Answer:
The increase in cost is $81620.
Step-by-step explanation:
Given:
The marginal cost of producing 'x' units of a certain product is given as:
[tex]C= 72+1.1x-0.007x^2 + 0.00004x^3[/tex]
Where, 'C' is the marginal cost.
Now, when [tex]x=1800\ units[/tex], the marginal cost is given as:
[tex]C_1=72+1.1(1800)-0.007(1800)^2+0.00004(1800)^3\\\\C_1=72+1980-22680+233280\\\\C_1=\$212652[/tex]
Again, when [tex]x=2000\ units[/tex], the marginal cost is given as:
[tex]C_2=72+1.1(2000)-0.007(2000)^2+0.00004(2000)^3\\\\C_2=72+2200-28000+320000\\\\C_2=\$294272[/tex]
Now, increase in cost is equal to the difference of the above two costs calculated. Therefore,
[tex]\Delta C= C_2-C_1=\$294272-\$212652=\$81620[/tex]
Therefore, the increase in cost is $81620.
