Suppose the function ƒ(t) = et describes the growth of a colony of bacteria, where t is hours. Find the number of bacteria prese nt at 5 hours. Question 19 options: A) 8.155 B) 79.432 C) 148.413 D) 59.598
1 answer:
Answer:
C) 148.413
Step-by-step explanation:
ƒ(t) = et
Where ƒ(t) = number of bacterials present at a particular time t.
So let's determine the number of bacterial present at 5 hours
ƒ(t) = et
ƒ(5) = e(5)
ƒ(5) = 148.413
Approximately= 148 in whole numbers.
So the number of bacterial present at 5 hours is approximately 148 bacterial.
Let's remember we solved it from the equation ƒ(t) = et .
Thank you
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Answer:
missing element is 6
Step-by-step explanation:
Given
f(x) = x³ - 2 ( substitute x = 2 )
f(2) = 2³ - 2 = 8 - 2 = 6 ← missing element
ordered pair is (2, 6 )
Local Max: x=3
<span>Let’s say we have a starting point (0,0), the point (4,3) are distance apart at 90 degrees, hence the hypotenuse to those two distance will be 5.
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Answer:
0
Step-by-step explanation:
3ab + 5b - 6 when a = -1 and b is 3
→ First substitute a and b into 3ab
3 × -1 × 3 = -9
→ Substitute b into 5b
5 × 3 = 15
→ Connect all the terms together
-9 + 15 - 6
→ Simplify
0
