Introduction: In the previous section we optimized functions of two variables, with the variables unconstrained. However, it is also possible that these variables are constrained by a restriction.
Definition: A constrained extremum problem is given by
Remark: A constrained extremum problem is also called a constrained optimization problem..
In this section we discuss three methods to solve such a problem: Substitution method, First-order condition constrained extremum problem and First-order method Lagrange.
Required preknowlegde: Chapter 1: Functions of one variable, Chapter 2: Differentiation of functions of one variable, Chapter 3: Functions of two variables, Chapter 4: Differentiation of functions of two variables, Section: Optimization functions of one variable, Section: Optimization functions of two variables.
Definition: A constrained extremum problem is given by
- Optimize z(x,y) (This is the object function)
- Subject to g(x,y)=k (This is the restriction)
- Where x∈D1, ,y∈D2 (This is the domain)
- Maximize z(x,y)=2xy+3y
- Subject to 4x+y=10
- Where x,y>0
Remark: A constrained extremum problem is also called a constrained optimization problem..
In this section we discuss three methods to solve such a problem: Substitution method, First-order condition constrained extremum problem and First-order method Lagrange.
Required preknowlegde: Chapter 1: Functions of one variable, Chapter 2: Differentiation of functions of one variable, Chapter 3: Functions of two variables, Chapter 4: Differentiation of functions of two variables, Section: Optimization functions of one variable, Section: Optimization functions of two variables.