6. Find the solution of the 1-dimensional heat equation on the interval 0, : Uxx, Ur...
Detail greatly appreciated thankyou Find the solution of the inhomogeneous heat equation Uxx = U/ +2,0 < x < 1,t> 0; u(0, t) = 0, u(1,t) = 0,t > 0, u(x,0) = x2 – x. Hint: Find a stationary solution first and then ..., then use the computation in Q3.
Just need the answer and no steps. The solution of the heat equation Uxx = U7, 0 < x < 2,1 > 0, which satisfies the boundary conditions u(0, t) = u(2,t) = 0 and the initial condition u(x, 0) = f(x), (1, 0 < x < 1 L where f(x) = 3 }, is u(x, t) = į bn sin (n7x De 7 ,where bn = 10,1 < x < 2 S n=1 Select one: o a [(-1)] o...
(1 point) Solve the nonhomogeneous heat problem ut = Uxx + sin(3x), 0 < x < 1, u(0,t) = 0, u1,t) = 0 u(x,0) = 2 sin(4x) u(x, t) = Steady State Solution limt-001(x, t) = ((sin(3x))/9)
(1 point) Solve the nonhomogeneous heat problem u, = Uxx + 5 sin(5x), 0<x<1, u(0,t) = 0, u1,t) = 0 u(x,0) = 4 sin(4x) u(x, t) = Steady State Solution lim 700 u(x, t) =
(1 point) Solve the nonhomogeneous heat problem U; = Uxx + sin(4x), 0 < x < 1, u(0, t) = 0, u(a,t) = 0 u(x,0) = - 3 sin(2x) u(x, t) = Steady State Solution limt700 u(x, t) =
(1 point) Solve the nonhomogeneous heat problem u; = Uxx + 4 sin(5x), 0 < x < t, u(0, t) = 0, u(1, t) = 0 u(x,0) = 2 sin(2x) u(x, t) = Steady State Solution limt700 u(x, t) =
(1 point) Solve the heat problem U4 = Uxx, 0 < x < 1, uz (0,t) = 0, uz(t,t) = 0 u(x,0) = cos? (x) (THINK) u(x, t) =
3. Using separation of variables to solve the heat equation, u -kuxx on the interval 0x<1 with boundary conditions u(0 and ur(1, t)-0, yields the general solution, u(x, t) =A0 + Σ Ane-k,t cos(nm) (with A, = ㎡π2) 0<x<l/2 0〈x〈1,2 u(x,0)=f(x)-.., , . . .) when u(x,0) = f(x)- Determine the coefficients An (n - 0, 1,2,
My answers are wrong, please help (1 point) Solve the heat problem U = Uxx + sin(x) – 2 sin(2x), 0 < x < 1, u(0,t) = 0, u(,t) = 0 u(x,0) = 0 u(x,t) = sin(x)(1-e^(-1))(-sin(2x)/2)(1-e^(-4t)) Steady State Solution lim u(x,t) = 2/4(sin(2x))
If you were to solve the variant of wave equation utt=uxx+u for 0<x<6 and t>0 with u(0,t)=u(2 ,t)=0, u(x,0)=2x, ut(x,0)=0 using separation of variables, what would be the correct form of Xn (x)? Xn (x)=cosh( nπ 4 Xn (x)=sin( nπ 2 Xn (x)=sin( n2 π2 4 Xn (x)=cos nπ 2 None of these