Marx refers back to the examples previously given in Chapter 12
The organic composition of capital in industry is taken as 80 c + 20 v, and in agriculture as 60 c + 40 v. In both, the rate of surplus value is 50%. The rate of profit in industry is then 10%, and this determines the general rate of profit. As the rate of profit in agriculture would be 20%, with the value of agricultural output being 120, that means that there is surplus profit of 10, giving rise to a rent of that amount.
Class
|
Capital
£'s
|
Kilos of corn
|
Total value £'s
|
Market-value per Kilo.
£'s
|
Individual value per Kilo.
£'s
|
I
|
100.00
|
65
|
120.00
|
2.00
|
2.00
|
II
|
100.00
|
65
|
130.00
|
2.00
|
1.846
|
III
|
100.00
|
75
|
150.00
|
2.00
|
1.600
|
Total
|
300.00
|
200
|
400.00
|
Differential value per Kilo.
£'s
|
Price of production per Kilo
£'s
|
Absolute rent
£'s
|
Differential
rent
£'s
|
|
I
|
0
|
1.833
|
10.00
|
5.00
|
II
|
0.154
|
1.462
|
10.00
|
10.00
|
III
|
0.400
|
1.133
|
10.00
|
20.00
|
30.00
|
35.00
|
Absolute Rent in Kilos.
|
Differential rent in Kilos
|
Rental
£'s
|
Rental in Kilos
|
|
I
|
5
|
0
|
10.00
|
5
|
II
|
5
|
5
|
20.00
|
10
|
III
|
5
|
15
|
40.00
|
20
|
15
|
20
|
70.00
|
35
|
Marx assumes that the effect of a fall in the value of constant capital is the same for whatever type of soil is considered. He assumes a 10% reduction in the value of constant capital from £100 to £90.
There are basically three scenarios that might exist. Firstly, the fall in the value of constant capital might result in an equal fall in the value of variable-capital, or the fall in the value of the variable capital might be proportionately greater or smaller, or finally, the value of variable capital may remain constant, but a fall in the value of constant capital releases capital so that more of both are employed.
If the organic composition of capital of 60:40 remains constant, then on a capital of £90 this would equate to £54 c + £36 v. The value of the land type I output (60 kilos) would then be £54 c + £36 v + £18 s = £108. For this to be the case, the same rise in social productivity that reduced the value of constant capital by 10%, would have to reduce the value of wage goods by 10%, leading to a 10% fall in wages. But, if wages fell by more than 10%, so that v falls not to £36, but to £32.40, the laid out capital falls to £86.40. The value of the 60 kilos is then £54 c + £32.40 v + £16.20 s = £102.60. The organic composition of capital here then would be 62.75:37.5.
Finally, the amount laid out for wages could remain the same so that it rises relative to the constant capital, leading to a lower organic composition. If £90 is laid out and £40 is laid out as variable capital, that leaves £50 to be laid out as constant capital. For that to be the case, there also has to be a change in the technical composition of capital, reflecting a fall in agricultural productivity. The original composition would then be 50:40, and the value of output would be £50 c + £40 v + £20 s = £110.
The consequence of this can be seen in the following table.
Capital
|
Absolute
Rent %
|
Absolute
rent £'s
|
Differential
rent £'s
|
Absolute
rent Kilos
|
Differential
rent Kilos
|
Rental
£'s
|
Rental
Kilos
|
A)
60 c+40 v
|
10.00
|
30.00
|
40.00
|
15.00
|
20.00
|
70.00
|
35.00
|
B)
54 c+36 v
(60
c+40 v)
|
10.00
|
27.00
|
36.00
|
15.00
|
20.00
|
63.00
|
35.00
|
C)
54 c + 32.40 v (62.50 c+37.50
v)
|
8.75
|
22.03
|
34.20
|
13.26
|
20.00
|
56.88
|
33.26
|
D)
50c+40v
(55.56 c+44.44 v) |
12.22
|
33.00
|
36.66
|
18.00
|
20.00
|
69.66
|
38.00
|
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