In this question, it is given that
A certain bacteria culture grows at a rate of 18% everyday. There are currently 420 bacteria.
And we have to find number of bacterias on day *.
For that we use the following formula
![N(t) =N_{0} (1 +r)^t](https://tex.z-dn.net/?f=N%28t%29%20%3DN_%7B0%7D%20%281%20%2Br%29%5Et)
![N(0)= 420, r = 0.18 , and \ t = 8days](https://tex.z-dn.net/?f=N%280%29%3D%20420%2C%20r%20%3D%200.18%20%2C%20and%20%5C%20t%20%3D%208days)
Substituting these values in the formula, we will get
![N(8)= 420(1+0.18)^8 \\ N(8)=1579](https://tex.z-dn.net/?f=N%288%29%3D%20420%281%2B0.18%29%5E8%0A%5C%5C%0AN%288%29%3D1579)
THerefore on day 8, number of bacterias are 1579.
Answer:
1. 62
2. 13
3. 6
4. 18
5. 3
Step-by-step explanation:
1. Let's use pemdas
16*1/2= 8
32 / 4 * 8 - 2
8*8 - 2
64 - 2
= 62
2. Let's use pemdas
5*2/5 = 2
20 / 2 + 3
10 +3
= 13
3. Let's use pemdas
1/2 * 24 / 3 +2
12 / 3 +2
4 +2
=6
4. Let's use pemdas
2 * (6 / 2 + 8) -4
2 * 11 - 4
22 - 4
= 18
5. Let's use pemdas
(28 / 7 +6 / 3) * 1/2
( 4 + 2) *1/2
6 *1/2
= 3
Answer:
0.9811
Step-by-step explanation:
Hartman Motors' data:
Debt (D) = $6 million
Equity (E) = $12 million
Tax rate (T) = 0.35
Levered beta (βL) = 1.3
According to the Hamada equation:
![\beta_L =\beta_U[1+(1-T)\frac{D}{E}]](https://tex.z-dn.net/?f=%5Cbeta_L%20%3D%5Cbeta_U%5B1%2B%281-T%29%5Cfrac%7BD%7D%7BE%7D%5D)
Applying the given data:
![1.3 =\beta_U[1+(1-0.35)\frac{6}{12}]\\\beta_U=0.9811](https://tex.z-dn.net/?f=1.3%20%3D%5Cbeta_U%5B1%2B%281-0.35%29%5Cfrac%7B6%7D%7B12%7D%5D%5C%5C%5Cbeta_U%3D0.9811)
Hartman’s unlevered beta is 0.9811.
Answer: 12m
Step-by-step explanation:
Each member sells 12 tickets, so you would have to multiply the amount of tickets(12) by the amount of members(m).
<em>Answer:</em>
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<em>This " / " means or, btw!</em>
<em>Step-by-step explanation:</em>
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<em>⇒Take square root.</em>
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<em> ± </em>
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<em> or </em>
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<em>Hope this helped you!</em>