PART ? A (25 Marks)
1 Form the differential equation by eliminating arbitrary constants a, b from
y = ae
3x
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+ be5x
,
2 Solve = + x
2
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(IX
3 Solve y" y = 0,, when y = 0 and y = 2 at x = 0.
4 Find the particular integral of (D
2
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+ 1)y = 8e-x
.
5 Classify the singular points of (I + 2y = 0.
6 prove that P
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n(l) = 1.
7 Show that J,
;2
(x)
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8 Prove that j" (ix = , ,C' ?1.0 CI'
(C' +1)
(log (:)(
9 Find the Laplace transform of e
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-tcost.
+ 2
10 Find inverse Laplace transform of
.s.(s ? 3)(s + 2)
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PART ? B (50 Marks)11 a) Find the orthogonal trajectories of r = ce
9
, where C is the parameter.
b) Solve
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d yv = y
2
(sinx + cos x).
dx
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12 a) Using the method of variation of parameters solve (D2
+1) y = x .
b) Solve (0
2
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? 4D + 2) y = 12ex
sin2x.
13 Obtain the series solution of the equation
x
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2y
r,
Ay
r ?
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(x2
14 a) Prove that 130
.
71,
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?Fon +
b) Prove that fl
o
(x) .1
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1(x) dv
1
4)y=0 about x = 0,
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2------ cos x.
27X
(2)
(3)
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(2)(3)
(2)
(3)
(2)
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(3)(2)
(3)
(
5
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)(5)
(
5
)
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(5
)
(10)
(
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5)
(
5
)
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....... . 2FirstRanker.com - FirstRanker's Choice
Code No. 6003 / M
FACULTY OF ENGINEERING and INFORMATICS
B.E. I Year (Main) Examination, June 2014
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Subject : Mathematics ? IITime : 3 hours Max. Marks : 75
Note: Answer all questions from Part-A. Answer any FIVE questions from Part-B.
PART ? A (25 Marks)
1 Form the differential equation by eliminating arbitrary constants a, b from
--- Content provided by FirstRanker.com ---
y = ae3x
+ be
5x
,
--- Content provided by FirstRanker.com ---
2 Solve = + x2
(IX
3 Solve y" y = 0,, when y = 0 and y = 2 at x = 0.
--- Content provided by FirstRanker.com ---
4 Find the particular integral of (D2
+ 1)y = 8e
-x
.
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5 Classify the singular points of (I + 2y = 0.6 prove that P
n
(l) = 1.
7 Show that J,
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;2(x)
8 Prove that j" (ix = , ,C' ?1.
0 CI'
(C' +1)
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(log (:)(9 Find the Laplace transform of e
-t
cost.
+ 2
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10 Find inverse Laplace transform of.s.(s ? 3)(s + 2)
PART ? B (50 Marks)
11 a) Find the orthogonal trajectories of r = ce
9
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, where C is the parameter.b) Solve
d y
v = y
2
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(sinx + cos x).dx
12 a) Using the method of variation of parameters solve (D
2
+1) y = x .
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b) Solve (02
? 4D + 2) y = 12e
x
sin2x.
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13 Obtain the series solution of the equationx
2
y
r,
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Ayr ?
(x
2
14 a) Prove that 130
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.71,
?
Fon +
b) Prove that fl
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o(x) .1
1
(x) dv
1
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4)y=0 about x = 0,
2
------ cos x.
27X
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(2)(3)
(2)
(3)
(2)
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(3)(2)
(3)
(2)
(3)
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(5
)
(5)
(
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5)
(
5
)
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(10)(
5
)
(
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5)
....... . 2
Code No. 6003 / M
-2?
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15 a) Apply convolution theorem to evaluate(
5
)
(s
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---2 +1)(s2+
b) Use Laplace transform to solve y' y = ex given that y(0) = 1.
(
5
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)16 a) Find the general solution and singular solution of the Clairaut's equation
(
5
)
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y= (x ? a) p p2
.
b) Solve the initial value problem ?2y' = 0 with y(0) = 1, ))
1
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(0) = 0.(
5
)
17 a) Prove that fi),?(x)1)?(x)cly = 0 if m 11 .
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(5
)
b) Find the Laplace transform of t sin
2
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(3t).(5)
* * *
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