Please explain clearly and show all steps. Thank you.
Please explain clearly and show all steps. Thank you. Solve the following first order equation 2x...
Solve differential equation with initial condition. Final answer in form y=f(x). Please show all steps, thank you!!! dy = xy² + 4x y dx yo) = 2
Please show all the steps of these questions. Solve the differential equation y' + y cos x = { sin 2x dy V1 - y2 Solve the initial value problem y(e) = dx x In (x) 1 = V2
from ch8 section 3. please show all steps and write clearly Use the methods of section 8.3 to find the general solutions of the given systems of differential equations in the following two problems. 5. = x + 3y + 1 dx dt dy dt = x - y - 1
Please explain as you solve, thank you! (#1,2 & 4) an arbillal equation is continuous il nu xo would, for small enough pos This establishes Equation 3. EXERCISES In Exercises 1 to 4, use Green's theorem to compute the value of the line integral y dx + xédy, where y is the indicated closed path. 1. The circle given by g(t) = (cost, sin t), 0 < t < 211 2. The square with corners at (+1, 1), traced counterclock-...
Need 20 and 22. please explain. In Problems 19–26 solve the given differential equation. 19. (y2 + 1) dx = y sec? x dy 20. y(In x – In y) dx = (x In x - x In y - y) dy dy 21. (6r: + 1)y? + 3x² + 2y3 = 0 dx dx 22. dy 4y2 + 6xy 3y² + 2x
this is from differential equations ch8 section 2. please write clearly and show all steps Use the methods of section 8.2 to find the general solutions of the given systems of differential equations in the following three problems. 2. dx dt 2x + y dy = -x + 4y dt
Please explain clearly and show all steps. Thank you. A cuboid is bounded by the planes x=0, x=1, y=0, y=3, z=0 and z=2. Use Gauss' Divergence Theorem to calculate SSsF. NºdS, the flux of the vector field F =x2i® + zjº+yk outward of the cuboid through its surfaces.
Use Laplace Transform to solve the initial value problem. Please show all work and steps clearly so I can follow your logic and learn to solve similar ones myself. I will also rate your answer. Thank you kindly! y′′−2y′−3y = e^4t, y(0) = 1, y′(0) = −1.
please wrote out all steps NEATLY, thank you in advance dy Use implicit differentiation to find dx 3y2 2x-5 2x + 5 dy dx =
** Please show all steps & explain how to solve the solution ** A first order reaction has rate constants of 4.6 x 10-2 s-1 and 5.7 × 10-2 s-1 at 0°C and 20°C, respectively. What is the value of the activation energy? Activation energy- kJ/mol Try Another Version ltem attempts remaining Submlt Answer