use partial derivative to solve for uf(x,y,t)
if f(x,y,t) is 5X^3y-1/xy+1/xt+x^2t^2
Ux=0.5
Uy=0.2
Uz=0.3
Use numerical methos to solve also this problem
use partial derivative to solve for uf(x,y,t) if f(x,y,t) is 5X^3y-1/xy+1/xt+x^2t^2 Ux=0.5 Uy=0.2 Uz=0.3 Use numerical...
Find The indicated second-order Partial derivative. fxx(x,y) if f(x,y)=5x-3y+3 Find the indicated second-order partial derivative. fxx (x,y) if f(x,y) = 5x - 3y + 3 fxx(x,y) =
Find The indicated second-order Partial derivative. fxx(x,y) if f(x,y)=5x-3y+3 Find the indicated second-order partial derivative. fxx (x,y) if f(x,y) = 5x - 3y + 3 fxx(x,y) =
Assignment 2 Q.1 Find the numerical solution of system of differential equation y" =t+2y + y', y(0)=0, at x = 0.2 and step length h=0.2 by Modified Euler method y'0)=1 Q.2. Write the formula of the PDE Uxx + 3y = x + 4 by finite difference Method . Q.3. Solve the initial value problem by Runga - Kutta method (order 4): y" + y' – 6y = sinx ; y(0) = 1 ; y'(0) = 0 at x =...
solve 2-3 1. Use a Taylor series to get the limit: In(x+3) 2. Use a Taylor series to get the derivative of f(x) = arctan x and check for the interval of convergence. Is the interval of convergence for f' the same as the interval for for different? Why? 3. Use a Taylor series to solve y' (t) - 3y = 10,y(0) = 2
pls solve like example Assign 7.3.25 Find all local extrema for the function f(x,y) = x3 - 12xy + y. Find the local maxima. Select the correct choice below and, if necessary, fill in the answer box to complete your choice. There are local maxima located at (Type an ordered pair. Use a comma to separate answers as needed.) OB. There are no local maxima. Question Hel Find all local extrema for the function f(x,y)=x°-21xy+y3. The function will have local...
Using the Runge-Kutta fourth-order method, obtain a solution to dx/dt=f(t,x,y)=xy^3+t^2; dy/dt=g(t,x,y)=ty+x^3 for t= 0 to t= 1 second. The initial conditions are given as x(0)=0, y(0) =1. Use a time increment of 0.2 seconds. Do hand calculations for t = 0.2 sec only.
1. find the derivative of f(×,y)=-4yx^3+xy^2 at P(1,1) in forward direction set by the line r(t)=(1+sqrt(2)t+sqrt(2)t 2. find an equation for the tangent plain at point P x^3+y^3=3xyz P(2,1,3/2)
PROBLEMS Solve for y. 3.1. - x + 4x + sin 6x 3.4. y + 3x = 0 3.5. (x-1)? ydx + x? (y - 1)dy = 0 Just find a solution. Solving for y is tough. Test for exactness and solve if exact. 3.6. (y - x) dx + (x? - y) dy - 0 3.7. (2x + 3y) dx + (3x + y - 1) dy - 0 3.8. (2xy Y + 2xy + y) dx + (x*y*el...
At least one of the answers above is NOT correct. (1 point) Suppose f(x, t) = e 3t sin(x + 2t). (a) At any point (x, t), the differential is df = e^(-3t)cos(x+2t)dx+(e^(-3t))(2cos(x+2t)-2sin(x+2t))dt (b) At the point (-1,0), the differential is df = cos(-1)dx+(2cos(-1))+3sin(-1)dt (c) At the point (-1,0) with dx = -0.5 and dt = 0.3, the differential is df = 0.97344 Note. You can earn partial credit on this nrohlem (1 point) Consider the surface xyz = 20....
Use the Laplace transform to solve the given initial-value problem. 0 st<1 t 1 y' y f(t), y(0) 0, where f(t) (4, ae-1 -(1-1) 4 y(t) X Use the Laplace transform to solve the given initial-value problem. 0 st