LINEAR PROGRAMMING MODEL TO OPTIMIZE THE WATER RESOURCE USE IN IRRIGATION PROJECTS: AN APPLICATION TO THE SENATOR NILO COELHO PROJECT J.A. FRIZZONE1‚4; R.D. COELHO1; D. DOURADO-NETO2‚4; R. SOLIANT3 1 Depto de Engenharia Rural-ESALQ/USP‚ CP. 9‚ CEP: 13418-900 - Piracicaba‚ SP-Brazil Depto. de Agricutura-ESALQ/USP‚ CP. 9‚ CEP: 13418-900 - Piracicaba‚ SP-Brazil Depto de Construção Civil-FEC/UNICAMP‚ CEP: 13083-970 - Campinas‚ SP-Brazil 4 Bolsista do CNPq 2 3 SUMMARY: The main objective
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Linear Programming Tools and Approximation Algorithms for Combinatorial Optimization by David Alexander Griffith Pritchard A thesis presented to the University of Waterloo in fulfillment of the thesis requirement for the degree of Doctor of Philosophy in Combinatorics and Optimization Waterloo‚ Ontario‚ Canada‚ 2009 c David Alexander Griffith Pritchard 2009 I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis‚ including any required final revisions
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Integer Programming 9 The linear-programming models that have been discussed thus far all have been continuous‚ in the sense that decision variables are allowed to be fractional. Often this is a realistic assumption. For instance‚ we might 3 easily produce 102 4 gallons of a divisible good such as wine. It also might be reasonable to accept a solution 1 giving an hourly production of automobiles at 58 2 if the model were based upon average hourly production‚ and the production had the interpretation
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Chapter 3 FORMULATING GOAL PROGRAMMING MODEL..………………………... | 10 | | | 3.1 WHAT IS GOAL PROGRAMMING?………………………………………………. | 10 | 3.2 ASSUMPTIONS………………………………………………….………………….. | 10 | 3.3 COMPONENTS………………………………………..……………………………. | 11 | 3.3.1 GOAL CONSTRAINTS………………………………………………… | 11 | 3.3.2 OBJECTIVE FUNCTION……………………………………………… | 11 | 3.3.3 GOAL PROGRAMMING TERMS……………………………………. | 12 | 3.3.4 GOAL PROGRAMMING CONTRAINTS……………………………. | 12 | 3.4 GOAL PROGRAMMING STEPS…………………………………………………..
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plan: The chicken food type should contribute at most 25% of the total calories intake that will result from the diet plan. The vegetable food type should provide at least 30% of the minimum daily requirements for vitamins. Provide a linear programming formulation for the above case. (No need to solve the problem.) Element | Milk | Chicken | Bread | Vegetables | Calories (X1) | 160 | 25% * 210 | 120 | 150 | Carbohydrates (X2) | 110 | 130 | 110 | 120 | Protein (X3) | 90 | 190 | 90
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CHAPTER 8 Linear Programming Applications Teaching Suggestions Teaching Suggestion 8.1: Importance of Formulating Large LP Problems. Since computers are used to solve virtually all business LP problems‚ the most important thing a student can do is to get experience in formulating a wide variety of problems. This chapter provides such a variety. Teaching Suggestion 8.2: Note on Production Scheduling Problems. The Greenberg Motor example in this chapter is largest large
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1. Calculate real GDP for 2004 and 2005 using 2004 prices. To calculate the real GDP we use the constant price for 2004 which was $20. Real GDP (base year 2004) 2004 ($20 per CD x 100 CD’s) + ($110 per racquet x 200 racquets) = 24000 2005 ($20 per CD x 120 CD’s) + ($110 per racquet x 210 racquets) = 25500 By what percentage did real GDP grow? Because the Real GDP was $24000 in 2004 and $25500 in 2005‚ real GDP grew by ($25500 - $24000) / $24000 = 0.0625 or 6.25% 2. Calculate the
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Linear ------------------------------------------------- Important EXERCISE 27 SIMPLE LINEAR REGRESSION STATISTICAL TECHNIQUE IN REVIEW Linear regression provides a means to estimate or predict the value of a dependent variable based on the value of one or more independent variables. The regression equation is a mathematical expression of a causal proposition emerging from a theoretical framework. The linkage between the theoretical statement and the equation is made prior to data collection
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2014/9/16 Linear Equations Ad Options Ads by Vidx Linear Equations A linear equation is an equation for a straight line These are all linear equations: y = 2x+1 5x = 6+3y y/2 = 3 x Let us look more closely at one example: Example: y = 2x+1 is a linear equation: The graph of y = 2x+1 is a straight line When x increases‚ y increases twice as fast‚ hence 2x When x is 0‚ y is already 1. Hence +1 is also needed So: y = 2x + 1 Here are some example values: http://www.mathsisfun.com/algebra/linear-equations
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Plots Linear regression is a crucial tool in identifying and defining key elements influencing data. Essentially‚ the researcher is using past data to predict future direction. Regression allows you to dissect and further investigate how certain variables affect your potential output. Once data has been received this information can be used to help predict future results. Regression is a form of forecasting that determines the value of an element on a particular situation. Linear regression
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