Answer:
Zeros: 5, multiplicity 1; -4 multiplicity 2; degree 3
y=1(x-5)^1(x+4)^2
y=(x+4)^2(x-5)
y=(x^2+8x+16)(x-5)
y=x^3+8x^2+16x-5x^2-40x-85
y=x^3+3x^2-24x-85
Step-by-step explanation:
The measurment you would use to find volume of a cup is the metric system
3170*.30= 951
The original cost is 3170+951
$4121
<span>Expression for h is h = 500/(pi * r) - r
Range of values for r = (0, 10sqrt(5/pi)]
First, let's substitute the maximum area of the greenhouse into the provided equation.
500 = pi * r * h + pi * r^2
Now solve for h
500 = pi * r * h + pi * r^2
500 - pi * r^2 = pi * r * h
(500 - pi * r^2) / pi * r = h
500/(pi * r) - r = h
The minimum value for r is just above 0, since at 0, you're attempting to divide by 0.
The maximum value for r is where h = 0, so let's substitute 0 for h and solve for r, giving
500/(pi * r) - r = h
500/(pi * r) - r = 0
500/(pi * r) = r
500 = pi * r^2
500/pi = r^2
sqrt(500/pi) = r
10sqrt(5/pi) = r
So maximum r is approximately 12.616 ft.
The range of values for r is (0, 10sqrt(5/pi)]
e.g. You're not allowed to quite reach the lower limit since that would attempt to divide by 0, but you're allowed to go all the way to the upper limit.</span>
Answer:
Sally probably missed moving the 10 of the ones place
Step-by-step explanation:
1
5 3 3
2 5 7
---------
7 9 0
