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Dexter is a serial killer, who hunts and kills his victims without remorse or any other feelings at all, which is characteristic of _____________ aggression that involves lower-than-normal levels of _____________ . ? instrumental / cortisol ? impulsive / serotonin ? instrumental / serotonin ? impulsive / cortisol

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Q9-) The following measurements are from an experiment. F(N) is force which is acting on an object, and a((m)/(s^(2))) is the acceleration of this object. Answer the questions about given graphics. a) Which quantity should be on x-axis? Write on the graphics. b) Which quantity should be on y-axis? Write on the graphics. c) A=3=> what is the SI unit and dimension of A ? d) B=5=> what is the SI unit and dimension of B ? e) If a=5(m)/(s^(2)) what will be F at this point? Q9-) The following measurements are from an experiment. F (N) is force which is acting on an object, and a (m/s) is the acceleration of this object. Answer the questions about given graphics. a) Which quantity should be on x-axis? Write on the graphics 302 b) Which quantity should be on y-axis? Write on the graphics 252 y=3e5x R2=1 c) A=3=what is the SI unit and dimension of A? 202 dB=5=>what is the SI unit and dimension of B e) If a=5m/swhat will be F at this point? 152 102 a(m/s2) 0 0,1 0,2 0,3 0,4 0,5 0,6 0,7 0,8 0,9 F(N) 3 4,946164 8,154845 13,44507 22,16717 36,54748 60,25661 99,34636 163,7945 270,0514 52 2 0 0,5 1

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Plato does not think that reason is different in kind from the body or that the soul is immortal, which is why he has Socrates say as much. Group of answer choices True False

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1. Use the power-series method to solve the first-order differential equation: y'(x) - cy(x) = 0, where c is a constant parameter. Look for the general solution in the form $\infty$ y(x) = \sum_{n=0} a_n x^n and obtain a recursion relation for the coefficients $a_n$ (it will be a one-term relation in this case, i.e., no separation into even and odd coefficients). Treat the $a_0$ coefficient as an arbitrary constant ($a_0 = A$) and use the recursion relation to express all other coefficients $a_n$ in terms of A. Derive a concise expression for $a_n$, substitute it into the power series, and express the solution in a simple functional form. Hint: $\sum_{n=0}^{\infty} \frac{q^n}{n!} = e^q$. Evaluate the constant A using the boundary condition y = e at x = 2/c. 2. For a 1D harmonic oscillator with a force constant k and frequency ? in its ground state, determine a. $\langle x \rangle$ b. $\langle x^2 \rangle$ c. $\langle p_x \rangle$ d. $\langle p_x^2 \rangle$ e. Use the results from (a) - (d) to evaluate ?x?$p_x$, where ?x and ?$p_x$ are the standard deviations of the position x and linear momentum $p_x$. f. Compare the result in (e) to the Heisenberg uncertainty principle ?x?$p_x \ge \hbar$. 3. For the ground state of the 1D harmonic oscillator, find the average value of the kinetic energy $\langle T \rangle$. Express the result in terms of the zero-point energy $E_0$. Hint: you can use one of the results from problem 2.

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2.2 Count number of unique addresses Input format: This program takes a le name as argument from the command line. The le can have from a few lines to millions of lines. Each line contains an address in hexadecimal format, i.e. 0x7f1a91026b00, generated by pintool (http://pintool.org). Each address is represented as a 64-bit hexadecimal number. Output format: Your program should print the number of unique addresses in the le. There should be no leading or trailing white spaces in the output. Your program should print \error" (and nothing else) if the le does not exist. Example Execution: Lets assume we have 3 text les with the following contents. \le1.txt" is empty and, le2.txt: 0x7f1a9804ae19 0x7f1a9804ae1c 0x7f1a9804ae1c 0x7f1a9804ae1c le3.bxt: 0x7f1a9804ae19 0x7f1a9804ae1c 0x7f1a9804ae1c 0x7f1a9804ae19 0x7f1a9804ae16 0x7f1a9814ae1c /count le 1.txt 0 /count le2.txt 2 /count le3.txt 4 /third le4.txt error 2.3 Scalability In this assignment, we will test your program with millions of lines of addresses. You can initialize the hash table with 1000 entries. The largest test case contains 5 million lines with about 15,000 unique addresses. In this case, the average number of nodes in each linked list is 15. 2

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L* 10. If the demand function of a good is P = 100 - \frac{4}{Q} a- what is the total revenue equation (TR) b- what are Q and P that maximize TR. c- verify your answer using second derivative rule

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Question 3 of 3 View Policies Current Attempt in Progress Calculate the support reactions at A and B for the beam subjected to the two linearly distributed loads. The reactions are positive if upward, negative if downward. 5.6 kN/m 0.7 m 3.8 kN/m 3.8 kN/m B 1.9 m 4.1 m 2.2 m Answers R<sub>A</sub> = KN R<sub>B</sub> = KN 5.6 kN/m

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The Federal Reserve System was a compromise between competing proposals for a huge central bank and no central bank at all. The current Federal Reserve System has how many district (or regional) banks? ? 8 ? 10 ? 12 ? 14

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(i) Using examples, illustrate the need for supporting both immediate revocation of rights and delayed revocation of rights features. (ii) Using examples, illustrate the need for supporting both temporary revocation of rights and permanent revocation of rights features. (iii) State two protection features of MULTICS that distinguish it from Unix.

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Consider a two-person (Person A and Person B), two-good economy (X and Y). The consumers’ utility functions are given by and their initial endowments are given by () = (4, 2) and () = (4, 3). Find the equation for the contract curve. Your answer should be as a function of .

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encarnacion g.