Unit 3, Lesson 6 Constant of Proportionality and Writing Direct Variation Equations.

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Presentation transcript:

Unit 3, Lesson 6 Constant of Proportionality and Writing Direct Variation Equations

Proportional relationships vary directly and we say that they are direct variations. These are linear (line) relationships and have an equation that describes the relationship. The constant of proportionality in a direct variation is a constant ratio (unit rate) in any proportional relationship. We use the letter k to represent the constant of proportionality. Equations: y = kx or k = y x

We can find the constant of proportionality from a table of values, equation and a graph. In a table, simplify any one of the ratios. Chaperones12345 Students

Apples (lbs) Cost ($) Example: Find the constant of proportionality:

XY Find the constant of proportionality.

In an equation, write the equation in the form y = kx to find k. Examples: Y=5x Y= ¼ x Y=3.5x

Find the constant of proportionality: (click to reveal)

In a graph, choose a point (x, y) to find and simplify the ratio to find k. (2, 24) Chaperones Students

Example: Find the constant of proportionality

Find the constant of proportionality.

Constant of proportionality & unit rate are equivalent. We can use the constant of proportionality to help write equations using proportional relationships. By transforming the equation from: to y = kx, we can write an equation that can be applied to various situations. X is the independent (input) variable and y is the dependent (output) variable. This means that a change in x will effect y.

Example: You are buying Jersey Tomatoes for a cost of 2 pounds for $3.98. Write an equation to represent the proportional relationship. Let c = cost p = pounds Determine the unit rate: Write an equation to relate the two quantities:

Example: At the candy store, you purchase 5 lbs for $ Write an equation to represent the proportional relationship. Let c = cost p = pounds Determine the unit rate: Write an equation to relate the two quantities:

c = 1.4p p = 1.4c Write an equation that represents the proportional relationship. The total cost (c) of grapes for $1.40 per pound(p) A B

Write an equation that represents the proportional relationship. A B C D

Days, d2345 Hours, h Write an equation that represents the proportional relationship. h = 8.5 d A B C D d = 8.5 h