3. Find IA, IB, Ic, ID, IE, IF, V1, V2, V3, V4, Vs, and V6. Assume that the op amps are ideal. 2kΩ V, IA 3KΩ +5V OA 1 = -5V 2mA 5kΩ 2κος Σ 1kΩ 2kΩ Τ = 5ν , ID " +5V vs OA 2 - -5V
Find ic(t) in the circuit below for t30. (25 points) t=0 5xic swi R1 50 V3 SV icle
please show work for these integrals using integration by
parts
E(X) = 6 * Ile-a dax i and E(X) = L® zde*** Tºle-Aldr = 2 12
6 (1) Use power-series to find the general solution near x 0 of: dax +b(ab)) -( (ii) Use initial conditions: u(0) = c and (u))(0) = d ) My problem: (aa-(IX) +n))st (9))(v)-0 () My initial conditions( 5 and)0)7 to determine the unknown constants.
6 (1) Use power-series to find the general solution near x 0 of: dax +b(ab)) -( (ii) Use initial conditions: u(0) = c and (u))(0) = d ) My problem: (aa-(IX) +n))st (9))(v)-0 () My initial...
Solve the given initial-value problem. dax + 4x = -7 sin(2t) + 6 cos(2t), x(0) = -1, x'(0) = 1 xce) = -cos(2+) – sin(2t) + {cos(21) + (sin(21) Need Help? Read It Watch It Talk to a Tutor
find limit
10) lim 3x² + x 2?i Ravien IC and ld <font ne
PDE: Ut = Uxx, -00 < x < 0, t> 0 IC: u(x,0) = 38(x) + 28(x – 6) where is the Dirac delta function (impulse). u(x, t) =
(1) Prove that QV2+3) Q(V2, V3) (2) Prove that (Q(V2, v3):Q) 4 (3) Find the minimal polynomial of V2 + V/3 overQ.
Problem 3: olve the following differential equation (Bino ntial equation (Binomial series): (1+x)y' = py, IC: x = 0, y(0) = 1
3. 2sinx- COSI-1=0 find all solutions, in radians 4. sin(2x) + V3 cos x = 0 find values 0 SX S2