Algebra I All-in-One For Dummies. Mary Jane Sterling
Читать онлайн книгу.This method is a bit nicer than looking at all the multiples of 96.
Applying Fractional Operations
Now that you have the tools necessary, you can investigate ways to perform binary operations on fractions. Addition and subtraction go together, because they both require common denominators. Multiplication and division are paired, because they can be performed without having to create the same denominator. And division is just “multiplication adjusted”!
Adding and subtracting fractions
You can add fractions together or subtract one from another if they have a common denominator. After you find the common denominator and change the fractions to their equivalents, you can add the numerators together or subtract them (keeping the denominators the same).
Adding and subtracting fractions takes a little special care. You can add quarts and gallons if you change them to the same unit. It’s the same with fractions. You can add thirds and sixths if you find the common denominator first.
To add or subtract fractions:
1 Convert the fractions so that they have the same value in the denominators.Find out how to do this in the section, “Finding common denominators.”
2 Add or subtract the numerators.Leave the denominators alone.
3 Reduce the answer, if needed.
Q. In her will, Jane gave
A. The fractions
Q.
A. First find the common denominator, 24, and then complete the addition:
Q.
A. You need a common denominator of 30:
The whole number parts are separated from the fractional parts to keep the numbers in the computations smaller. Be sure to apply the subtraction to both the whole number and fraction when needed.
Q.
A. In this problem, you see another option: you can change both mixed numbers to improper fractions. The common denominator is 56:
27
28
29
30
31
Multiplying and dividing fractions
Multiplying fractions is really a much easier process than adding or subtracting fractions, because you don’t have to find a common denominator. Furthermore, you can take some creative steps and reduce the fractions before you even multiply them.
When multiplying fractions, you can pair up the numerator of any fraction in the problem with the denominator of any other fraction; then divide each by the same number (reduce). Doing so saves you from having large numbers to multiply and then to reduce later.
Yes, multiplying fractions is a tad easier than adding or subtracting them. Multiplying is easier because you don’t need to find a common denominator first. The only catch is that you have to change any mixed numbers to improper fractions. Then, at the end, you may have to change the fraction back again to a mixed number. Small price to pay.
When multiplying fractions, follow these steps:
1 Change all mixed numbers to improper fractions.
2 Reduce any numerator-denominator combinations, if possible.
3 Multiply the numerators together and the denominators together.
4 Reduce the answer if necessary.
Here’s an example: Suppose Sadie worked
Write the problem as
The product