References: Zill‚ Dennis G. 2009. A First Course In Differential Equations with Modelling Applications. 9th Ed. Pacific Grove: Brooks/Cole – Thomson Learning Inc. Blanchard‚ P.‚ Devaney‚ R.L.‚ & Hall‚ G.R. (2002). Diffrential equations. 2nd Ed. Pacific Grove: Brooks/Cole – Thomson Learning Inc. Hollis‚ S.L (2002)
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mathematical method was developed solving the unsteady state heat transfer differential equations.. • It takes into account variable thermal and electromagnetic properties. •The numerical solution was developed using an implicit finite difference method in one dimensional system (slab). • It allows predicting temperature profiles. • The model will later be validated with experiments and data on apple fruit. ADVANTAGES OF MICROWAVE HEATING • Does not involve a conduction or convection medium
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What is the difference between competitive advantage and comparative advantage? Answer: An advantage that a firm has over its competitors‚ that differentiates the Product or services offered by the firm and allows the firm to reduce it’s Cost or generate Higher Revenue or Margin is known as Competitive Advantage. A competitive advantage is something that a consumer views in a product or service as having higher value than the other competitors of the firm in the industry. It is an expertise that
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Table of Contents Introduction 3 Development of numerical schemes 5 Partial Differential Equations 5 Initial and Boundary condition 5 Modelling Approaches 6 Numerical Methods 6 Explicit method 8 Implicit method 8 Numerical Coding 10 Explicit method 10 Final code 11 Implicit Method 15 Final Code 16 Numerical results 18 Analysis of the Numerical results 23 Conclusion 24 References 25 Introduction Over the years the importance of fluid dynamics has grown exponentially
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to the calculation of fields and currents in the rotor sheet and propulsion and levitation forces. Such problem can be tackled by vector potential or stream function approach. The present paper adopts the second approach. A second order partial differential equation has been formulated for calculation of stream function or current density in the rotor sheet. As the end effects have not been considered in the direction of width of the rotor sheet‚ the said formulation merges to a second order PDE in
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Site Pictures: Computations: Given: d1 = 4.5 ° T = Rtan(I/2) D = 7.5 ° T = 15.28tan(34.5/2) T = 4.74m Full Chord = 2m Ls = 24m TS to PI = (R + S/4)tan(I/2) + L/2 TS to PI = (15.28 + 0.92/4)tan(34.5/2) + 24/2 I = d1 + 4D TS to PI = 16.82m I = 4.5 +4(7.5) PI to ST = 16.82m I = 34.5 ° R = (Full Sta. * 180)/ pi*D R = (2 * 180)/ pi * 7.5 R = 15.28m Lc = 2I/D Lc = 2(34.5)/7.5 Lc = 9.2m S = Lc2/6R
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References: http://www.wisegeek.com/what-is-thermal-analysis.htm http://www.wisegeek.com/what-is-thermogravimetry.htm http://www.wisegeek.com/what-is-differential-thermal-analysis.htm http://www.tainstruments.com/product.aspx?siteid=11&id=10&n=1 http://www.intertek.com/analysis/dsc/ http://link.springer.com/article/10.1023%2FA%3A1010144230796?LI=true http://iopscience.iop.org/0022-3727/34/9/201
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“Review of SEBI (DIP) Guidelines 2000- Proposals - Series I” A. Recommendations made by the Primary Market Advisory Committee SEBI has constituted a standing committee‚ chaired by Shri M S Verma‚ Chairman‚ TRAI. This committee comprises representatives from ICAI‚ ICSI‚ investor associations‚ merchant bankers‚ Industry associations‚ Ministry of Finance etc. The terms of reference of this committee are as follows : 1. To advise SEBI on matters relating to regulation of intermediaries for ensuring
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For candidates admitted in Anna University of Technology‚ Chennai in 2010 ANNA UNIVERSITY ‚ CHENNAI - 600 025 TIME TABLE - B.E/B.Tech. /B.Arch. DEGREE EXAMINATIONS -May/ June - 2012 Page : 1 of 2 Date : 28-03-12 Semester No. Exam Date Day Branch 01 Session : Thursday Forenoon 10 A.M. to 1 P.M. 19/06/2012 Tuesday 21/06/2012 Thursday 376105 Architectural Drawing I 116101 Chemistry for Marine Engineering 183101 Engineering Chemistry - I Regulation : 2010 23/06/2012
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CHENNAI INSTITUTE OF TECHNOLOGY Sarathy Nagar‚ Kundrathur‚ Pudupedu‚ Chennai– 600 069. Department of Mathematics Subject Name: Numerical Methods Subject Code: MA1251 Unit I 1) Write the Descartes rule of signs Sol: 1) An equation f ( x) = 0 cannot have more number of positive roots than there are changes of sign in the terms of the polynomial f ( x) . 2)An equation f ( x) = 0 cannot have more number of positive roots than there are changes of sign in the terms of the polynomial f
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