1.7: How to Find Things We Don’t Know, or, How I Learned to Love Basic Algebra

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Now let’s throw a little bit of a wrench in things. Let’s look at that Celsius-Fahrenheit temperature equation again.

\[T_{\circ F}=(1.8\times T_{\circ_{C}})+32 \]

The equation is really easy to use if you want to convert a temperature in Celsius to one in Fahrenheit. But what if you wanted to convert from a temperature in Fahrenheit to one in Celsius? This is going to involve using basic algebraic techniques. But don’t panic! I know algebra makes some people sweat, but with a little review and practice, you can ace any algebra we use in this class. The following videos will be helpful in your algebraic review.

Video 1. Doing the same things on both sides of an equation.

Video \(\PageIndex{1}\). Video showing doing the same things on both sides of an equation.

Video 2. Equations with variables on both sides.

Video \(\PageIndex{2}\). Video showing equations with variables on both sides.

Video 3. More variables on both sides of an equation.

Video \(\PageIndex{3}\). Video showing more variables on both sides of an equation.

Video 4. Using the distributive property to solve equations.

Video \(\PageIndex{4}\). Video showing using the distributive property to solve equations.

Video 5. Even more solving equations with variables on both sides.

Video \(\PageIndex{5}\). Video showing even more solving equations with variables on both sides.

Video 6. Solving an equation with the distributive property.

Video \(\PageIndex{6}\). Video showing solving an equation with the distributive property.

Now that you’ve had a chance to review some basic algebra, let’s look at a problem using the Celsius-Fahrenheit temperature equation.

Video 7. Using algebra to solve the Celsius-Fahrenheit temperature equation.

Video \(\PageIndex{7}\). Video showing using algebra to solve the Celsius-Fahrenheit temperature equation. There is an error in the answer; the temperature should be 22.3°C.

As you can see from the example in Video 7, algebra involves a lot of what we call linear relationships. We're going to explore that more in Section 1.6.

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