Consider the FE/CD method for uu with Dirichlet boundary conditions. Can we use the ||Bllo to,ded...
Consider the variable ject to Dirichlet boundary conditions at x = 0 and x = 1, Show that if we solve this problem using the MOL to get Av then A is symmetric and negative definite. Hint Gerschgorin's theorem may be useful for this last part
Consider the variable ject to Dirichlet boundary conditions at x = 0 and x = 1, Show that if we solve this problem using the MOL to get Av then A is symmetric and...
solve problem #1 depending on the given information
Consider the following 1D second order elliptic equation with Dirichlet boundary conditions du(x) (c(x)du ) = f(x) (a $15 b), u(a) = ga, u(b) = gb dr: where u(x) is the unknown function, ga and gb are the Dirichlet boundary values, c(x) is a given coefficient function and f(x) is a given source function. See the theorem 10.1 in the textbook for the existence and uniqueness of the solution. 1.1 Weak Formulation...
can someone explain how can we get
125g?
Eºred= -0.441 V Fe2+ + 2e Cd²+ + 2e Fe cd Eºred= -0.403 V A galvanic cell based on these half-reactions is set up under standard conditions where each solutions is 1.00 L and each electrode weighs exactly 100.0 g. How much will the Cd electrode weigh when the non-standard potential of the cell is 0.03221 V? 125 g Computer's answer now shown above. You are correct. Your receipt no. is 168-935...
Value for transmissivity is 185,location is B,flow rate is
20
Question 1: No-flow boundary conditions are implemented by: Question 2: Flow Calculation with no abstraction or recharge m2/day m/day Condition 1 flow is Condition 2 flow is Question 3: Recharge or abstraction at a node is calculated by: Question 4: Water Level and Flows for Condition 1 are: Water level at pumping/recharge node Flow accross boundary AB Flow accross boundary CD ..,..) is m3/dayFlow accross boundary BC m/dayFlow accross boundary...
Question 2. Boundary conditions (and more on hyperbolic functions). Consider an arch of the type described above, positioned on a horizontal surface. Let us take as our reference point the left base of the arch (where the left side of the arch makes contact with the supporting surface). The right base is 2L metres away from the left base. (o) Sketch this situation and mark on your diagram all nformation b) Write down a boundary condition involving y(0). Also, given...
Please show all work and provide and an original solution.
We can apply the Method of Separation of Variables to obtain a representation for the solution u u(, t) for the following partial differential equation (PDE) on a bounded domain with homogeneous boundary conditions. The PDE model is given by: u(r, 0) 0, (2,0) = 4. u(0,t)0, t 0 t 0 (a) (20 points) Assume that the solution to this PDE model has the form u(x,t) -X (r) T(t). State...
When answering Parts a-h, consider only the molecules and ions,
Fe^2+(aq), Cd(OH)2(s), SO4^2-(aq), Al(s), I^-(aq),
and Cr2O7^2-(aq), under standard state conditions. (1 pt each)
Use standard reduction table.
a) Which of these molecules and ions are oxidizing agents?
b) Which of these molecules and ions are reducing agents?
c) List the oxidizing agents from part a in DECREASING order of
oxidizing agent strength. (strongest OA to weakest OA)
d) List the reducing agents from part b in DECREASING order of...
Consider the following problem. a) Is this a convex programming problem? Answer yes or no, and then justify your answer. b) Can the modified simplex method be used to solve this problem? Answer yes or no, and then justify your answer c) Can the Frank-Wolfe algorithm be used to solve this problem? Answer yes or no, and then justify your answer d) What are the KKT conditions for this problem? Use these conditions to determine whether can be optimal. T20...
Exercise: Can we use the same communication system in case of transmitting signals across an optical, radio, satellite, or underwater channels? Explain and justify your answer.
Abstract Algebra; Please write
nice and clear.
If we wanted to use the definition of isomorphism to prove that Z is not isomorphic to Q, we would have to show that there does not exist an isomorphism p : Z Q. In other words, we would have to show that every function that we could possibly define from Z to Qwould violate at least one of the conditions that define isomorphisms. To show this directly seems daunting, if not impossible....