Latest revision as of 22:19, 5 August 2017

ECE Ph.D. Qualifying Exam

MICROELECTRONICS and NANOTECHNOLOGY (MN)

Question 2: Junction Devices

August 2010

Questions

All questions are in this link

Solutions of all questions

Part A a) $D_p\frac{d^2\triangle p}{dx^2} = 0$

b) $\triangle p = Ax +B$

c) $\triangle p(x_n) = \frac{n_i^2}{N_D}(e^{qV_A/kT}-1)$ $\triangle p(w_N) = 0$

d) $$ 0=Aw_N+B $$ $\begin{align*} \frac{n_i^2}{N_D}(e^{qV_A/kT}-1)&=Ax_n+B\\ A(w_N+x_n)&=-\frac{n_i^2}{N_D}(e^{qV_A/kT}-1)\\ \implies A&=-\frac{n_i^2}{N_D(w_N-x_n)}(e^{qV_A/kT}-1)\\ B=-Aw_N&=\frac{w_Nn_i^2}{N_D(w_N-x_n)}(e^{qV_A/kT}-1)\\ J_p = -qD_p\frac{d\triangle p}{dx}\bigg\vert_{x=x_n} &= -qD_p\bigg[-\frac{n_i^2}{N_D(w_N-x_n)}(e^{qV_A/kT}-1)\bigg]\\ &=\frac{qD_p}{w_N-x_n}\frac{n_i^2}{N_D}(e^{qV_A/kT}-1) \end{align*}$

 ------------------------------------------------------------------------------------

Part B a) $\begin{align*} I_{La}&=qA\int_0^{x_n}\frac{dn}{dt}\cdot dx\\ &=qAG_Lx_n \end{align*}$ $\frac{dn}{dt} = -R=G_L$

b)

 $\begin{align*} &D_p\frac{d^2\triangle p}{dx^2}+G_L =0\\ &\implies \frac{d^2\triangle p}{dx^2} =-\frac{G_L}{D_p}\\ &\implies \frac{d\triangle p}{dx} =-\frac{G_L}{D_p}x+A\\ &\implies \triangle p =-\frac{G_L}{D_p}\frac{x^2}{2}+Ax+B\\ &\triangle p(w_n) =0\\ &\triangle p(x_n) = \frac{n_i^2}{N_D}(e^{qV_A/kT}-1) (?)\\ &\text{or; }-D_p\frac{d\triangle p(x_n)}{dx}=G_Lx_n (?) \end{align*}$

which one to use??

 $I_{Lb} = -qAD_p\frac{d(\triangle p)}{dx}$

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@@ Line 16: / Line 16: @@
 </font size>
-August 2007
+August 2010
 </center>
 ----
 ----
 ==Questions==
-All questions are in this [https://engineering.purdue.edu/ECE/Academics/Graduates/Archived_QE_August_07/MN-2%20QE%2007.pdf link]
+All questions are in this [https://engineering.purdue.edu/ECE/Academics/Graduates/Archived_QE_August_10/MN-2%20QE%2010.pdf link]
 =Solutions of all questions=
-)
+Part A
-A) Forward
+a) <math>D_p\frac{d^2\triangle p}{dx^2} = 0</math>
-B)   <math>10^{16}cm^{-3}</math>
+b) <math>\triangle p = Ax +B</math>
-C) <math>10^{14}cm^{-3}</math>
+c) <math>\triangle p(x_n) = \frac{n_i^2}{N_D}(e^{qV_A/kT}-1)</math>
+<math>\triangle p(w_N) = 0
+</math>
-D) <math>10^{9}\times10^{14} = n_i^2</math>
+d)<math>0=Aw_N+B</math>
-<math>\implies n_i = 10^{23/2}</math>
+<math>
-E) Yes.
-F) <math>
 \begin{align*}
-\triangle P_n&=10^{12}-10^9\approx 10^{12}\\
+\frac{n_i^2}{N_D}(e^{qV_A/kT}-1)&=Ax_n+B\\
-\triangle P_n&=\frac{n_i^2}{N_D}(e^{qV_A/kT}-1)=10^{12}\\
+A(w_N+x_n)&=-\frac{n_i^2}{N_D}(e^{qV_A/kT}-1)\\
-&\implies e^{qV_A/kT} = 10^3\\
+\implies A&=-\frac{n_i^2}{N_D(w_N-x_n)}(e^{qV_A/kT}-1)\\
-&\implies V_A = 0.026\times\ln(10^3) = 0.026\times6.9\\
+B=-Aw_N&=\frac{w_Nn_i^2}{N_D(w_N-x_n)}(e^{qV_A/kT}-1)\\
-&= 0.17 V
+J_p = -qD_p\frac{d\triangle p}{dx}\bigg\vert_{x=x_n} &= -qD_p\bigg[-\frac{n_i^2}{N_D(w_N-x_n)}(e^{qV_A/kT}-1)\bigg]\\
+&=\frac{qD_p}{w_N-x_n}\frac{n_i^2}{N_D}(e^{qV_A/kT}-1)
 \end{align*}
 </math>
    ------------------------------------------------------------------------------------
-)
+Part B
+a)
 <math>
 \begin{align*}
-|I_E| & = qD_p\frac{10^{10}}{0.1\times10^{-4}} = 1.8\times10^{16}q\\
+I_{La}&=qA\int_0^{x_n}\frac{dn}{dt}\cdot dx\\
-|I_B| & = qD_n\frac{10^{8}}{0.2\times10^{-4}} = 1.8\times10^{14}q\\
+&=qAG_Lx_n
-\beta + 1 &= \frac{|I_E|}{|I_B|}\approx 67\\
-&\therefore \beta= 66 \text{ (chk)}
 \end{align*}
 </math>
+<math>
- ------------------------------------------------------------------------------------
+\frac{dn}{dt} = -R=G_L
-)
-A)
- <math>
-\alpha_T = \frac{0.997J_0}{0.998J_0} = 0.99
 </math>
-B)
+b)
   <math>
-\gamma = \frac{0.998J_0}{(0.998+0.002)J_0} = 0.998
- </math>
- C)D)
-  <math>
   \begin{align*}
- \alpha_{dc} &= \gamma\cdot\alpha_T\\
+&D_p\frac{d^2\triangle p}{dx^2}+G_L =0\\
- &=0.98802
+&\implies \frac{d^2\triangle p}{dx^2} =-\frac{G_L}{D_p}\\
- \end{align*}
+&\implies \frac{d\triangle p}{dx} =-\frac{G_L}{D_p}x+A\\
- </math>
+&\implies \triangle p =-\frac{G_L}{D_p}\frac{x^2}{2}+Ax+B\\
- <math>
+&\triangle p(w_n) =0\\
-\beta_{dc} = \frac{\alpha_{dc}}{1-\alpha_{dc}}\approx 82
+&\triangle p(x_n) = \frac{n_i^2}{N_D}(e^{qV_A/kT}-1) (?)\\
- </math>
+&\text{or; }-D_p\frac{d\triangle p(x_n)}{dx}=G_Lx_n (?)
- <math>
+\end{align*}
- \begin{align*}
-I_E &= (0.998+0.002)J_0 = J_0\\
-I_C &= 0.997J_0\\
-I_B &= I_E-I_C = 0.003J_0
- \end{align*}
 </math>
+which one to use??
- ------------------------------------------------------------------------------------
-)
   <math>
-\text{Derivation of } \beta = \frac{D_n}{D_p}\cdot\frac{W_E}{W_B}\cdot\frac{N_E}{N_B}\cdot\frac{n_{iB}^2}{n_{iE}^2}
+I_{Lb} = -qAD_p\frac{d(\triangle p)}{dx}
 </math>
   ------------------------------------------------------------------------------------
 ----
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