Difference between revisions of "Modeling using Variation"

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(Created page with "There are three types of variations: * Direct variation * Inverse variation * Joint variation ==Direct Variation== Direct variation describes a simple relationship between tw...")
 
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: y = kx
 
: y = kx
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for some constant k , called the constant of variation or constant of proportionality . (Some textbooks describe direct variation by saying " y varies directly as x ", " y varies proportionally as x ", or " y is directly proportional to x .")
 
for some constant k , called the constant of variation or constant of proportionality . (Some textbooks describe direct variation by saying " y varies directly as x ", " y varies proportionally as x ", or " y is directly proportional to x .")
 +
  
 
This means that as x increases, y increases and as x decreases, y decreases—and that the ratio between them always stays the same.
 
This means that as x increases, y increases and as x decreases, y decreases—and that the ratio between them always stays the same.
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==Inverse Variation==
 
==Inverse Variation==
 
While direct variation describes a linear relationship between two variables , inverse variation describes another kind of relationship.
 
While direct variation describes a linear relationship between two variables , inverse variation describes another kind of relationship.
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For two quantities with inverse variation, as one quantity increases, the other quantity decreases.
 
For two quantities with inverse variation, as one quantity increases, the other quantity decreases.
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An inverse variation can be represented by the equation xy = k or <math>y = \frac{k}{x}</math> .
 
An inverse variation can be represented by the equation xy = k or <math>y = \frac{k}{x}</math> .
  
That is, y varies inversely as x if there is some nonzero constant k such that, xy = k or <math>y = {k \over x}</math> where x ≠ 0,y ≠ 0 .
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That is, y varies inversely as x if there is some nonzero constant k such that, xy = k or <math>y = {k \over x}</math> where x ≠ 0, y ≠ 0 .
  
 
==Joint Variation==
 
==Joint Variation==
 
Joint variation occurs when a variable varies directly or inversely with multiple variables.
 
Joint variation occurs when a variable varies directly or inversely with multiple variables.
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For instance, if x varies directly with both y and z, we have x = kyz. If x varies directly with y and inversely with z, we have <math>x = {ky \over z}</math> .
 
For instance, if x varies directly with both y and z, we have x = kyz. If x varies directly with y and inversely with z, we have <math>x = {ky \over z}</math> .
​​Notice that we only use one constant in a joint variation equation.
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 +
Notice that we only use one constant in a joint variation equation.
  
 
==Resources==
 
==Resources==

Revision as of 14:06, 16 September 2021

There are three types of variations:

  • Direct variation
  • Inverse variation
  • Joint variation

Direct Variation

Direct variation describes a simple relationship between two variables . We say y varies directly with x (or as x , in some textbooks) if:

y = kx


for some constant k , called the constant of variation or constant of proportionality . (Some textbooks describe direct variation by saying " y varies directly as x ", " y varies proportionally as x ", or " y is directly proportional to x .")


This means that as x increases, y increases and as x decreases, y decreases—and that the ratio between them always stays the same.

Inverse Variation

While direct variation describes a linear relationship between two variables , inverse variation describes another kind of relationship.


For two quantities with inverse variation, as one quantity increases, the other quantity decreases.

An inverse variation can be represented by the equation xy = k or .

That is, y varies inversely as x if there is some nonzero constant k such that, xy = k or where x ≠ 0, y ≠ 0 .

Joint Variation

Joint variation occurs when a variable varies directly or inversely with multiple variables.

For instance, if x varies directly with both y and z, we have x = kyz. If x varies directly with y and inversely with z, we have .

Notice that we only use one constant in a joint variation equation.

Resources