Questions asked
Because they don’t accept deposits from individuals or provide traditional banking services, _____ are characterized as nondepository institutions. Group of answer choices finance companies commercial banks mutual fund companies savings banks
U3P4 For the figure to the right determine the tensions $T_1$ and $T_2$ when $\theta_1 = 28^\circ$ $\theta_2 = 145^\circ$ and W is 250 N.
5. (a) Write the quadratic form $f(x, y, z) = x^2 + 4xy + 2xz + 3y^2 + 4yz + z^2$ as a sum of squares. Show all your work. (b) Describe, in words, the set of points satisfying $f(x, y, z) = 1$ for $f$ described in the first part. Justify.
What would a counselor have to consider when looking for group counseling for a Veteran which with SUD and criminal record
A town’s population has been growing linearly. In 2009, the population was 52,000 and the population has been growing by 800 people each year. At this rate, in what year will the population reach 74,200? Be sure to round to the nearest whole year.
Question 3 20 pts While the alternator is complicated, there is a much simpler version of the same device, sometimes called a pick-up coil. For a simulation of a pick-up coil, activate the simulation after clicking on the third link listed in the assignment: Faraday's Law PhET Simulation. Move the magnet around and notice current flow in the coils. What happens when the magnet is moved into or out of the coil?
Harry Harlow's experiments with baby monkeys provides positive evidence for what: a. The behaviorist account of parenting b. That nurture has a stronger influence on early development than nature c. That social experience and emotional bonding with caregivers is critical for typical development d. B & C e. A & C
Chapter 3, Supplemental Problem 3/34: A smooth homogeneous sphere of mass m and radius r is suspended by a wire A of length 1.8r from a point on the line of intersection of the two smooth vertical walls at right angles to one another. Determine the reaction R of each wall against the sphere. Answer: R = the tolerance is +/- 2%.
(1 point) Find an equation of the tangent plane to the parametric surface \begin{equation*} r(s, t) = 4s \cos(t) \mathbf{i} + 3s \sin(t) \mathbf{j} + 3t \mathbf{k} \end{equation*} at when $s = 3$ and $t = \frac{2\pi}{3}$. \begin{equation*} z = \end{equation*}
BOSE-EINSTEIN CONDENSATION Prove that the derivative of the function $g_{3/2}(z)$, given by Eq. (12.43) in Huang's book, diverges at $z = 1$. Given that the fugacity $z$ as a function of temperature and specific volume is given by $\frac{1}{v} = \frac{1}{\lambda^3} g_{3/2}(z) + \frac{1}{V} \frac{z}{1 - z}$ And general class of functions $g_n$ is given by $g_n(z) = \sum_{l=1}^{\infty} \frac{z^l}{l^n}$ For comparison we recall that $0 \le z < \infty$ in the case of Fermi statistics. For small $z$, the power series (12.42) furnishes a practical way to calculate $g_{3/2}(z)$: $g_{3/2}(z) = z + \frac{z^2}{2^{3/2}} + \frac{z^3}{3^{3/2}} + ...$ (12.43) At $z = 1$ its derivative diverges, but its value is finite: $g_{3/2}(1) = \sum_{l=1}^{\infty} \frac{1}{l^{3/2}} = \zeta(\frac{3}{2}) = 2.612...$ (12.44) where $\zeta(x)$ is the Riemann zeta function of $x$. Thus for all $z$ between 0 and 1, $g_{3/2}(z) \le 2.612...$ (12.45)
