Unit 7: Production Theory




          If h is assumed to be a variable, then the above function may be called the variable elasticity of   Notes
          substitution, VES function.

          Still another form is the fixed proportion production function also called the Leontief function.
          It is represented by
                                                    ⎡ KL ⎤
                                                      ,
                                       Q = minimum  ⎢ ⎣  ab ⎦ ⎥
          where a and b are constants and ‘minimum’ means that Q equals the smaller of the two ratios.

          Finally there is a very simple linear production function. Assuming that the inputs are perfect
          substitutes so that all factors may be reducible to one single factor, say, labour, L, than the linear
          production function may be,
                                              Q = aL
          where
          ‘a’ is the constant term and
          L stands for labour.

          In order to analyse the relationship between factor inputs and outputs, economists classify time
          periods into short runs and long runs.
          Before further discussion it is necessary to conceptualize three terms: total product, average
          product and marginal product.
          1.   Total product is the total quantity produced by that many units of a variable factor
               (i.e., labour). For example, if on a farm 2000 Kg. of wheat were produced by 10 men, the
               total product would be 2000 Kg.
          2.   Average product is the total output divided by the number of units of the variable factor
               (or the number of men). Thus AP = TP/L. On the same farm, the average product would
               be 2000/10 = 200 Kg.
          3.   Marginal product is the change in total output resulting from the change (using one more
               or one less unit) of the variable factor. If an eleventh man is now added to this farm and
               the output rose to 2,100 Kg, the marginal product (of labour) would be 100 Kg. Thus,
               MP = d(TP)/dL.
          For a two-input production process, the Total Product of Labour (TP ) is defi ned as the maximum
                                                                L
          rate of output coming up from combining varying rates of labour input with a fixed capital input

          (K) . (Note: A bar over K or over any other variable means, that variable has been fi xed, and
          therefore is no more variable)
                                          TP  = f  (K,L)
                                             L
          and total product of capital function is

                                          TP  = f  (K,L)
                                            K
          Marginal Product (MP) is the change in output per unit change in the variable input. Thus the
          marginal product of labour and capital is
                                                  Δ Q
                                            MP =  Δ L
                                               L

                                                  Δ Q
                                            MP =  Δ K
                                              K





                                           LOVELY PROFESSIONAL UNIVERSITY                                    87