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Messages - Qihui Huang

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Quiz-5 / LEC0101 quiz5
« on: November 01, 2019, 02:03:28 PM »
Question: find a particular solution of the given homogeneous equation:
$$t^2y''+7ty'+5y=t, t>0$$
Rewrite as $$y''+\frac{7}{t}y'+\frac{5}{t^2}y=\frac{1}{t}$$ Let $$y=v(t)y_1(t)=vt^{-1}$$ then $$y'=v't^{-1}-vt^{-2}$$ $$y''=v''t^{-1}-2v't^{-2}+2vt^{-3}$$
$$v''t^{-1}-2v't^{-2}+2vt^{-3}+7v't^{-2}-7vt^{-3}+5vt^{-3}=t^{-1}$$ $$v''t^{-1}+5t^{-2}v'=t^{-1}$$ $$v''+5t^{-1}v'=1$$
Let $$v'=r(t), v''=r'(t)$$ so we get $$r'+\frac{5}{t}r=1$$ Find the integrating factor $$u(t)=e^{\int \frac{5}{t}dt}$$ $$u(t)=t^5$$ $$t^5r'+t^5\frac{5}{t}r=t^5$$ $$\int (t^5r)'=\int t^5 dt $$ $$rt^5=\frac{1}{6}t^6+c_1$$ $$r=\frac{1}{6}t+c_1t^{-5}$$ $$v=\frac{1}{12}t^2-\frac{1}{4}c_1t^{-4}+c_2$$ $$y=\frac{1}{12}t-\frac{1}{4}c_1t^{-4}t^{-1}+c_2t^{-1}$$ $$y=\frac{1}{12}t-\frac{1}{4}c_1t^{-5}+c_2t^{-1}$$ $$y=a_1t^{-5}+a_2t^{-1}+\frac{1}{12}t$$where $a_1$ and $a_2$ are arbitrary constants

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Quiz-3 / TUT0702 Quiz3
« on: October 11, 2019, 02:26:03 PM »
Verify that the functions y1 and y2 are solutions of the given differential equation. Do they constitute a fundamental set of solutions?

$$y''-2y+y=0,y_1(t)=e^t, y_2(t)=te^t$$

Solution:
Differentiate $y_1(t)=e^t, y_2(t)=te^t$ respect to t,
$$y_1'=e^t, y_2'=e^t+te^t$$
$$y_1''=e^t,y_2=2e^t+te^t$$
Substitute back to the differential equation,
$$e^t-2e^t+e^t=0$$
$$2e^t+te^t-2(e^t+te^t)+te^t=0$$
So both $y_1(t)$ and $y_2(t)$ are two valid solutions to the equation.

To check whether it is a fundamental set of solution:
We want  $W(y_1,y_2)(t) \neq 0$
$$W=\begin{bmatrix}e^t&te^t\\e^t&e^t+te^t\end{bmatrix}$$
$$e^t*(e^t+te^t)-te^t*e^t=e^{2t}$$
The determinant is not zero, so it is a fundamental set of solutions.

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Quiz-2 / TUT0702 Quiz2
« on: October 04, 2019, 02:12:37 PM »
Determine whether the equation is exact or not

$$(e^xsin(y)-2ysin(x))-(3x-e^xsin(y))y'=0$$
Let $$M(x,y)=e^xsin(y)-2ysin(x)$$ and let $$N(x,y)=-3x+e^xsin(y)$$
Then, $$M_y(x,y)=e^xcos(y)-2sin(x)$$ $$N_x(x,y)=-3+e^xsin(y)$$
Since $$M_y \neq N_x$$
so the given differential equation is not exact.

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