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Recent questions tagged differentialequations
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GATE ECE 2021  Question: 2
Consider the differential equation given below. $\frac{dy}{dx}+\frac{x}{1x^{2}}y=x\sqrt{y}$ The integrating factor of the differential equation is $\left ( 1x^{2} \right )^{3/4}$ $\left ( 1x^{2} \right )^{1/4}$ $\left ( 1x^{2} \right )^{3/2}$ $\left ( 1x^{2} \right )^{1/2}$
asked
Feb 20
in
Differential Equations
by
Arjun
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4.5k
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gateec2021
differentialequations
firstorderdifferentialequation
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2
GATE ECE 2020  Question: 4
The general solution of $\dfrac{\mathrm{d^{2}} y}{\mathrm{d} x^{2}}6\dfrac{\mathrm{d} y}{\mathrm{d} x}+9y=0$ is $y=C_{1}e^{3x}+C_{2}e^{3x}$ $y=(C_{1}+C_{2}x)e^{3x}$ $y=(C_{1}+C_{2}x)e^{3x}$ $y=C_{1}e^{3x}$
asked
Feb 13, 2020
in
Differential Equations
by
jothee
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1.9k
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63
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gate2020ec
differentialequations
secondorderdifferentialequation
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3
GATE ECE 2020  Question: 27
Which one of the following options contains two solutions of the differential equation $\dfrac{\mathrm{d} y}{\mathrm{d} x}=\left ( y1 \right )x?$ $\ln\mid y1 \mid=0.5x^{2}+C$ and $y=1$ $\ln\mid y1 \mid=2x^{2}+C$ and $y=1$ $\ln\mid y1 \mid=0.5x^{2}+C$ and $y=1$ $\ln\mid y1 \mid=2x^{2}+C$ and $y=1$
asked
Feb 13, 2020
in
Differential Equations
by
jothee
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1.9k
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43
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gate2020ec
differentialequations
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4
GATE ECE 2019  Question: 2
The families of curves represented by the solution of the equation $\frac{dy}{dx}=\: – \left(\frac{x}{y} \right)^n$ for $n=1$ and $n= +1,$ respectively, are Parabolas and Circles Circles and Hyperbolas Hyperbolas and Circles Hyperbolas and Parabolas
asked
Feb 12, 2019
in
Differential Equations
by
Arjun
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4.5k
points)

82
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gate2019ec
differentialequations
0
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5
GATE ECE 2019  Question: 43
Consider the homogenous ordinary differential equation $x^{2}\frac{d^{2}y}{dx^{2}}3x\frac{dy}{dx}+3y=0, \quad x>0$ with $y(x)$ as a general solution. Given that $y(1)=1 \quad \text{and} \quad y(2)=14$ the value of $y(1.5),$ rounded off to two decimal places, is________.
asked
Feb 12, 2019
in
Differential Equations
by
Arjun
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4.5k
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67
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gate2019ec
numericalanswers
differentialequations
engineeringmathematics
0
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0
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6
GATE ECE 2016 Set 3  Question: 26
The particular solution of the initial value problem given below is $\frac{d^2y}{dx^2}+12\frac{dy}{dx}+36y=0\hspace{0.3cm} \text{ with } \hspace{0.3cm}y(0)=3\hspace{0.3cm} \text{ and }\hspace{0.3cm} \frac{dy}{dx} \bigg _{x=0} =36$ $(318x)e^{6x}$ $(3+25x)e^{6x}$ $(3+20x)e^{6x}$ $(312x)e^{6x}$
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Mar 28, 2018
in
Differential Equations
by
Milicevic3306
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15.8k
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34
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gate2016ec3
differentialequations
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7
GATE ECE 2016 Set 2  Question: 19
The response of the system $G(s)=\frac{s2}{(s+1)(s+3)}$ to the unit step input $u(t)$ is $y(t)$. The value of $\frac{dy}{dt}$ at $t=0^{+}$ is _________
asked
Mar 28, 2018
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Differential Equations
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Milicevic3306
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gate2016ec2
numericalanswers
differentialequations
0
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0
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8
GATE ECE 2016 Set 2  Question: 26
The ordinary differential equation $\frac{dx}{dt}=3x+2, \text{ with }x(0) = 1$ is to be solved using the forward Euler method. The largest time step that can be used to solve the equation without making the numerical solution unstable is _________
asked
Mar 28, 2018
in
Differential Equations
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Milicevic3306
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15.8k
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22
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gate2016ec2
numericalanswers
differentialequations
0
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0
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9
GATE ECE 2015 Set 3  Question: 28
Consider the differential equation $\dfrac{\mathrm{d^{2}}x(t) }{\mathrm{d} t^{2}} +3\frac{\mathrm{d}x(t)}{\mathrm{d} t} + 2x(t) = 0. $ Given $x(0) = 20$ and $x(1) = 10/e,$ where $e = 2.718,$ the value of $x(2)$ is ________.
asked
Mar 28, 2018
in
Differential Equations
by
Milicevic3306
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15.8k
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134
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gate2015ec3
numericalanswers
differentialequations
0
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0
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10
GATE ECE 2015 Set 2  Question: 4
The general solution of the differential equation $\dfrac{\mathrm{d} y}{\mathrm{d} x} = \dfrac{1+\cos 2y}{1\cos 2x}$ is $ \tan y – \cot x = c\:\text{(c is a constant)}$ $\tan x – \cot y = c\:\text{(c is a constant)}$ $\tan y + \cot x = c\:\text{(c is a constant)}$ $\tan x + \cot y = c\:\text{(c is a constant)}$
asked
Mar 28, 2018
in
Differential Equations
by
Milicevic3306
(
15.8k
points)

19
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gate2015ec2
differentialequations
0
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11
GATE ECE 2015 Set 2  Question: 26
Consider the differential equation $\dfrac{\mathrm{d} x }{\mathrm{d} t} = 10 – 0.2x$ with initial condition $x(0) = 1$. The response $x(t)$ for $t>0$ is $2e^{0.2t}$ $2e^{0.2t}$ $5049e^{0.2t}$ $5049e^{0.2t}$
asked
Mar 28, 2018
in
Differential Equations
by
Milicevic3306
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15.8k
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19
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gate2015ec2
differentialequations
0
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0
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12
GATE ECE 2015 Set 2  Question: 30
An $LC$ tank circuit consists of an ideal capacitor $C$ connected in parallel with a coil of inductance $L$ having an internal resistance $R.$ The resonant frequency of the tank circuit is $\dfrac{1}{2\pi \sqrt{LC}}$ ... $\dfrac{1}{2\pi \sqrt{LC}}\left(1R^{2}\dfrac{C}{L}\right)$
asked
Mar 28, 2018
in
Analog Circuits
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Milicevic3306
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15.8k
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24
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gate2015ec2
analogcircuits
tankcircuits
differentialequations
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13
GATE ECE 2015 Set 1  Question: 25
The solution of the differential equation $\frac{d^2y}{dt^2} + 2 \frac{dy}{dt}+y=0$ with $y(0)=y’(0)=1$ is $(2t)e^t$ $(1+2t)e^{t}$ $(2+t)e^{t}$ $(12t)e^t$
asked
Mar 28, 2018
in
Differential Equations
by
Milicevic3306
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15.8k
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20
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gate2015ec1
differentialequations
0
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0
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14
GATE ECE 2014 Set 4  Question: 4
If $a$ and $b$ are constants, the most general solution of the differential equation $\frac{d^2x}{dt^2}+2 \frac{dx}{dt}+x=0$ is $ae^{t}$ $ae^{t} + bte^{t}$ $ae^t+bte^{t}$ $ae^{2t}$
asked
Mar 26, 2018
in
Differential Equations
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Milicevic3306
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15.8k
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18
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gate2014ec4
differentialequations
0
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0
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15
GATE ECE 2014 Set 4  Question: 26
With initial values $y(0) =y’(0)=1$, the solution of the differential equation $\frac{d^2y}{dx^2}+4 \frac{dy}{dx}+4y=0$ at $x=1$ is ________
asked
Mar 26, 2018
in
Differential Equations
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Milicevic3306
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25
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gate2014ec4
numericalanswers
differentialequations
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0
answers
16
GATE ECE 2014 Set 3  Question: 2
Which $ONE$ of the following is a linear nonhomogeneous differential equation, where $x$ and $y$ are the independent and dependent variables respectively? $\frac{dy}{dx}+xy= e^{x}$ $\frac{dy}{dx}+xy= 0$ $\frac{dy}{dx}+xy= e^{y}$ $\frac{dy}{dx}+ e^{y}= 0$
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Mar 26, 2018
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Differential Equations
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Milicevic3306
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30
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gate2014ec3
differentialequations
0
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17
GATE ECE 2014 Set 3  Question: 5
If $z= xy \text{ ln} (xy)$, then $x\frac{\partial z}{\partial x}+y\frac{\partial z}{\partial y}= 0 \\$ $y\frac{\partial z}{\partial x}= x\frac{\partial z}{\partial y} \\$ $x\frac{\partial z}{\partial x}= y\frac{\partial z}{\partial y} \\$ $y\frac{\partial z}{\partial x}+x\frac{\partial z}{\partial y}= 0$
asked
Mar 26, 2018
in
Differential Equations
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Milicevic3306
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15.8k
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44
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gate2014ec3
differentialequations
partialdifferentialequations
0
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0
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18
GATE ECE 2014 Set 2  Question: 5
If the characteristic equation of the differential equation $\frac{\mathrm{d}^2 y}{\mathrm{dx}^2}+2\alpha \frac{\mathrm{d}y}{\mathrm{d} x}+y= 0$ has two equal roots, then the value of $\alpha$ are $\pm 1$ $0,0$ $\pm j$ $\pm 1/2$
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Mar 26, 2018
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Differential Equations
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24
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gate2014ec2
differentialequations
0
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0
answers
19
GATE ECE 2014 Set 1  Question: 45
A system is described by the following differential equation, where $u(t)$ is the input to the system and $y(t)$ is the output of the system. $y(t) + 5y(t) = u(t)$ When $y(0) = 1$ and $u(t)$ is a unit step function, $y(t)$ is $0.2 + 0.8e^{5t}$ $0.2  0.2e^{5t}$ $0.8 + 0.2e^{5t}$ $0.8  0.8e^{5t}$
asked
Mar 26, 2018
in
Differential Equations
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Milicevic3306
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34
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gate2014ec1
differentialequations
0
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20
GATE ECE 2014 Set 1  Question: 48
For the following feedback system $G(s) = \dfrac{1}{(s+1)(s+2)}.$ The $2\%$settling time of the step response is required to be less than $2$ seconds. Which one of the following compensators $C(s)$ achieves this? $3\bigg(\dfrac{1}{s+5}\bigg) \\$ $5\bigg(\dfrac{0.03}{s} + 1\bigg) \\$ $2(s+4) \\$ $4\bigg(\dfrac{s+8}{s+3}\bigg)$
asked
Mar 26, 2018
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Differential Equations
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Milicevic3306
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25
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gate2014ec1
differentialequations
0
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21
GATE ECE 2013  Question: 36
A system is described by the differential equation $\dfrac{\mathrm{d}^{2} y}{\mathrm{d} x} + 5\dfrac{\mathrm{d}y }{\mathrm{d} x} + 6y(t) = x(t).$ Let $x(t)$ be a rectangular pulse given by $x(t) = \begin{cases} 1&0<t<2 \\ 0&\text{otherwise} \end{cases}$ ... $\frac{e^{2s}}{(s+2)(s+3)} \\$ $\frac{1e^{2s}}{s(s+2)(s+3)} $
asked
Mar 26, 2018
in
Differential Equations
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Milicevic3306
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28
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gate2013ec
differentialequations
laplacetransform
0
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0
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22
GATE ECE 2013  Question: 37
A system described by a linear, constant coefficient, ordinary, first order differential equation has an exact solution given by $y(t)$ for $t>0,$ when the forcing function is $x(t)$ and the initial condition is $y(0).$ If one wishes to modify the ... forcing function to $j\sqrt{2}x(t)$ change the initial condition to $−2y(0)$ and the forcing function to $−2x(t)$
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Mar 26, 2018
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Differential Equations
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Milicevic3306
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31
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gate2013ec
differentialequations
0
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0
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23
GATE ECE 2012  Question: 34
Consider the differential equation $\frac{d^2y(t)}{dt^2}+2\frac{dy(t)}{dt}+y(t)=\delta(t)$ with $y(t)\big_{t=0^}=2$ and $\frac{dy}{dt}\big_{t=0^}=0$. The numerical value of $\frac{dy}{dt}\big_{t=0^+}$ is $2$ $1$ $0$ $1$
asked
Mar 25, 2018
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Differential Equations
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Milicevic3306
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45
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gate2012ec
differentialequations
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24
GATE ECE 2012  Question: 12
With initial condition $x(1)=0.5$, the solution of the differential equation, $t\frac{dx}{dt}+x=t$ is $x=t\frac{1}{2}$ $x=t^2\frac{1}{2}$ $x=\frac{t^2}{2}$ $x=\frac{t}{2}$
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Mar 25, 2018
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Milicevic3306
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gate2012ec
differentialequations
0
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25
GATE ECE 2018  Question: 50
The position of a particle $y\left ( t \right )$ is described by the differential equation: $\frac{d^{2}y}{dt^{2}}=\frac{dy}{dt}\frac{5y}{4}.$ The initial conditions are $y\left ( 0 \right )=1$ and $\frac{dy}{dt}\mid_{t=0}=0$. The position (accurate to two decimal places) of the particle at $t=\pi$ is _________.
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Feb 19, 2018
in
Differential Equations
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gatecse
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gate2018ec
numericalanswers
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secondorderdifferentialequation
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26
GATE ECE 2018  Question: 34
A curve passes through the point $\left ( x=1,y=0 \right )$ and satisfies the differential equation $\dfrac{\mathrm{dy} }{\mathrm{d} x}=\dfrac{x^{2}+y^{2}}{2y}+\dfrac{y}{x}.$ The equation that describes the curve is $\ln\left (1+\dfrac{y^{2}}{x^{2}}\right)=x1$ ... $\ln\left (1+\dfrac{y}{x}\right)=x1$ $\dfrac{1}{2}\ln\left (1+\dfrac{y}{x}\right)=x1$
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Feb 19, 2018
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Differential Equations
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gate2018ec
differentialequations
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27
GATE ECE 2018  Question: 12
Let $f\left ( x,y \right )=\dfrac{ax^{2}+by^{2}}{xy},$ where $a$ and $b$ are constants. If $\dfrac{\partial f}{\partial x}=\dfrac{\partial f}{\partial y}$ at $x = 1$ and $y = 2$, then the relation between $a$ and $b$ is $a=\dfrac{b}{4}$ $a=\dfrac{b}{2}$ $a=2b$ $a=4b$
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Feb 19, 2018
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gate2018ec
differentialequations
partialdifferentialequations
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28
GATE ECE 2018  Question: 4
Let the input be $u$ and the output be $y$ ... $y=au+b,b\neq 0$ $y=au$
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Feb 19, 2018
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gatecse
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gate2018ec
differentialequations
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29
GATE ECE 2017 Set 2  Question: 2
The general solution of the differential equation $\frac{d^2y}{dx^2}+2\frac{dy}{dx}5y=0$ in terms of arbitrary constants $K_1$ and $K_2$ is $K_1e^{(1+\sqrt{6})x}+K_2e^{(1\sqrt{6})x}$ $K_1e^{(1+\sqrt{8})x}+K_2e^{(1\sqrt{8})x}$ $K_1e^{(2+\sqrt{6})x}+K_2e^{(2\sqrt{6})x}$ $K_1e^{(2+\sqrt{8})x}+K_2e^{(2\sqrt{8})x}$
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Nov 23, 2017
in
Differential Equations
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admin
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gate2017ec2
differentialequations
secondorderdifferentialequation
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30
GATE ECE 2017 Set 1  Question: 29
Which one of the following is the general solution of the first order differential equation $\frac{dy}{dx}=(x+y1)^{2},$ where $x,y$ are real? $y=1+x+\tan^{1}(x+c)$, where $c$ is a constant $y=1+x+\tan(x+c)$, where $c$ is a constant $y=1x+\tan^{1}(x+c)$, where $c$ is a constant $y=1x+\tan(x+c)$, where $c$ is a constant
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Nov 17, 2017
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admin
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gate2017ec1
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