Week 5 Ethics of Care on Jimbo Marcee and Colby Analysis Please watch this episode of Undercover Boss and do an Ethics of Care analysis on Jimbo, Marcee, and Colby. Specifically point out places when Ethics of Care was followed or violated. Do not generalize. In the last paragraph compare and contrast this analysis with any of the previous three theories (Kantian deontology, utilitarianism, and virtue ethics). Use the vocabulary of Carol Gilligan and the principles found in the texts.
If the above link does not work, try going here: https://www.dailymotion.com/video/x329xfj
There should be a short introduction and conclusion with 4 substantive paragraphs.
Compare and contrasting at least one other theory with Ethics of Care.
You can break from this format a little but do it with intentionality. Make sure you cover at least those four topics I’ve presented.
The paper should be 2 pages long 12pt Times New Roman font, double spaced, and 1 inch margins.
Textbook Chapter 11, 250-269
Video: Sandberg Watch on https://www.youtube.com/watch?v=4WWumJF1dEY
Ethics: A Pluralistic Approach to Moral Theory, 306-333 Download Advance Calculus I Final
Each question carries 20 points.
1. a. Define a compact set in R p .
b. Show directly from the definition (without using Heine-Borel theorem) that the open
ball x, y : x 2
1 is not compact.
K is a closed set, then F is compact
c. Prove that if K is compact in R p , and F
in R p .
2. Let X and Y be sequences in R p , which converge to x and y respectively.
a. Prove that X
Y converges to x
b. Prove that cX converges to cx where c
3. Let X
a. Prove that
b. Prove that
be a bounded sequence in R, and x
lim sup x n .
0, there are at most a finite number of n
N such that
x n , but there are an infinite number such that x
there is a subsequence of X which converges to lim sup X.
a. Define a linear function from R p to R q .
b. Prove that the sum of two linear functions is linear.
c. Prove that if f is a linear function, then there exists A
v for all u, v
0 such that
5. Let f be a function on D f
R p to R and K
D f be compact. If f is
continuous on K, prove that there exists a points x 0 such that
sup f x : x
6. Let f be defined near a and f a exists. Show that
Give an example to show that the existence of the above limit does not imply the
existence of the derivative.
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