We will learn about what is variation, direct variation, indirect variation and joint variation.
In Mathematics, we usually deal with two types of quantities-Variable quantities (or variables) and Constant quantities (or constants). If the value of a quantity remains unaltered under different situations, it is called a constant. On the contrary, if the value of a quantity changes under different situations, it is called a variable.
For example: 4, 2.718, 22/7 etc. are constants while speed of a train, demand of a commodity, population of a town etc. are variables.
In a mathematical equation where a relationship is established for some type of parameters normally two types quantities exist. One is constant that doesn’t change with the changes of other parameters in the equation and another is the variables which change for different situations. The changing of variable parameters is called as variation.
In problems relating to two or more variables, it is seen that the value of a variable changes with the change in the value ( or values ) of the related variable (or variables). Suppose a train running at a uniform speed of v km./h. travels a distance of d km. in t hours. Obviously, if t remains unchanged then v increases or decreases according as d increases or decreases. But if d remains unchanged, then v decreases or increases according as t increases or decreases. This shows that the change in the value of a variable may be accompanied differently with the change in the values of related variables. Such relationship with regards to the change in the value of a variable when the values of the related variables change, is termed as variation.
This can be explained by an example of simple equation y = mx where m is a constant. If we assume that the value of m as 5 then the equation becomes as y = 5x.
When x = 1, y = 1 × 5 = 5
When x = 2, y = 2 × 5 = 10
When x = 3, y = 3 × 5 = 15
Simply the value of y is changing with the different values of x.
This is the variation of y with different values of x and similarly it can be shown that with different values of y the value of x changes.
Variation can be of different types according the pattern of changing or relationships of variables.
Direct Variation: In a variation if variables change proportionately i.e. either increase or decrease together then it is called as direct variation. If X is in direct variation with Y, it can be symbolically written as X α Y.
Inverse or Indirect Variation: In inverse or indirect variation the variables change disproportionately or when one of the variables increases, the other one decreases. So behavior of the variables is just the opposite of direct variations. That is why it is called as Inverse or indirect variation. If X is in indirect variation with Y, it can be symbolically written as X α data-mathml=”<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mi>Y</mi></mfrac></math>”>1Y
.
Joint Variation: If more than two variables are related directly or one variable changes with the change product of two or more variables it is called as joint variation. If X is in joint variation with Y and Z, it can be symbolically written as X α YZ.
Combined Variation: Combined variation is a combination of direct or joint variation, and indirect variation. So in this case three or more variables exist. If X is in combined variation with Y and Z, it can be symbolically written as X α data-mathml=”<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mi>Y</mi><mi>Z</mi></mfrac></math>”>YZ
or X α data-mathml=”<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mi>Z</mi><mi>Y</mi></mfrac></math>”>ZY
.
Partial Variation: When two variables are related by a formula or a variable is related by the sum of two or more variables then it is called as partial variation. X = KY + C (where K and C are constants) is a straight line equation which is a example of partial variation.
Here are some examples of direct and inverse variations.
Direct Variation: Perimeter of circle C= 2πr where 2 and π are constants and C increases if r increases, decreases if r decreases. So C is in direct variation with r.
Inverse Variation: If I need to go a distance of S with velocity V and time T then T = data-mathml=”<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mi>S</mi><mi>V</mi></mfrac></math>”>SV
. Here the distance S is constant. If velocity increases it will take less time so T decreases. So T is in indirect variation with V.
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