If $ 1 had been placed in a bank account in the year 1066 and forgotten until now, how much would be in the account at the end of 2026 if the money earned 2 % interest compounded annually? 2 % simple interest? (Now you can see the power of compounding and why inactive accounts are closed after a relatively short period of time.)
If $ 1 had been placed in a bank account in the year 1066 and forgotten until now, how much would be in the account at the end of 2026 if the money earned 2 % interest compounded annually? 2 % simple interest? (Now you can see the power of compounding and why inactive accounts are closed after a relatively short period of time.)
Solution Summary: The author calculates the amount of money in a bank account in the year 2026, when 1 was deposited in it in 1996, and the number of compounding periods per year.
If
$
1
had been placed in a bank account in the year
1066
and forgotten until now, how much would be in the account at the end of
2026
if the money earned
2
%
interest compounded annually?
2
%
simple interest? (Now you can see the power of compounding and why inactive accounts are closed after a relatively short period of time.)
12:25 AM Sun Dec 22
uestion 6- Week 8: QuX
Assume that a company X +
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Week 8: Quiz i
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Assume that a company is considering purchasing a machine for $50,000 that will have a five-year useful life and a $5,000 salvage value. The
machine will lower operating costs by $17,000 per year. The company's required rate of return is 15%. The net present value of this investment
is closest to:
Click here to view Exhibit 12B-1 and Exhibit 12B-2, to determine the appropriate discount factor(s) using the tables provided.
00:33:45
Multiple Choice
О
$6,984.
$11,859.
$22,919.
○ $9,469,
Mc
Graw
Hill
2
100-
No chatgpt pls will upvote
7. [10 marks]
Let G
=
(V,E) be a 3-connected graph. We prove that for every x, y, z Є V, there is a
cycle in G on which x, y, and z all lie.
(a) First prove that there are two internally disjoint xy-paths Po and P₁.
(b) If z is on either Po or P₁, then combining Po and P₁ produces a cycle on which
x, y, and z all lie. So assume that z is not on Po and not on P₁. Now prove that
there are three paths Qo, Q1, and Q2 such that:
⚫each Qi starts at z;
• each Qi ends at a vertex w; that is on Po or on P₁, where wo, w₁, and w₂ are
distinct;
the paths Qo, Q1, Q2 are disjoint from each other (except at the start vertex
2) and are disjoint from the paths Po and P₁ (except at the end vertices wo,
W1, and w₂).
(c) Use paths Po, P₁, Qo, Q1, and Q2 to prove that there is a cycle on which x, y, and
z all lie. (To do this, notice that two of the w; must be on the same Pj.)
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, subject and related others by exploring similar questions and additional content below.
Compound Interest Formula Explained, Investment, Monthly & Continuously, Word Problems, Algebra; Author: The Organic Chemistry Tutor;https://www.youtube.com/watch?v=P182Abv3fOk;License: Standard YouTube License, CC-BY
Applications of Algebra (Digit, Age, Work, Clock, Mixture and Rate Problems); Author: EngineerProf PH;https://www.youtube.com/watch?v=Y8aJ_wYCS2g;License: Standard YouTube License, CC-BY