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Please answer parts E-H and show work/solution ANSWER E-H E F G H ANSWER PARTS E, F, G, AND H........ 8. We have two "named" equations which allow us to quantify the pressure- temperature relationship of a two-phase equilibrium, the Clausius equation, A, and the Clausius-Clapeyron equation, B din P ΔΗ dP AS A: dT RT2 The Clausius equation is an exact result for a one-component system, derived with no approximations, while the Clausius-Clapeyron equation has some constraints. We will...
Answer: Please help! Electrical series circuits never make sence to me. I included the answer so that you can check your work. Hope that helps. 19. An electrical series circuit contains a resistor with a resistance of R- 20 ohms, a capacitor with a capacitance of C 0.01 farads, and an inductor with an inductance of L 1 henry. The initial current in the circuit is 0 amperes. A variable voltage of E(t) 120 sin volts of is applied to...
need help with e f and g please 2x2 + x3 0 (1 pts) write the linear system in the format, A x = b (2 pts) Find the determinant of the matrix A by using an expansion along row 1 (2 pts) Find the determinant of the matrix A by using an expansion along column 2 Compare the result with that of (b). Based on your result of b and/or c is matrix A singular or invertible (2 pts)...
Please answer parts A-D and show work/solution For A and D DONT INTEGRATE For B and C INTEGRATE ANSWER A-D A B C D ANSWER PARTS A, B, C, AND D......... 8. We have two "named" equations which allow us to quantify the pressure- temperature relationship of a two-phase equilibrium, the Clausius equation, A, and the Clausius-Clapeyron equation, B din P ΔΗ dP AS A: dT RT2 The Clausius equation is an exact result for a one-component system, derived with...
e) From the vector equation in part d, we get this system of linear equations (I changed the variables from ci, c2, and cs to x, y, z so they are easier to use in Geogebra and more familiar): x+3y+z e 0 Originally we solved e 0. Try picking 4 different sets of values for 0 e and using Row Reduction to solve the system of equations. This is good practice. Here is a calculator where you can check your...
Discretization, ODE solving, condition number. Consider the differential equation 5y"(x) - 2y'(x) +10y(x)0 on the interval x E [0,10] with boundary conditions y(0)2 and y (10) 3 we set up a finite difference scheme as follows. Divide [0,10] into N-10 sub-intervals, i.e. {xo, X1, [0,1,. 10. Denote xi Xo + ih (here, h- 1) and yi E y(x). Approximate the derivatives as follows X10- 2h we have the following equations representing the ODE at each point Xi ,i = 1,...
I need help with Part A through Part E. The help is greatly appreciated! Electric potential of a non-uniformly charged rod 10 points] A non-uniformly charged rod with length L = 10 cm has a charge de = to where (o=1pC/cm) and is centered on the origin of your Sed rod with length L = 10 cm has a charge density and is centered on the origin of your coordinate system as shown below. The point Pis located on the...
I dont know how to incorporate the frequency from the start. I need help!!! Please let me know what to do 1 - One engineer is studying a specific mathematical modeling for one of his projects and came up with the following system of differential equations: But the system above does not produce an oscillatory behavior as he expected. (a) Solve the system (1) to make sure the engineer did not make any mistake. (b) After realizing the system did...
Need help with number 3 the last one Need help with number 3 I have already given the whole question MATH 1030 – Application Assignment 3 Cryptography Due: Thursday, June 4, 2020 at 11:59pm Atlantic time (submit through Brightspace) You must show your work for full marks. The goal of this assignment is to use our knowledge of linear algebra to do cryptography. We will encrypt a plaintext using a cipher where the resulting ciphertext should not be legible unless...
2. Consider a mass m moving in R3 without friction. It is fasten tightly at one end of a string with length 1 and can swing in any direction. In fact, it moves on a sphere, a subspace of R3 1 0 φ g 2.1 Use the spherical coordinates (1,0,) to derive the Lagrangian L(0,0,0,0) = T-U, namely the difference of kinetic energy T and potential energy U. (Note r = 1 is fixed.) 2.2 Calculate the Euler-Lagrange equations, namely...