two types: * Non-positional * Positional Non-positional: a number system where each number is represented with help of a unique symbol
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------------------------------------------------- History Mesopotamia By the middle of the 2nd millennium BC‚ the Babylonian mathematics had a sophisticated sexagesimal positional numeral system. The lack of a positional value (or zero) was indicated by a space between sexagesimal numerals. By 300 BC‚ a punctuation symbol (two slanted wedges) was co-opted as a placeholder in the same Babylonian system. In a tablet unearthed at Kish (dating from about 700 BC)‚ the scribe Bêl-bân-aplu wrote his zeros with three hooks‚ rather than two slanted
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Decimals decimals The decimal numeral system (also called base ten or occasionally denary) has ten as its base. It is the numerical base most widely used by modern civilizations. Decimals also refer to decimal fractions. To understand decimal numbers you must first know about Place Value. When we write numbers‚ the position (or "place") of each number is important. History of Decimals The Arabic numeral system is considered one of the most significant developments in mathematics‚ and
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In today’s modern mathematics‚ we have become accustomed to zero as a number. It’s hard to believe that most ancient number systems didn’t include zero. The Mayan civilization may have been among the first to have a symbol for zero. The Mayas flourished in the Yucatan peninsula of Mexico about 1300 years ago. They used the as a placeholder‚ in a vertical place-value system. It is considered one of their cultures greatest achievements. The ancient Egyptians‚ Romans‚ and Greeks alike had no symbol
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The Concept of Prime Numbers and Zero MTH/110 March 14‚ 2011 The Concept of Prime Numbers and Zero Have you ever wondered about the origins of prime numbers or the numeral zero? The ancient philosophers and mathematicians from such early civilizations in Egypt‚ Greece‚ Babylon‚ and India did. Their efforts have provided the basic fundamentals for mathematics that are used today. Prime Numbers A prime number is “any integer other than a 0 or + 1 that is not divisible without a remainder
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mathematical systems used in thecountries he visited. Fibonacci ’s contributions to mathematics are remarkable. Even in the worldtoday‚ we still make daily use of his discovery. His most outstanding contributionwould be the replacement of decimal number system. Yet‚ few people realizedit. Fibonacci had actually replaced the old Roman numeral system with theHindu-Arabic numbering system‚ which consists of Hindu-Arabic(0-9) symbols. There were some disadvantages with the Roman numeral system: Firstly
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