American Economic Association A Child ’s Guide to Rational Expectations Author(s): Rodney Maddock and Michael Carter Reviewed work(s): Source: Journal of Economic Literature‚ Vol. 20‚ No. 1 (Mar.‚ 1982)‚ pp. 39-51 Published by: American Economic Association Stable URL: http://www.jstor.org/stable/2724658 . Accessed: 30/07/2012 13:35 Your use of the JSTOR archive indicates your acceptance of the Terms & Conditions of Use‚ available at . http://www.jstor.org/page/info/about/policies/terms.jsp
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MATHS-SA1-TEST1 Q1) Use the following information to answer the next question. The steps for finding the H.C.F. of 2940 and 12348 by Euclid’s division lemma are as follows. 12348 = a × 4 + b a = b × 5 + 0 What are the respective values of a and b? A. 2352 and 588 B. 2940 and 588 C. 2352 and 468 D. 2940 and 468 Answer The steps to find the H.C.F. of 12348 and 2940 are as follows. 12348 = 2940 × 4 + 588 2940 = 588 × 5 + 0 Comparing with the given steps‚ we obtain a =
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skills: 1. Introduction of the lesson. 2. Questioning 3. Explanation 4. Stimulus Variation 5. Black Board Writing. UNIT-VI a) Number System : Natural Number‚ Whole Number‚ Integers‚ Rational Number‚ Irrational Number and Operations with Numbers. b) Polynomial. c) Equations: Linear‚ Simultaneous and Quadratic Equations and their solution. d)
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Complete the Apprentice Work on ‘Articles’ and ‘Prepositions.’ Prepare a PPT each to showcase the rules that govern the usage of Articles and Preposition. Complete the Apprentice Work for the following Chapters. (a) Rational Numbers (b) Exponents and Powers Prepare a PPT on the Topic Rational numbers. Do the given sums in your practice copy. Physics: - Make a PPT on Force and Pressure. Do the given questions in fair copy. Chemistry:- Make a PPT on Synthetic fibers‚ polymers‚ plastics‚ etc illustrating
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Mathematics Bridge Program ©2002 DeVry University Algebra Chapter 1 The Real Number System 1.1. The Number Sets • Natural Numbers • Whole Numbers • Integers • Rational Numbers • Irrational Numbers • Real Numbers 1.2. Operations With Real Numbers • Absolute Value • Addition • Subtraction • Multiplication • Division
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Description In mathematics‚ a rational function is any function which can be defined by a rational fraction‚ i.e. an algebraic fraction such that both the numerator and the denominator are polynomials. The coefficients of the polynomials need not be rational numbers‚ they may be taken in any field K. In this case‚ one speaks of a rational function and a rational fraction over K. The values of the variables may be taken in any field L containing K. Then the domain of the function is the set of the
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Theorem of Arithmetic for two main applications. First‚ we use it to prove the irrationality of many of the numbers you studied in Class IX‚ such as 2 ‚ 3 and 5 . Second‚ we apply this theorem to explore when exactly the decimal p expansion of a rational number‚ say (q ≠ 0) ‚ is terminating and when it is nonq terminating repeating. We do so by looking at the prime factorisation of the denominator q of p . You will see that the prime factorisation of q will completely reveal the nature q of the decimal
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CONTENTS INTRODUCTION 3 DESCRIPTION 5 UNIT CREDIT 6 TIME ALLOTMENT 6 EXPECTANCIES 7 SCOPE AND SEQUENCE 8 SUGGESTED STRATEGIES AND MATERIALS 9 GRADING SYSTEM 10 LEARNING COMPETENCIES 11 SAMPLE LESSON PLANS 30 INTRODUCTION This Handbook aims to provide the general public – parents‚ students‚ researchers‚ and other stakeholders – an overview of the Mathematics program at the secondary level. Those in education‚ however‚ may use it as a
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Rational Number Any number that can be written as a fraction is called a rational number. The natural numbers and integers are all rational numbers. A terminating or recurring decimal can always be written as a fraction and as such these are both subsets of rational numbers. Irrational Numbers Numbers that cannot be written as a fraction are called irrational. Example √2‚ √5‚ √7‚ Π. These numbers cannot be written as a fraction so they are irrational. Surds A surd is any number that looks
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architecture to produce f agent = architecture + program Vacuum-cleaner world Percepts: location and contents e g [A contents‚ e.g.‚ [A‚ Dirty] Actions: Left‚ Right‚ Suck‚ NoOp Rational agents Tabulation of agent functions Describes the agent Infinite !( for most agents) unless bound on percept sequence Rational agent Does the right thing Every entry in the table filled correctly doing the i ht thing is better than doing the d i th right thi i b tt th d i th wrong thi thing what does
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