Answer:
(a) The factors are (x + 4), (10 - x) and (x - 70).
(b) There is a break-even for 70 units of the product.
Step-by-step explanation:
(a)
[tex]\Pi(x) = -x^3 + 76x^2 - 380x - 2800 = -(x^3 - 76x^2 + 380x + 2800)[/tex]
Factorizing the term in parentheses,
[tex]x^3 - 76x^2 + 380x+ 2800 = x^3 +4x^2 - 80x^2 - 320x + 700x + 2800\\= x^2(x+4)-80x(x+4)+700(x-4)\\= (x+4)(x^2-80x+700)\\= (x+4)(x^2-10x-70x+700)\\= (x+4)(x(x-10)-70(x-10))\\= (x+4)(x-10)(x-70)[/tex]
Then
[tex]\Pi(x) = -(x+4)(x-10)(x-70) = (x+4)(10-x)(x-70)[/tex]
The factors are (x + 4), (10 - x) and (x - 70).
(b)
Break-even occurs when Π(x) = 0
[tex](x+4)(10-x)(x-70) = 0[/tex]
[tex]x = -4[/tex] or [tex]x = 10[/tex] or [tex]x=70[/tex]
Since x cannot be negative, x = 70.
Hence, there is a break-even for 70 units of the product.
