please answer fast with all the steps in a sheet of paper
please answer fast with all the steps in a sheet of paper 1. Process in a...
hope you answer fast. please clear writing. thank you.
Question 2 (25 Points) Consider a system represented by the following differential equation: 3 de o + 13 "%) + 4y(e) = 5 y) +9«ce) a) Determine the system's frequency response, H(jw) b) Determine the system's unit impulse response, h(t) c) Define the difference equation describing the system whose frequency response is Hlem"= (1 - že-jo)(1-Le-jw) (1 – e-fu)
Answer all Please! Thanks
1. Confirming Solutions to Differential Equations: Verify that each function does in fact solve the given differential equation. If there are parameters in the function (A. b. k), give the range of values of those parameters for which that function is a solution. The prime indicates differentiation with respect od dr' (b) y" + 4y = 0; y = A sin(kx + φ). (c) y"-4s, + 4y = 0, y = Axe . (d) x2y', +...
PLEASE ANSWER 2C .PLEASE SHOW ALL STEPS AND WRITE NEATLY
Question 2 Determine the unique solutions of the following differential equations by using the Laplace transforms: a. y" – 4y = 4 t, subject to y(0) = 0 and y'(0) = -1. (7) b. y" – 4y' - 5y = 28(t - 2), subject to y(0)=-1 and y'(0) = 0. (8) C. y" + 2y' – 3y = e-3(1-2)u(t – 2), subject to y(0) = 1 and y'(0) = 1....
- PLEASE ANSWER ALL QUESTIONS!! ALL
QUESTIONS
- PLEASE WRITE WITH GOOD HANDWRITING TO LET ME
UNDERSTAND!
Q3. Consider a causal LTI system whose input and output are related by the following differential equation: dy(t) +4y(t) x(t) dt and the input is x(t) cos(2Tut) sin(4t), find: (a) The transfer function of the system H(ja) (5 m) (5 m) (10 m) (5 m) (b) The impulse response of the system h(t) (c) The output y(t) (d) The power of y(t)
only the ones highlighted and please show all steps.
Finding Area by the Limit Definition In Exercises 47–56, use the limit process to find the area of the region bounded by the graph of the function and the x-axis over the given interval. Sketch the region. 47. y = - 4x + 5, [0, 1] 48. y = 3x - 2. [2,5] 49. y = x2 + 2, [0, 1] 50. y = 5x + 1, [0, 2] 51. y...
Graph the following linear inequalities on the digital graph paper worksheet Problem 10. Show ALL your algebra steps that are required to determine the X and Y intercepts for both equations in the text box. From the MS Excel ribbon > Insert> Shapes> Lines. Y coefficient 4 Line # X coefficient "RHS" 36 48 0 Use the text box for you answer. Solve algebraically, showing ALL steps, for the solution, or "intersection" of 1. Equation 1 and equation 2. 2....
Graph the following linear inequalities on the digital graph paper worksheet Problem 10. Show ALL your algebra steps that are required to determine the X and Y intercepts for both equations in the text box. From the MS Excel ribbon > Insert> Shapes> Lines. Y coefficient 4 Line # X coefficient "RHS" 36 48 0 Use the text box for you answer. Solve algebraically, showing ALL steps, for the solution, or "intersection" of 1. Equation 1 and equation 2. 2....
Please show all the steps, Thank you!
Find yol(t), the zero-input component of the response for an LTIC system described by the following differential equation: (D2 + 6D +9)y(t) (3D+5)r(t) where the initial conditions are yo(0)-3)0(0) -7
Find yol(t), the zero-input component of the response for an LTIC system described by the following differential equation: (D2 + 6D +9)y(t) (3D+5)r(t) where the initial conditions are yo(0)-3)0(0) -7
Please show all work and
steps! Would like to learn how!
Given a second order linear homogeneous differential equation a2(x)y" + a1(x)y' + 20 (x)y = 0 we know that a fundamental set for this ODE consists of a pair linearly independent solutions Yı, Y2. But there are times when only one function, call it Yı, is available and we would like to find a second linearly independent solution. We can find Y2 using the method of reduction of order....
Please answer the questions for Part 1 and Part 2 showing all
steps, using the provided data values.
Many thanks.
M2 2 C2 2' 2 2 C2 2'2 Spring steel Mi k1 C1 2'2 1 C1 Base y(t) Base movement Figure 2 shows a shear building with base motion. This building is modelled as a 2 DOF dynamic system where the variables of ml-3.95 kg, m2- 0.65 kg, kl-1200 N/m, k2- 68 N/m, cl- 0.40 Ns/m, c2- 0.70Ns/m The base...