Word Problems

Equations vs Expressions

An expression is simply a statement, whereas an equation is a comparison. When interpreting word problems, each independent event or rule can be expressed via an expression. When two rules, events or quantities must be equal, that's when you use an equation. The key thing to remember is you cannot solve an expression, or for a variable in a expression. A variable is not bound by anything. Although expressions are technically what we use to model the problem, we use equations to model the interactions between them. You do not always need a equation, because you can also use inequalities.

Using Variables

Variables can be anything. Although common mathematical practice is to use letters, the simple definition is to just represent a number or quantity. Variables are fairly simple, so there are just a few rule to keep in mind

• Variables represent ONE value
• In an expression, variables can be anything
• In an equation, variables must represent a specific value OR will have an affect on other variables in the equation

Typically, you need as many equations in your system as variables, but there are some special cases.

Diophantine Equations

How to Solve Systems of Equations

A Diophantine equation is an equation that contradicts the rule that you need to have as many equations in a system as variables by bounding the values of the variables. The most typical example of this is binding to only integers. A specific enough range or similar technique can also limit the array of solutions (e.g. only positive numbers), but typically cannot make the solution set finite. Consider the two models below

A common staple of the AMC 10 is to use word problems modeling speed, distance and time. These are fairly straightforward, but there are two main things to remember

• Speed is equal to distance divided by time. If you forget this, just remember miles per hour, or another speed measurement
• Units are important. The units for speed are the units of distance per the units of time. Units must match and must conform to what is asked in the equation

Now, that's not to say speed, distance, time doesn't get complex. Although the concept and equation are simple, there are quite a few branches and types of problems utilizing them. Three examples are listed below. The first is "overtaking", a simple problem structure where ' there is a race or two moving objects where one starts later/at a different distance but moves faster. You can model this with systems of equations and set the distances equal to each other to find the place where they meet. The next situation is average speed. Notice that the average speed is calculated by finding the average of the speeds with weights (or importance) relative to the time spent at that speed. This means going the same distance at a fast speed and short speed gives more weight to the short speed. Finally, we have heatwind, current, or direction questions. This happens when something's movement can be modeled as the sum of two vectors, it's intended movement and another opposing vector that can act in any non-parallel direction. Often, this can require you to do conversions between speed and distance.

Try some practice problems!

Work and Rates

Work and rates is like an addition onto speed distance time. Instead of just using distance, you find the amount of something made, done, etc. This makes it diffucult because unlike speed distance time, many work questions will combine rates, and you can't accurately visualize it.

What's tricky about work is it typically does not give you time explicitly. The most important thing is to convert into speed and find the average. You'll find that in many work problems, it is most important to use speed