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Messages - Ping Wei

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1
Test 1 / Re: TT1 Problem 3
« on: February 12, 2015, 10:29:04 PM »
Solution to Question 3

2
Test 1 / Re: TT1 Problem 4
« on: February 12, 2015, 10:02:14 PM »
Ut= 6x , Ux= 2x^2+6t, Uxx= 6x  so Ut - Uxx = 6x -6x =0

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Test 1 / Re: TT1 Problem 4
« on: February 12, 2015, 10:00:21 PM »
a), u(L,T) is maximum value
b), u(0,0) is minimum value

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HA2 / Re: HA2 problem 1
« on: January 29, 2015, 09:42:54 PM »
A) The problem always has  unique solution. No extra consitions are necessary. Since x>4t, we are confident that x−3t is always positive. I.e. initial value functions are defined everywhere in domain of u(t,x). Using d'Alembert's formula we write:
u(t,x)=1/3cos(x+3t)+2/3cos(x-3t)


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HA1 / Re: HA1 problem 3
« on: January 23, 2015, 10:33:14 AM »
By examining Integral Lines: $\frac{dx}{1}=\frac{dy}{3}=\frac{du}{xy}$; then we got $3x=y+C$ where $C$ is some constant.
$y=3x−C$

Then again from the Integral Lines:

dx(xy)=du

dx(x(3x−C))=du

u=x^3−C/2x^2+C1

Then by the initial condition:

u(x=0)=0

C1=0

Therefore,C=3x−y

Therefore,

u(x,y)=x^3−1/2x^2C

$u(x,y)=x^3−\frac{1}{2}x^2(3x−y)$

$u(x,y)=−\frac{1}{2}x^3+\frac{1}{2}x^2y$

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HA1 / Re: HA1 problem 6
« on: January 23, 2015, 10:24:52 AM »
b) when t < 0 t not equal 0 
      when t > 0 all t are fine

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HA1 / Re: HA1 problem 2
« on: January 23, 2015, 10:20:06 AM »
c) The difference between two cases is that in one of them all trajectories have (0,0) as the limit points and in another only those with x=0 or y=0

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