1. Find the transfer function of the following differential equations, were ?(?) is the input to...

The input, Vin, is single-ended not differential. Design an analog circuit with a transfer function of...

The input, Vin, is single-ended not differential. Design an analog circuit with a transfer function of Vout = 50 ⋅ Vin − 5 using one rail-to-rail op amp powered by a single +5 V supply. You may use one REF03 2.50 V reference chip. The input range is 0.1 to 0.2 V, and the output range is 0 to +5 V.

Consider the following second-order differential equation: ?"(?)−?′(?)−6?(?)=?(?) (1) Let ?(?)=−12e^t. Find the general solution to the...

Consider the following second-order differential equation: ?"(?)−?′(?)−6?(?)=?(?) (1) Let ?(?)=−12e^t. Find the general solution to the above equation. (2) Let ?(?)=−12. a) Convert the above second-order differential equation into a system of first-order differential equations. b) For your system of first-order differential equations in part a), find the characteristic equation, eigenvalues and their associated eigenvectors. c) Find the equilibrium for your system of first-order differential equations. Draw a phase diagram to illustrate the stability property of the equilibrium.

Differential Equations ?'''' − ?''' − ?'′ − ? ′ − 2? = 8?^5 Find ??...

Differential Equations ?'''' − ?''' − ?'′ − ? ′ − 2? = 8?^5 Find ?? by solving the associated homogeneous equation. a. Find the characteristic polynomial. b. Find the possible rational roots by using the Rational Roots Theorem. c. Find all roots of the characteristic polynomial. d. Find ?? .

Which of the following differential equations are separable? (Select all that apply.) A. ????=??−?d B. ????=−3?...

Which of the following differential equations are separable? (Select all that apply.) A. ????=??−?d B. ????=−3? C. ????=?+1 D. ????=?2−?2 E. None of the above Now consider the following more general question about differential equations. ∫?′(?)??=∫??? Which of the following functions ?(?) satisfy this equation? (Select all that apply.) A. ?(?)=7?2 B. ?(?)=12?2 C. ?(?)=?−7 D. ?(?)=7? E. ?(?)=? F. ?(?)=?+7 G. ?(?)=12?2+7 H. ?(?)=12?2−7 I. None of the above

1)Find the Inverse Laplace Transform of X(s) = (s-1)/((s+1)(s+2)^2) 2)A system with the transfer function H(s)...

1)Find the Inverse Laplace Transform of X(s) = (s-1)/((s+1)(s+2)^2) 2)A system with the transfer function H(s) = (s-5)/((s+1)(s+10)) a)If the input is 2u(t), find the steady-state output of the system.

Consider the following system of differential equations dx/dt = (x^2 + 2x + 1)(x^2 − 4x...

Consider the following system of differential equations dx/dt = (x^2 + 2x + 1)(x^2 − 4x + 4) dy/dt = xy − 1 Which of the following is not an equilibrium point of the above system? (A) (3, 1/3 ) (B) (−1, −1) (C) (1, 1) (D) (1, 3)

1. Find the general solution of each of the following differential equations a.) y' − 4y...

1. Find the general solution of each of the following differential equations a.) y' − 4y = e^(2x) b.) dy/dx = 1/[x(y − 1)] c.) 2y'' − 5y' − 3y = 0

.1.) Modelling using second order differential equations a) Find the ODE that models of the motion...

.1.) Modelling using second order differential equations a) Find the ODE that models of the motion of the dumped spring mass system with mass m=1, damping coefficient c=3, and spring constant k=25/4 under the influence of an external force F(t) = cos (2t). b) Find the solution of the initial value problem with x(0)=6, x'(0)=0. c) Sketch the graph of the long term displacement of the mass m.

Find a particular solution to each of the following differential equations with the given initial condition:...

Find a particular solution to each of the following differential equations with the given initial condition: A) dy/dx=ysinx/1+y^2, y(0)=1 B)dy/dx=xy ln x, y(1)=3 C)xy(1+x^2) dy/dx=(1+y^2), y(1)=0

: Find solution to the following differential equations, t as independent variable I. u''+ 19211 =...

: Find solution to the following differential equations, t as independent variable I. u''+ 19211 = 0 u(0) = 1/ 6 u'(0) =-1 2. u'+0.125u'+u 0 u(0)2 '(0) 0 3.+1,000,0000 0 Q(0) = 0.13 x 10-6 and Q (0)