Why learn to solve systems of equations and inequalities?
When you play in a river you are surrounded by fluids, including water and air. At first it might seem strange to think of air as a fluid, but a fluid is defined as a substance that flows. Wind, therefore, is a great example of air that flows. Other examples of flows include traffic patterns and electrical currents. Flows can be turbulent like what you may experience in airplanes.
Early in the 19th Century, Claude-Louis Navier in France and George Gabriel Stokes in England both derived an equation that can explain and predict the flow of fluids. The Navier-Stokes equations are a system of equations used to describe the velocity of a fluid as it moves through three-dimensional space over a specific interval of time.
Interestingly, our understanding of solutions to the Navier-Stokes equations remains minimal. Surprisingly, given the equations’ wide range of practical uses, it has not yet been proven that solutions always exist in three dimensions. The Clay Mathematics Institute has called this one of the seven most important open problems in mathematics and has offered a US $1,000,000 prize for a solution or a counter-example.
In this section, we will learn how to graph systems of equations in two dimensions and find whether solutions exist. We will also see how systems of equations can be used to solve problems where we have two unknown variables.
MODULE 4 Learning Objectives
4.1: Solving a 2×2 System of Linear Equations by Graphing
- Determine whether a given point is a solution to a system of linear equations
- Solve systems of linear equations by graphing
- Use a graph to classify solutions to systems
4.2: Solving a 2×2 System of Linear Equations by Substitution
- Solve systems of linear equations using substitution
- Recognize when systems of linear equations have no solution or an infinite number of solutions
4.3: Solving a 2×2 System of Linear Equations by Addition/Elimination
- Solve systems of linear equations using elimination
- Recognize when systems of linear equations have no solution or an infinite number of solutions
4.4: Applications of 2×2 Systems of Equations
- Set up and solve a linear system of equations by direct translation
- Use linear systems to solve value problems
- Use linear systems to solve mixture problems
- Use linear systems to solve motion problems
4.5: Systems of Linear Inequalities
- Graph systems of two-variable linear inequalities