GTU Electronics and Communication Engineering (Semester 3)
Advanced Engineering Mathematics
May 2016
Advanced Engineering Mathematics
May 2016
Answer the following one mark each questions
1(a)
Integreating factor of the differential equation
\( \dfrac{dx}{dy}+\dfrac{3x}{y}=\dfrac{1}{y^2} \) is _______
\( \dfrac{dx}{dy}+\dfrac{3x}{y}=\dfrac{1}{y^2} \) is _______
1 M
1(b)
The general solution of the differential equation \( \dfrac{dy}{dx}+\dfrac{y}{x}=\tan 2x \) _______.
1 M
1(c)
The orthogonal trajectory of the family of curve x2 + y2 = c2 is _______ .
1 M
1(d)
Particular integral of (D2 + 4)y = cos 2x is _______ .
1 M
1(e)
X=0 is a regular singular point of
\( 2x^2y''+3xy'(x^2-4)y=0\ \text{say true or false} \)
\( 2x^2y''+3xy'(x^2-4)y=0\ \text{say true or false} \)
1 M
1(f)
The solution of
(y ' z)p + (z ' x)q = x ' y is _______
(y ' z)p + (z ' x)q = x ' y is _______
1 M
1(g)
State the type ,order and degree of differential equation \( \left ( \dfrac{dx}{dy} \right )^2+5y^{\dfrac{1}{3}}=x \) is _______
1 M
1(h)
Solve (D+D')z=cos x
1 M
1(i)
Is the partial differential equation \[2\dfrac{\partial ^2 u}{\partial x^2}+4\dfrac{\partial ^2 u}{\partial x \partial y}+3\dfrac{\partial ^2 u}{\partial y^2}=6\ \text {elliptic}?\]
1 M
1(j)
\( L^{-1}\left ( \dfrac{1}{(s+a)^2} \right )= \) _______
1 M
1(k)
If f(t) is a periodic function with period t L [f(t)] = _______ .
1 M
1(l)
Laplace transform of f(t) is defined for +ve and 've values of t. Say true or false.
1 M
1(m)
State Duplication (Legendre) formula.
1 M
1(n)
Find \( B\left ( \dfrac{9}{2},\dfrac{7}{2} \right ) \)
1 M
2(a)
Solve : 9y y' + 4x = 0
3 M
2(b)
Solve : \(\dfrac{dy}{dx}+y \cot x=2 \cos x\)
4 M
Solve any one question from Q.2(c) & Q.2(d)
2(c)
Find series solution of y'' + xy = 0
7 M
2(d)
Determine the value of \( (a)J\frac{1}{2}(x)\ \ \ \ (b)J\frac{3}{2}(x) \)
7 M
Solve any three question from Q.3(a), Q.3(b), Q.3(c) & Q.3(d), Q.3(e), Q.3(f)
3(a)
Solve (D2 + 9)y = 2sin 3x + cos 3x
3 M
3(b)
Solve y'' + 4y' = 8x2 by the method of undetermined coefficients.
4 M
3(c)
(i) Solve x2p + y2q = z2
(ii) Solve by charpit's method px+qy = pq
(ii) Solve by charpit's method px+qy = pq
7 M
3(d)
Solve y'' + 4y' + 4 = 0 , y(0) = 1 , y'(0) = 1
3 M
3(e)
Find the solution of y'' + a2y' = tan ax , by the method of variation of parameters.
4 M
3(f)
Solve the equation ux = 2ut + u given u(x,0)=4e-4x by the method of seperation of variable.
7 M
Solve any three question from Q.4(a), Q.4(b), Q.4(c) & Q.4(d), Q.4(e), Q.4(f)
4(a)
Find the fourier transform of the function f(x) = e-ax2
3 M
4(b)
Obtain fourier series to represent f(x) =x2 in the interval
\( -\pi
\( -\pi
4 M
4(c)
Find Half-Range cosine series for \[F(x)=\begin{matrix}
kx & ,0\leq x\leq \dfrac{1}{2}\\
k(l-x) & ,\dfrac{l}{2}\leq x\leq l
\end{matrix}\]
Also prove that \( \sum {^\infty_{n=1}}=\dfrac{1}{(2n-1)^2}=\dfrac{\pi^2}{8} \)
Also prove that \( \sum {^\infty_{n=1}}=\dfrac{1}{(2n-1)^2}=\dfrac{\pi^2}{8} \)
7 M
4(d)
Expres the function \[F(x)=\begin{matrix}
2 & ,|x|<2\\
0 & ,|x|>2\\
\end{matrix}\ \ \ \text{as Fourier integral}.\]
3 M
4(e)
Find the fourier series expansion of the function \[F(x)=\begin{matrix}
-\pi & -\pi
4 M
4(f)
Find fourier series to represent the function
F(x) = 2x-x2 in 0 < x < 3
F(x) = 2x-x2 in 0 < x < 3
7 M
Solve any three question from Q.5(a), Q.5(b), Q.5(c) & Q.5(d), Q.5(e), Q.5(f)
5(a)
Find \( L{-1}\left \{ \dfrac{1}{(s+\sqrt{2})(s-\sqrt{3})} \right \} \)
3 M
5(b)
Find the laplace transform of \[(i)\dfrac{\cos at-\cos bt}{t}\] \[(ii)t\sin at\]
4 M
5(c)
State convolution theorem and use to it evaluate \[L^{-1}\left \{ \dfrac{1}{(s^2+a^2)^2} \right \}\]
7 M
5(d)
\( (a)L\left \{ t^2 \cos h 3t\right \} \)
3 M
5(e)
Find \( L^{-1}\left \{ \dfrac{1}{s^4-81} \right \} \)
4 M
5(f)
Solve the equation y'' ' 3y' + 2y = 4t + e3t , when y(0)=1 , y'(0) = -1
7 M
More question papers from Advanced Engineering Mathematics