Answer: The answer is -90
Answer:
The above function will get the minimum value at the value of p =14 ....
Step-by-step explanation:
Take the derivative of the given function with p and equate to zero to minimize the given function.
c(p) = p^2 - 28p + 250
(d/dp) c(p) = (d/dp)p^2 - 28p + 250 = 2p-28
(d/dp) c(p) = 0
2p-28 = 0
Move the constant to the R.H.S
2p = 28
Divide both sides by 2
2p/2 = 28/2
p = 14
The above function will get the minimum value at the value of p =14 ....
You put both parentheses in standard form, then divide as if it were a normal problem. Once the quotient is found, move the decimal point to the right. Every time you move one space to the left, increase the exponent by one but also divide your quotient by 10
example:
10³/10²
1000/100
10
10=
30f+24g-6 because you distribute
Answer:
The correct choice would be greater than or equal to 82
Step-by-step explanation:
If tickets are sold for 4 dollars and 82 tickets are sold than you have 328 dollars 328 plus the 72 from the bake sale is 400 equal you also must take into account that more people might buy tickets but the bare minimum would be 82 so greater than or equal to is the correct choice
