The detail you need to add to your next slide should address the issue of questions from the audience.
<h3>What is a Presentation?</h3>
This refers to the use of diagrams, charts, and tables to present an idea to an audience.
Hence, we can see that The detail you need to add to your next slide should address the issue of questions from the audience.
This is because you are being proactive by adding a slide of potential questions from the audience.
Read more about presentations here:
brainly.com/question/24653274
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Answer:
Final Value= $43,871.84
Explanation:
Giving the following information:
Suppose you invest $2500 each year in a savings account that earns 12% per year.
Number of years= 10
To calculate the final value we need to use the following formula:
FV= {A*[(1+i)^n-1]}/i
A= annual deposit= 2,500
i= 0.12
n=10
FV= {2,500*[(1.12^10)-1]}/0.12= $43,871.84
<span>The "principal-agent problem" is when one person can make a decision on behalf of someone else that impacts the "principal". The agent works to favor the interests of the principal and receives incentives for doing so in return. The agent can get into a conflict of interest or make morally wrong decisions in favor of the principal they are helping. </span>
Answer: $3,580.30 (converted to 2decimal places).
Antwone need to deposit " $3,580.30008” into the account each semi-annual period in order to take his vacation in 2 years
Explanation:
By using compound interest formula below to solve the question
A = p ( 1 + r/n)^nt
A = amount (future value)= $3,800
P = principal (present value) ?
r = annual nominal rate = 3%= 0.03
n = today number of compounding years = semiannually (2 interest payments period in a year) = 2
t = time in years =2
3,800 = p ( 1 + 0.03/2)^2(2)
3,800 = p ( 1 + 0.015 )^4
3,800 = p ( 1.015 ) ^4
3,800 = 1.06136355 p
divide both sides by 1.06136355
p = 3,800 / 1.06136355
p = $3,580.30008
≈$3,580.30 ( rounded off to 2d.p)
Hey There!:
Sample Mean = 4.4823
SD = 0.1859
Sample Size (n) = 7
Standard Error (SE) = SD/root(n) = 0.0703
alpha (a) = 1-0.99 = 0.01
t(a/2, n-1 ) = 3.7074
Margin of Error (ME) = t(a/2,n-1)x SE = 0.2606
99% confidence interval is given by:
Sample Mean +/- (Margin of Error)
4.4823 +/- 0.2606 = (4.222 , 4.743)
Hope this helps!