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Recent questions tagged exercise8-4
Questions
Show that the equation of the curve whose slope at any point is equal to $y+2x$ and which passes through the origin is $y\;=\;2(e^{x}-x-1)$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q9
mar-2010
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following. $(y - x)\large\frac{dy}{dx}$=$a^{2}$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q8
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following. $dx+x\;dy=e^{-y}\;\sec^{2}y\;dy$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q7
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following. $\large\frac{dy}{dx}$$+xy\;=\;x$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q6
modelpaper
mar-2009
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following. $\large\frac{dy}{dx}+\frac{y}{x}$$\;=\;\sin(x^{2})$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q5
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following. $(1+x^{2}) \large\frac{dy}{dx}$$+2xy\;=\; \cos$$ x$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q4
modelpaper
oct-2008
oct-2009
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following.$ \large\frac{dx}{dy}=\frac{x}{1+y^2}=\frac{\tan^{-1}}{1+y^2}$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q3
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following. $\large\frac{dy}{dx}+\frac{4x}{x^{2}+1}$$y=\large \frac{1}{(x^{2}+1)^{2}}$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q2
modelpaper
oct-2006
asked
Apr 16, 2013
by
poojasapani_1
1
answer
Solve the following. $\large\frac{dy}{dx}$$+y\;=\;x$
tnstate
class12
bookproblem
ch8
sec-1
exercise8-4
p140
q1
modelpaper
mar-2008
asked
Apr 16, 2013
by
poojasapani_1
1
answer
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