Production function v Production function is one of

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Production function v. Production function is one of basic and important concepts in economics.

Production function v. Production function is one of basic and important concepts in economics. v. It is the basis for resource economics studies. In the early past it was considered that production function is a characteristic feature of those production processes in which nature dominated. v. Later it was established that production function explained the functional relationship between inputs to produce an output in all production processes.

v. Marshall (1966) explained the production function analysis in agriculture with the help of

v. Marshall (1966) explained the production function analysis in agriculture with the help of Law of Diminishing Returns. v. According to him, “an increase in the capital and labour applied in the cultivation of land causes in general a less than proportionate increase in the amount of produce raised, unless it happens to coincide with an improvement in the arts of agriculture”.

v. Marshall assumed that land is a fixed factor and other factors were variable,

v. Marshall assumed that land is a fixed factor and other factors were variable, all units of the variable factor were identical and homogenous and the technology of agriculture followed remained the same.

v. All the above said assumptions apply in fisheries, for example aquaculture, as well.

v. All the above said assumptions apply in fisheries, for example aquaculture, as well. v. The land is fixed. v. The other factors of production like labour, capital and inputs do vary. v. The technology adopted does not significantly change in the short run. v If an improved production technology is followed then the returns increase instead of diminishing, but eventually a stage will be reached in which diminishing returns would appear.

v. Every producer would need to know in which stage of production he has

v. Every producer would need to know in which stage of production he has been operating so that he could produce the maximum possible output with a given set of inputs and technology. v. Production function analysis helps us to identify the inputs which influence the production process and the efficiency with which these inputs were used.

v. Also, we could identify those inputs which could cause increase in the output

v. Also, we could identify those inputs which could cause increase in the output more than per unit of each input so that they could be used in higher quantities. v. Similarly, the level of use of inputs which contributed less to the production could be reduced to required levels. v. Thus, the cost of production could be minimised which means enhanced income.

v. The objective of the producer, that is, whether he intends to maximize yield

v. The objective of the producer, that is, whether he intends to maximize yield or income or profit or minimise cost influences the choice of production function analysis. v. However, it must be remembered that although a producer does not decide the production function characterising the production process he has been following, he can choose an appropriate alternative function. v. Thus, he can benefit from production function analysis to make required decisions.

Types of production functions In any production process, three types of production functions could

Types of production functions In any production process, three types of production functions could be observed. They include cases of (i) increasing returns; (ii) constant returns and (iii) decreasing returns. v The case of increasing returns is seen in stage I in which the average product is at its maximum.

v. As the marginal product is higher than the average product in region I,

v. As the marginal product is higher than the average product in region I, the producer would continue to add the inputs as long as the average product is increasing. v. Diminishing returns is seen in region III in which the total product is declining further and the marginal product or the amount of product added by additional units of input is negative.

v. The region is therefore called irrational region as the producer stands to lose

v. The region is therefore called irrational region as the producer stands to lose while operating in this region. v. In the case of constant returns, the amount of product increases by the same amount for each additional unit of input. v. The region II is called the rational region as the production becomes most profitable here.

v. The total produce is increasing, the marginal product is decreasing, positive and is

v. The total produce is increasing, the marginal product is decreasing, positive and is less than the average product which also declines. v. Fish producers aiming at income maximisation should attempt to find the production function of the process they follow in the region II.

Influence of technological change v. Technology refers to the available know-hows of producing an

Influence of technological change v. Technology refers to the available know-hows of producing an output using certain inputs. v. Technological change means improvement in the production know-how so that the output is enhanced. v. It shifts the production function over some range so as to produce more output with the same quantities of inputs or to produce the same output with less quantities of inputs.

v. Therefore, while analysing the functional relationship between the output, say fish produced, with

v. Therefore, while analysing the functional relationship between the output, say fish produced, with some inputs, say seed, fertilisers, manures etc, it is generally assumed that the technology adopted remains the same.

Production function model v. The basic production function in the case of fisheries could

Production function model v. The basic production function in the case of fisheries could take the simple form of Cobb. Douglas production function. v. If Y refers to the fish produced and x 1, x 2, x 3 and x 4 refer to the inputs used, then the production function is specified as follows : Y = f (x 1, x 2, x 3, x 4).

v. Specification of an appropriate functional form is very important to draw meaningful conclusions

v. Specification of an appropriate functional form is very important to draw meaningful conclusions in production function analysis. v. Although several functional forms like linear, log linear, quadratic, polynomial, parabolic, etc. are available, we need to identify the one which best suits the data collected and our needs.

v. The choice of the functional form could be decided on the basis of

v. The choice of the functional form could be decided on the basis of scattergrams. v. The scattergram reveals how the input and output data are distributed and indicates the overall trend.

Production function analysis - a case study in aquaculture v. In carp culture, the

Production function analysis - a case study in aquaculture v. In carp culture, the quantity of fish farmed represents the output for which various inputs like seed, feed fertilisers etc. are used. v. The Cobb-Douglas production function in carp culture could be specified as follows: Y = f (m, u, s, f, r, g, 1) where,

Y = output of farmed carps in kg/ha. m = cattle manures in kg/ha

Y = output of farmed carps in kg/ha. m = cattle manures in kg/ha u = urea in kg/ha s = super phosphate in kg/ha f= stocking density in numbers/ha r = rice bran in kg/ha g = groundnut oil cake in kg/ha l = labour in mandays The above equation could be solved with required data set in a computer using an appropriate analytical software like SPSS or Limdep or even Excel.

Interpreting the results v. First the zero order correlation matrix should be estimated. v.

Interpreting the results v. First the zero order correlation matrix should be estimated. v. This will indicate presence of multicollinearity, if any, among the variables. v. If multi-collinearity exists between any two variables, then, the production function should be re-estimated repeatedly by dropping one of the correlated variables.

v. If there is any improvement in the values of partial regression co-efficients or

v. If there is any improvement in the values of partial regression co-efficients or R-square value, then, that function should be taken for interpretation; otherwise, the same function could be retained. v. Let us consider the result of a production function estimated by Jayaraman (1996) for carp culture in Thanjavur district in Tamil Nadu.

v. The equation shows that only two variables had coefficients with the unexpected negative

v. The equation shows that only two variables had coefficients with the unexpected negative sign but they were not statistically significant and hence could be accepted. v. The R-square value is 0. 5528 which means that the estimated equation could explain only 55 % of variations in the yield of farmed carps.

v. However, it is statistically highly significant and the equation is valid for interpretation

v. However, it is statistically highly significant and the equation is valid for interpretation and drawing inferences. v. Among the partial regression co-efficients, only those for cattle manure and groundnut oilcake were statistically significant and had positive signs.

v. Therefore, at mean level, these are the inputs that could increase the yield

v. Therefore, at mean level, these are the inputs that could increase the yield of farmed carps and the marginal productivities of all other inputs were not statistically different from zero.

v. The results imply that a hundred percent increase in the use of groundnut

v. The results imply that a hundred percent increase in the use of groundnut oilcake and stocking density of the carps would enhance the yield by 70. 37 % and 2. 55 % respectively. v. Yield responded to the cattle manure applied at 21 % level of significance only suggesting its use at sub-optimal level. The intercept (regression constant) term is positive and statistically highly significant revealing that the effect of the omitted variables was not small and consistent with the value of R-square obtained.

v. One of the omitted variables is the managerial skill of the fish farmer.

v. One of the omitted variables is the managerial skill of the fish farmer. Although this variable could have a significant influence in the yield of farmed carps, its quantification is difficult. v. Hence, it is common to observe most of the production function analyses excluding this variable on the assumption that there were no significant differences in the managerial skill of the fish farmers considered in the analysis.