Answer:
EQUATION: [tex]x^2-16x+48=0[/tex]
METHOD: Factorization.
The sellings prices are:
$4
$12
Step-by-step explanation:
You need to find the selling price or prices that would generate $50 in daily profit, then you need to substityte[tex]y=50[/tex] into the quadratic function:
[tex]50=-10x^2+160x-430[/tex]
Make the equation equal to zero:
[tex]-10x^2+160x-430-50=0\\-10x^2+160x-480=0[/tex]
Simplify by dividing by -10, then you obtain the equation:
[tex]x^2-16x+48=0[/tex]
You can solve it with Factorization.
Choose two numbers whose sum is -16 and whose product is 48.
These would by -12 and -4.
Then:
[tex](x-12)(x-4)=0\\x_1=12\\x_2=4[/tex]
