7.1 Direct and Inverse Variation
105
Johnny makes $15 for every two days he delivers newspapers. How much would he make after two weeks?
direct variation
Linear function that uses the equation, y=kx, and always passes through the origin (0,0); typically, as x increases, y increases (EX: gallons of water used in shower)
20
If a car uses 8L of gas to travel 160km, how much gas will the car use to travel 400km?
1/2
If y varies directly with x, and y = 2 when x = 8, what is y when x = 2?
10
If y varies directly with x, and y = 50 when x = 4, what is x when y = 125?
6
If y varies inversely with x, and y = 20 when x = 3, what is x when y = 10?
15
If y varies inversely with x, and y = 9 when x = 5, what is y when x = 3?
5
It takes a factory 10 days to produce 10,000 cars. How many days would it take two factories to produce the same number of cars?
inverse variation
Non-linear function that uses the equation, y=k/x, and never passes through (0,0) or crosses the axes; typically, as x increases, y decreases (EX: cleaning desks)
180
Three pipes take 1 hour to water the football field. How many minutes would it take one pipe to water the field?
divide y/x
how to find the constant of variation (k) for a direct variation
multiply xy
how to find the constant of variation (k) for an inverse variation
plug in (0,0) or solve for y
how to see if an equation is a direct variation
constant of variation
k; shows the relationship between the x-value and y-value in direct and inverse variations
direct variation equations
y=3x; 4x+y=0; y=1/2x; y=0.4x; y=x/8; 2x=6y are examples of---
inverse variation equations
y=7/x; xy=9; y=-5/x are examples of---