Answer:
$240,000 drop in profits.
Explanation:
The company's variable cost per unit is:
[tex]VC = \frac{720,000}{80,000} =\$9/unit[/tex]
Initially, with a sales volume of n = 80,000 units at $30 each, the company's profit was:
[tex]P_1=(price -VC)*n-FC\\P_1 = (\$30-\$9)*80,000-\$810,000\\P_1=\$870,000[/tex]
After price drops to $24 per unit, and sales increase by 20%, the profit is:
[tex]P_2=(price -VC)*n_1*1.2-FC\\P_2 = (\$24-\$9)*80,000*1.2-\$810,000\\P_2=\$630,000[/tex]
The change in profit is:
[tex]\Delta P = P_2-P_1\\\Delta P =\$870,000-\$630,000\\\Delta P =\$240,000[/tex]
The company will experience a $240,000 drop in profits.
