Please Explain 5. (4 pts) Solve the following Neumann problem on the half-line ( vt –...
Please explain your answer clearly.
4. Use the Fundamental Theorem of Calculus to find v(t) and a constant A such that A+ ſ vo(t)dt =z, where I >0.
Please show step-by-step solution and explain. Thank you!
In the following circuit, the switch has been connected to terminal A for a long time so that the circuit is in steady-state, and it switches to terminal B at timet0. Determine V(0) and V(0+), and for t >0 determine Vc(t) and Vx (t) 452 8V( 4? V. -?? T 2F
The Bessel equation of order one-half is X .2 dy d.2 + X dy dar +(x2 - :) y = 0, X > 0 4 a) Verify that yı(x) = x-1/2 sin x is a solution to the equation b) Use reduction of order to find a second linearly independent solution. (Hint: one possibility is y2(x) = x-1/2 cos x.] c) Compute the Wronskian of these two solutions explicitly and verify that it is equal to the solution we computed...
Could someone explain how these to get these phase portraits by
hand with ẋ=y and ẏ=ax-x^2 especially for a=0 case where you have
eigenvalues all equal to zero?
6.5.4 a>0 Sketch the phase portrait for the system x = ax-x, for a < 0, a = 0, and For a -(0 We were unable to transcribe this imageFor a>0 ES CS
Vx+1-1 Evaluate: lim x>0 х Please solve it in detail and show all your steps./
+ – for n > 1, subject to Problem 5 (6 pts): Solve the recursive equation T(n the initial condition T(1) = 0.
Problem 3 The switch has been closed for al0. At t0, the switch is opened. Calculate the capacitor voltage v(t) for t > 0. 15Ω 6 2 12 Q t=0 24 V+ 25 Ω 3 H 60Ω 1/27 F Figure 3
5. (20 pts). Solve the following initial-value problem: Ut + 2uuz - 0<x<, 0 <t<oo 0 1 <1 > 1 u(t,0) = Then draw the solution for different values of time.
please circle final answer thank
you!
Question 34 Solve the problem. At time t > 0, the velocity of a body moving along the s-axis is v= 12.5t+ 4. When is the body's velocity increasing? ot>4 ot< 2.5 ot<4 ot > 2.5
Please include step-by-step solution.
D19. Solve t2x" +3tx -3 x-t', t>0.