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VARVARA [1.3K]
1 year ago
15

The logistic growth function f(t) = 34,000 /(1 + 1132.3e-1.1t) models the number of people who have become ill with a partiafter

its initial outbreak in a particular community. What is the limiting size of the population that becomes ill?
Mathematics
1 answer:
AlekseyPX1 year ago
8 0

Solution

for this case we have the following function:

f(t)=\frac{34000}{1+1132.3e^{-1.1t}}

And we want to find the limiting size of the population, since this is a logistic function the loading or the limiting size needs to be:

34000

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81. a negative times a negative is a positive
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3 years ago
Can anybody help me pleasee I don't understandd
o-na [289]
Hello there.

6(8 - 2y) = 4y

To solve for this, we need to apply the Distributive Property to the left side of the equation. This property allows us to multiply the number outside of the parenthesis by all numbers inside of the parenthesis.

6(8 - 2y)
6(8) + 6(-2y)
48 - 12y

Now, let’s take a look at our equation.

-12y + 48 = 4y

To make things more simple, we’ll add 12y to both sides of the equation. This will cancel out -12y on the left side of the equation and will turn 4y on the right side of the equation into 16y.

Our new equation is:

16y = 48

Now all we need to do is divide both sides by 16 to solve for y.

16y / 16 = y
48 / 16 = 3

Our final answer and solution is:

Y = 3

I hope this helps!
4 0
4 years ago
The boat sailed 30min upstream and sailed 60km, and returned the same distance downstream (60km) and sailed it in 20min. Find th
elena55 [62]

Answer:

Step-by-step explanation:

b and c are the speeds of the boat and current, respectively.

Traveling upstream, the boat moves b-c km per hour.

Traveling downstream, the boat moves b+c km per hour.

b-c = (60 km)/(½ h) = (120 km)/h

b+c = (60 km)/(⅓ h) = (180 km)/h

Adding the equations together,

2b = (300 km)/h

b = (150 km)/h

c = (30 km)/h

7 0
3 years ago
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vichka [17]

Answer:

answer is b

Step-by-step explanation:

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3 years ago
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Answer:

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Step-by-step explanation:

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3 years ago
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