# \”LP Modelling – I“ – IE 202 Intro to Modeling and Optimization-Lecture 02 | optimization model คือ

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## \”LP Modelling – I“ – IE 202 Intro to Modeling and Optimization-Lecture 02

นอกจากการดูบทความนี้แล้ว คุณยังสามารถดูข้อมูลที่เป็นประโยชน์อื่นๆ อีกมากมายที่เราให้ไว้ที่นี่: ดูความรู้เพิ่มเติมที่นี่

distanceeducation
IE202
IndustrialEngineering
BaharYetiş
distance education
IE 202 Introduction to Modeling and Optimization
Lecture 02: LP Modelling I
Prof. Bahar Yetiş
Department of Industrial Engineering
Bilkent University ## ตัวอย่าง สมุดรายวันทั่วไป สร้างด้วย Excel

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PJ Excel Channel ## Optimization and Data Science: Lecture 1: Introduction

Prof. Dr. Thomas Slawig
Institut für Informatik, ChristianAlbrechtsUniversität Kiel ## Optimization: Modeling

This video uses the scenario of building a fence along the side of a barn to show how to create an algebraic model of a scenario and use derivatives to find the optimal (i.e., maximum and minimum) values for the cost.
This video is part of the Calculus Videos Project
For more videos and resources to support calculus learning, visit https://calcvids.org/ ## Introduction to Optimization: What Is Optimization?

A basic introduction to the ideas behind optimization, and some examples of where it might be useful.
TRANSCRIPT:
Hello, and welcome to Introduction to Optimization. This video provides a basic answer to the question, “What is optimization?”
In simplest terms, optimization is choosing inputs that will result in the best possible outputs, or making things the best that they can be.
This can mean a variety of things, from deciding on the most effective allocation of available resources, to producing a design with the best characteristics, to choosing control variables that will cause a system to behave as desired.
Optimization problems often involve the words maximize or minimize. Optimization is also useful when there are limits (or constraints) on the resources involved, or boundaries restricting the possible solutions.
Let’s take a look at a very simple example of an optimization problem:
Given a parabola, chose x to get the largest y.
We can try different x values to see the resulting y value. Eventually we can find the maximum y value by choosing x here. You may also have solved this type of problem in calculus class by taking the derivative of the parabola and setting it equal to zero.
Now for this simple problem it is easy to see the correct solution. For more complicated problems, it can be difficult to immediately see the correct solution, guessing and checking can take much too long, and it can be difficult to find the values where the derivative is equal to zero. To find the answers to most optimization problems we need to use a special type of program called an optimization algorithm. We’ll learn more about optimization algorithms in upcoming videos.
Optimization can be applied to a huge variety of situations and problems. For example:
Warehouse placement
Choosing the optimal location for a warehouse to minimize shipment times to potential customers.
Bridge design
Designing a bridge that can carry the maximum load possible for a given cost.
Build order
Choosing the optimal build order for units in a strategy game to amass the strongest possible army in a given time.
Artificial Pancreas
Controlling the insulin output from an artificial pancreas to minimize the difference between actual and desired blood sugar levels throughout the day.
Wing design
Design an airplane wing to minimize weight while maintaining strength.
Stock portfolio
Selecting the best set of stocks to invest in to maximize returns based on predicted performance.
Temperature control of a chemical reaction
Controlling the temperature of a chemical reaction throughout a process to maximize the purity of a desired product.
As you can see, optimization is a powerful tool in many applications. This is just a small sampling of the many fields that make use of optimization techniques to improve the quality of their solutions. If something can be modeled mathematically, it can usually be optimized.
To summarize:
Optimization improves results by helping to choose the inputs that produce the best outputs
Most optimization problems require an optimization algorithm to solve
Optimization is applicable to many disciplines 