Learn on PengiPengi Math (Grade 7)Chapter 3: Ratios, Rates, and Proportional Relationships

Lesson 4: Proportional Equations

Property The variables $y$ and $x$ are proportional if $$\frac{y}{x} = k$$ where $k$ is a constant. This constant $k$ is called the constant of proportionality. This relationship can also be expressed as an equation: $$y = kx$$ This second version says that $y$ is proportional to $x$ if $y$ is a constant multiple of $x$. The two equations are two ways to say the same thing.

Section 1

Writing the Proportional Relationship Equation y = kx

Property

The variables yy and xx are proportional if

yx=k\frac{y}{x} = k
where kk is a constant. This constant kk is called the constant of proportionality. This relationship can also be expressed as an equation:
y=kxy = kx
This second version says that yy is proportional to xx if yy is a constant multiple of xx. The two equations are two ways to say the same thing.

Examples

  • The cost CC for gallons gg of gas is proportional. If 5 gallons cost 20 dollars, the constant is k=205=4k = \frac{20}{5} = 4. The equation is C=4gC = 4g.
  • The number of words ww you type is proportional to the minutes mm you spend typing. If you type 240 words in 4 minutes, the constant is k=2404=60k = \frac{240}{4} = 60. The equation is w=60mw = 60m.
  • The length in centimeters cc is proportional to the length in inches ii. Since 1 inch is 2.54 cm, the constant of proportionality is k=2.54k = 2.54. The equation is c=2.54ic = 2.54i.

Explanation

Proportional variables have a constant ratio. This means one variable is always a fixed multiple of the other. Think of it like a recipe: doubling the ingredients doubles the serving size. Their graph is a straight line through the origin (0,0).

Section 2

Reciprocal Constants of Proportionality

Property

For a proportional relationship between quantities xx and yy, if the constant of proportionality from xx to yy is kk, then the constant of proportionality from yy to xx is its reciprocal, 1k\frac{1}{k}.

y=kxandx=(1k)yy = kx \quad \text{and} \quad x = \left(\frac{1}{k}\right)y

Examples

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Chapter 3: Ratios, Rates, and Proportional Relationships

  1. Lesson 1

    Lesson 1: Understanding Ratios and Unit Rates

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  2. Lesson 2

    Lesson 2: Identifying Proportional Relationships

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  3. Lesson 3

    Lesson 3: The Constant of Proportionality

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  4. Lesson 4Current

    Lesson 4: Proportional Equations

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  5. Lesson 5

    Lesson 5: Solving Proportions and Scale Drawings

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Section 1

Writing the Proportional Relationship Equation y = kx

Property

The variables yy and xx are proportional if

yx=k\frac{y}{x} = k
where kk is a constant. This constant kk is called the constant of proportionality. This relationship can also be expressed as an equation:
y=kxy = kx
This second version says that yy is proportional to xx if yy is a constant multiple of xx. The two equations are two ways to say the same thing.

Examples

  • The cost CC for gallons gg of gas is proportional. If 5 gallons cost 20 dollars, the constant is k=205=4k = \frac{20}{5} = 4. The equation is C=4gC = 4g.
  • The number of words ww you type is proportional to the minutes mm you spend typing. If you type 240 words in 4 minutes, the constant is k=2404=60k = \frac{240}{4} = 60. The equation is w=60mw = 60m.
  • The length in centimeters cc is proportional to the length in inches ii. Since 1 inch is 2.54 cm, the constant of proportionality is k=2.54k = 2.54. The equation is c=2.54ic = 2.54i.

Explanation

Proportional variables have a constant ratio. This means one variable is always a fixed multiple of the other. Think of it like a recipe: doubling the ingredients doubles the serving size. Their graph is a straight line through the origin (0,0).

Section 2

Reciprocal Constants of Proportionality

Property

For a proportional relationship between quantities xx and yy, if the constant of proportionality from xx to yy is kk, then the constant of proportionality from yy to xx is its reciprocal, 1k\frac{1}{k}.

y=kxandx=(1k)yy = kx \quad \text{and} \quad x = \left(\frac{1}{k}\right)y

Examples

Book overview

Jump across lessons in the current chapter without opening the full course modal.

Continue this chapter

Chapter 3: Ratios, Rates, and Proportional Relationships

  1. Lesson 1

    Lesson 1: Understanding Ratios and Unit Rates

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  2. Lesson 2

    Lesson 2: Identifying Proportional Relationships

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  3. Lesson 3

    Lesson 3: The Constant of Proportionality

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  4. Lesson 4Current

    Lesson 4: Proportional Equations

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  5. Lesson 5

    Lesson 5: Solving Proportions and Scale Drawings

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