Numerade

Questions asked

BEST MATCH

The following items may appear on a bank statement 1.NSF check 2. EFT deposit. 3. Service charge.4. Bank correction of an error from a $300 deposit of $30.

View Answer

BEST MATCH

The figure below shows the stress-strain curve for a biomaterial at different grain diameters (1-7). A) Plot the Hall-Petch relation (8 marks) 0 h, 720 nm 1 0.5 h, 350 nm 2 2 h, 118 nm 3 5 h, 51 nm 4 10 h, 32 nm 5 20 h, 27 nm 6 30 h, 22 nm 7 $K_y = 0.5$ $\sigma_{Y_1} = \frac{2210}{6}$ $\sigma_{Y_2} = \frac{230}{6}$ $\sigma_{Y_3} = \frac{380}{6}$ $\sigma_{Y_4} = \frac{596}{6}$ $\sigma_{Y_5} = \frac{700}{6}$ $\sigma_{Y_6} = \frac{750}{6}$ $\sigma_{Y_7} = \frac{780}{6}$ $d = \text{average grain diameter}$ B) Calculate the yield strength of this biomaterial when the grain diameter is 75nm (4marks) $E = \frac{\sigma}{\epsilon}$ $\sigma = \frac{F}{A}$ $\epsilon = \frac{L - L_0}{L_0}$

View Answer

BEST MATCH

does Small change of the velocity vector occurs in the direction of the acceleration vector?

View Answer

BEST MATCH

Two bonds, each with a face value of $16000, are redeemable at par in n-years and priced to yield $j_{12} = 9.6\%$. Bond 1 has a coupon rate $j_{12} = 20.4\%$ and sells for $24783.04. Bond 2 has coupon rate $j_{12} = 12\%$ and sells for $P$. What is the value of $P$?

View Answer

BEST MATCH

According to the Committee for the Future of Nursing 2020-2030 report, the vision of the initiative is the achievement of health equity in the U.S. built on strengthened nursing capacity and expertise as outlined in the 10 nursing outcomes found in Box S-1 of the report. Identify one outcome and describe how you believe the nursing program and your clinical experience at Nightingale College will prepare you to contribute to that outcome. Additionally, the Future of Nursing report categorizes social determinants of health (SDoH): Economic Stability, Education, Social and Community Context, Health, and Healthcare, and Neighborhood and Built Environment. Please review the information in the FON report for SDoH and discuss how you will be prepared, as a nurse, to address those healthcare needs. Describe how you will use your education and skills to promote the achievement of health equity.

View Answer

BEST MATCH

Draw a utility curve on a budget constraint between level of health and home good. Show the range that a person can choose his/her optimal level of H and Z. Write the equation and explain the function.

View Answer

BEST MATCH

tion 12 Which of the following structures represent 4-ethyl-2-methyl-4-propyloctane? answered d out of 1.20 O a. question O b. O c.

View Answer

BEST MATCH

#7 (4 pts.) For a conductor $J = axa_x - ya_y - za_z \text{ A/m}^2$, finds $a$ if the volume charge density is time-invariant.

View Answer

BEST MATCH

5) In the previous question, assume Bill returns to work but can only work part-time until he recovers completely. If he earns $1800 monthly, what is the amount, if any, that Jeff can collect under his policy A) He can receive a prorated disability benefit, or $750 monthly B) He can receive a prorated disability benefit, or $900 monthly C) He can receive a prorated disability benefit, or $1500 monthly D) He can receive a $0 prorated disability benefit

View Answer

BEST MATCH

11. Let \{B(t), t \ge 0\} be a standard Brownian motion. Let $t > 0$ and let $M_t = \sup_{0 \le s \le t} B(s)$ be the maximum process over t. Find: (a) $Pr(M_4 \le 5)$. (b) The density of $M_4$ (c) The median of $M_4$. (d) The first and the third quartile of $M_4$. (e) The mean and variance of $M_4$ 12. Let \{B(t), t \ge 0\} be a standard Brownian motion. Let $T_a$ be the first time that the Brownian motion hits a. Find the following: (a) $Pr(T_2 \le 4)$. (b) The density of $T_2$ (c) The median of $T_2$. (d) $Pr(2 \le T_{-3} \le 5)$. (e) The first and the third quartile of $T_{-3}$. 13. Show how to use the Euler-Maruyama method to simulate geometric Brownian motion started at $G_0 = 10$, with $\mu = 1$ and $\sigma = 1/3$. Simulate the mean and the variance of $G_3$. Compare with the theoretical mean $E(G_t) = G_0 e^{t(\mu + \sigma^2/2)}$ and variance $Var(G_t) = G_0^2 e^{2t(\mu + \sigma^2/2)}(e^{t\sigma^2} - 1)$.

View Answer

michael h.