Solve the PDE using the change of variables v = x, w = y/x x2uxx +...

Solve the PDE using the change of variables v = x, w = y/x x2uxx +...

Solve the PDE using the change of variables v = x, w = y/x x2uxx + 2xyuxy + y2uyy = 4x2

(PDE) Solve the ff boundary value problems using Laplace Equationnon the square , omega= { o<x<phi,...

(PDE) Solve the ff boundary value problems using Laplace Equationnon the square , omega= { o<x<phi, 0< y <phi}: u(x,0) =0, u(x,phi) = 0 ; u(0,y)= siny , u(phi,y) =0

Find the general solution of uxx − 3uxy + 2uyy = 0 using the the method...

Find the general solution of uxx − 3uxy + 2uyy = 0 using the the method of characteristics: let v = y + 2x and w = y + x; define U(v, w) to be U(v, w) = U(y + 2x, y + x) = u(x, y); derive and solve a PDE for U(v, w); convert back to u(x, y).

PDE Solve using the method of characteristics Plot the intial conditions and then solve the parial...

PDE Solve using the method of characteristics Plot the intial conditions and then solve the parial differential equation utt = c² uxx, -∞ < x < ∞, t > 0 u(x,0) = { 0 if x < -1 , 1-x² if -1≤ x ≤1, 0 if x > 0 ut(x,0) = 0

Let s = f(x; y; z) and x = x(u; v; w); y = y(u; v;...

Let s = f(x; y; z) and x = x(u; v; w); y = y(u; v; w); z = z(u; v; w). To calculate ∂s ∂u (u = 1, v = 2, w = 3), which of the following pieces of information do you not need? I. f(1, 2, 3) = 5 II. f(7, 8, 9) = 6 III. x(1, 2, 3) = 7 IV. y(1, 2, 3) = 8 V. z(1, 2, 3) = 9 VI. fx(1, 2, 3)...

Find numbers x and y so that w-x⋅u-y⋅v is perpendicular to both u and v, where...

Find numbers x and y so that w-x⋅u-y⋅v is perpendicular to both u and v, where w=[-28,-25,39], u=[1,-4,2], and v=[7,3,2].

Use a change of variables to evaluate Z Z R (y − x) dA, where R...

Use a change of variables to evaluate Z Z R (y − x) dA, where R is the region bounded by the lines y = 2x, y = 3x, y = x + 1, and y = x + 2. Use the change of variables u = y x and v = y − x.

3) Four statistically independent random variables, X, Y, Z, W have means of 2, -1, 1,...

3) Four statistically independent random variables, X, Y, Z, W have means of 2, -1, 1, -2 respectively, variances of X and Z are 9 and 25 respectively, mean-square values of Y and W are 5 and 20 respectively. Define random variable V as: V = 2X - Y + 3Z - 2W, find the mean-square value of V (with minimum math).

1.) Consider two independent discrete random variables X and Y with V(X)=2 and V(Y)=5. Find V(4X-8Y-9)....

1.) Consider two independent discrete random variables X and Y with V(X)=2 and V(Y)=5. Find V(4X-8Y-9). 2.) Consider two independent discrete random variables X and Y with SD(X)=16 and SD(Y)=9. Find SD(5X-2Y-13). (Round your answer to 1 place after the decimal point). 3.)Consider two discrete random variables X and Y with V(X)=81 and V(Y)=36 and correlation ρ=0.7. Find V(X-Y). (Round your answer to 1 digit after the decimal point).

For the function w=f(x,y) , x=g(u,v) , and y=h(u,v). Use the Chain Rule to     Find...

For the function w=f(x,y) , x=g(u,v) , and y=h(u,v). Use the Chain Rule to     Find ∂w/∂u and ∂w/∂v when u=2 and v=3 if g(2,3)=4, h(2,3)=-2, gu(2,3)=-5,        gv(2,3)=-1 , hu(2,3)=3, hv(2,3)=-5, fx(4,-2)=-4, and fy(4,-2)=7    ∂w/∂u=    ∂w/∂v =