Direct, Inverse, and Joint Variation Notes and Examples
Direct, Inverse, and Joint Variation Notes and Examples
Two or more quantities that are related to each other are said to vary directly, inversely, or jointly. All variation problems involve a constant of proportion, k., but whether the two quantities grow or decrease together determines what type of variation you will use.
Direct
Indirect or
Inverse
Joint
y = kxn
y
=
k
1 xn
or
k = xn
y = kxm zn
Both quantities increase together or decrease together.
Suppose y varies directly as x and y = 45 when x = 2.5 .
Determine the constant of
variation and write an equation for
this relationship. Use the equation to find the value of y when x = 4 .
As one quantity increases the other quantity decreases
If y varies inversely as x and y = 14 when x = 3 , find x when y = 30 .
There are more than two quantities related; may also be combined with
indirect variation.
z varies jointly as x and the
square of y and inversely as w . If z = 25 when x = 10, y = 2, and w = 8 , determine an equation and find the value of z when x = 12, y = 2.5, and w = 10 .
Example 1
When an object such as a car in accelerating, twice the distance d it travels varies directly with the square of the time t elapsed. One car accelerating for 4 minutes travels 1440 feet.
A. Write an equation relating travel distance to time elapsed. Then graph the equation.
B. Use the equation to determine the distance traveled by the car in 8 minutes.
Example 2
The stretch in a loaded spring varies directly as the load it supports. A load of 8 kg stretches a certain spring 9.6 cm..
A. Find the constant of variation and the equation of the direct variation.
B. What load would stretch the spring 6 cm?
Example 3
The time required to travel a given distance is inversely proportional to the speed of travel. If a trip can be made in 3.6 hours at a speed of 70 kph, how long will it take to make the same trip at 90 kph?
Example 4
If z varies jointly as x and the square root of y , and z = 6 when x = 3 and y = 16 , find z when x = 7 and y = 4 .
Example 5
The surface area of a cylinder varies jointly as the radius and the sum of the radius and the height. A cylinder with height 8 cm and radius 4 cm has a surface area of 96 cm2 . Find the surface area of a cylinder with radius 3 cm and height 10 cm .
Example 6
The electrical resistance (in Ohms, ) of a wire varies directly as its length. IF a wire 110 cm long has a resistance of 7.5 , what length has a total resistance of 12 ?
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