Explanation:
In this case, I would make a prudent decision. Being in the school team has been my wish and i have tried for it for year and now when i came to know that i am in, I should not miss the chance of being the part of it just because of being in the cheer leading band. Being in the football team is far better than being in the cheer leading band, and also if it is my dream for years. Doing trips with the cheer leading bands and going on Disney trip with them next year is no doubt a fascinating thing, but I will have to make a decision that will affect my upcoming years, and may be I won't be able to get another chance of being in the high school team next time. So I should grab this chance and join the team
The correct answer to this question is that you have $1,000 available to spend in your account today, and will have a total of $3,000 to spend in six days.
Uncollected funds is money that you have deposited into your account, but that you cannot access yet. The bank has placed a hold on the money for a specific period of time. This is normally done when you deposit a check, because your bank wants to make sure that the money from the check clears the other account before you withdraw it.
Answer:
the nominal interest rate is 7%
Explanation:
The calculation of the nominal interest rate is given below:
As we know that
Nominal interest rate is
= Real interest rate + Inflation rate
So,
The nominal interest rate should be
= 5% + 2%
= 7%
Hence, the nominal interest rate is 7%
The same is to be considered and relevant
Answer:
Answer for the question:
Consider the following five constraints x1 + 2x2 ≤ 3, x1 − x2 ≥ 0, 2x1 + x2 ≤ 3, x1 + 5x2 ≤ 6, x1 − 2x2 ≥ −1. (a) Sketch the feasible region and find the degenerate vertex x0. (b) How many possible working sets are there at x0? (c) Suppose that we wish to minimize x1 + x2 subject to these constraints, starting at x0 and using the simplex method. Find a working set A0 for which the Lagrange multiplier vector λ (the solution of AT 0 λ = c) contains at least one negative component λs, but the simplex search direction satisfying A0p = es is not a feasible descent direction. Draw a picture showing p emanating from x0. What are the blocking constraints? (d) Under the same conditions as in part (c), find a working set A¯ 0 for which the Lagrange multiplier vector contains at least one negative component, but the associated search direction ¯p is a feasible descent direction. Draw a picture showing ¯p emanating from x0. (e) Can you find a feasible descent direction at x0 if we wish instead to minimize −x1 − x2? Explain your answer.
is given in the attachment.
Explanation:
