4-1 ratios & proportions
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4-1 Ratios & Proportions. Notes. A ratio is a comparison of two quantities. . Ratios can be written in several ways . 7 to 5, 7:5, and name the same ratio. 15 ÷ 3 9 ÷ 3. bikes skateboards. Example 1: Writing Ratios in Simplest Form. - PowerPoint PPT PresentationTRANSCRIPT
4-1 RATIOS & PROPORTIONS
A ratio is a comparison of two quantities. Ratios can be written in several ways. 7 to 5, 7:5, and name the same ratio.7
5
Notes
Example 1: Writing Ratios in Simplest Form
Write the ratio 15 bikes to 9 skateboards in simplest form.
159
53
The ratio of bikes to skateboards is , 5:3, or 5 to 3.
=
15 ÷ 39 ÷ 3
Write the ratio as a fraction.
= = Simplify.
53
bikesskateboards
Check It Out! Example 2
Write the ratio 24 shirts to 9 jeans in simplest form.
249
83
The ratio of shirts to jeans is , 8:3, or 8 to 3.
=shirtsjeans
24 ÷ 39 ÷ 3
Write the ratio as a fraction.
= = Simplify.
83
Practice 15 cows to 25 sheep
24 cars to 18 trucks
30 Knives to 27 spoons
When simplifying ratios based on measurements, write the quantities with the same units, if possible.
Write the ratio 3 yards to 12 feet in simplest form.First convert yards to feet.
9 feet12 feet=3 yards
12 feet34=9 ÷ 3
12 ÷ 3=
There are 3 feet in each yard.
Example 3: Writing Ratios Based on Measurement
3 yards = 3 ● 3 feet= 9 feet Multiply.
Now write the ratio.
Simplify.
The ratio is , 3:4, or 3 to 4.34
Write the ratio 36 inches to 4 feet in simplest form.First convert feet to inches.
36 inches48 inches=36 inches
4 feet34 =36 ÷ 12
48 ÷ 12=
There are 12 inches in each foot.
Check It Out! Example 3
4 feet = 4 ● 12 inches
= 48 inches Multiply.Now write the ratio.
Simplify.
The ratio is , 3:4, or 3 to 4.34
Practice 4 feet to 24 inches
3 yards to 12 feet
2 yards to 20 inches
Ratios that make the same comparison are equivalent ratios.
To check whether two ratios are equivalent, you can write both in simplest form.
Notes
Example 4: Determining Whether Two Ratios Are Equivalent
Simplify to tell whether the ratios are equivalent.
1215
B. and 2736
327
A. and 218 Since ,
the ratios are equivalent.
19= 1
919=3 ÷ 3
27 ÷ 3327 =
19=2 ÷ 2
18 ÷ 2218 =
45=12 ÷ 3
15 ÷ 31215=
34=27 ÷ 9
36 ÷ 92736=
Since ,the ratios are not equivalent.
45
34
Practice
5628
4921
4816
3913
and
and
Lesson Quiz: Part IWrite each ratio in simplest form.1. 22 tigers to 44 lions
2. 5 feet to 14 inches
415
3.
721
4.
830
1245Possible answer: ,
13
1442Possible answer: ,
Find a ratio that is equivalent to each given ratio.
12
307
Lesson Quiz: Part II
7. Kate poured 8 oz of juice from a 64 oz bottle. Brian poured 16 oz of juice from a 128 oz bottle. Are the ratios of poured juice to starting amount of juice equivalent?864
16128
and ; yes, both equal 1 8
85
85= ; yes16
105.
3624
6.
Simplify to tell whether the ratios are equivalent.
and 32 20
and 28 18
32
149 ; no
Vocabulary A proportion is an equation stating that two
ratios are equal.To prove that two ratios form a proportion, you must prove that they are equivalent. To do this, you must demonstrate that the relationship between numerators is the same as the relationship between denominators.
Examples: Do the ratios form a proportion?
710
, 2130
x 3
x 3
Yes, these two ratios DO form a proportion, because the same relationship exists in both the numerators and denominators.
89
, 23
÷ 4
÷ 3
No, these ratios do NOT form a proportion, because the ratios are not equal.
Example
340
=7
÷ 5
÷ 5
8
Cross Products When you have a proportion (two equal
ratios), then you have equivalent cross products.
Find the cross product by multiplying the denominator of each ratio by the numerator of the other ratio.
Example: Do the ratios form a proportion? Check using cross products.
412
, 39
12 x 3 = 369 x 4 = 36
These two ratios DO form a proportion because their cross products are the same.
Example 2
58
, 23
8 x 2 = 163 x 5 = 15
No, these two ratios DO NOT form a proportion, because their cross products are different.
Solving a Proportion Using Cross Products
Use the cross products to create an equation.
Solve the equation for the variable using the inverse operation.
Example 1: Solve the Proportion
k17 = 20
68
Start with the variable.
=68k 17(20)
Simplify.
68k = 340
Now we have an equation. To get the k by itself, divide both sides by 68.
68 68k = 5
Example 2: Solve the ProportionStart with the variable.
=2x(30) 5(3)
Simplify.
60x = 15
Now we have an equation. Solve for x.
60 60x = ¼
Example 3: Solve the ProportionStart with the variable.
=(2x +1)3 5(4)
Simplify.
6x + 3 = 20
Now we have an equation. Solve for x.
x =
=
Example 4: Solve the ProportionCross Multiply.
=3x 4(x+2)
Simplify.
3x = 4x + 8
Now we have an equation with variables on both sides. Solve for x.
x = -8
=