Solving Proportions 4-3. Vocabulary Cross product- for two ratios, the product of the numerator in one ratio and the denominator in the other.

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Presentation transcript:

Solving Proportions 4-3

Vocabulary Cross product- for two ratios, the product of the numerator in one ratio and the denominator in the other.

For two ratios, the product of the numerator in one ratio and the denominator in the other is a cross product. If the cross products of the ratios are equal, then the ratios form a proportion. 5 · 6 = 30 2 · 15 = 30 =

You can use the cross product rule to solve proportions with variables.

Use cross products to solve the proportion. Additional Example 1: Solving Proportions Using Cross Products 15 · m = 9 · 5 15m = 45 15m 15 = m = 3 The cross products are equal. Multiply. Divide each side by 15 to isolate the variable. = m5m5 9 15

Check It Out: Example 1 Use cross products to solve the proportion = m 14

It is important to set up proportions correctly. Each ratio must compare corresponding quantities in the same order. Suppose a boat travels 16 miles in 4 hours and 8 miles in x hours at the same speed. Either of these proportions could represent this situation. 16 mi 4 hr = 8 mi x hr 16 mi 8 mi = 4 hr x hr

Additional Example 2: Problem Solving Application If 3 volumes of Jennifer’s encyclopedia takes up 4 inches of space on her shelf, how much space will she need for all 26 volumes? 1 Understand the Problem Rewrite the question as a statement. Find the space needed for 26 volumes of the encyclopedia. List the important information: 3 volumes of the encyclopedia take up 4 inches of space.

2 Make a Plan Set up a proportion using the given information. Let x represent the inches of space needed. 3 volumes 4 inches = 26 volumes x volumes inches Additional Example 2 Continued

Solve = 26 x 3 · x = 4 · 26 3x = 104 3x 3 = x = She needs inches for all 26 volumes. Write the proportion. The cross products are equal. Multiply. Divide each side by 3 to isolate the variable. Additional Example 2 Continued

Look Back = · 26 = · = 104 The cross products are equal, so is the answer Additional Example 2 Continued

Check It Out: Example 2 John filled his new radiator with 6 pints of coolant, which is the 10 inch mark. How many pints of coolant would be needed to fill the radiator to the 25 inch level?