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Third Semester B.F. Degree Examination, Dec..241*Jan.2020
Engineering Mathematics ? III
Time: 3 hrs. Max. Marks: 80
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Note: Answer any FIVE full questions, choosing ONE fill! question from each module.Module- I
Obtain the Fourier expansion of the function f(x) = x over the interval (-7c, rc). Deduce that
1 1 1
? = 1 ?
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4 3 5 7(08 Marks)
The following table gives the variations of a periodic current A over a certain period T:
CS
E.
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15MAT31USN
b.
1 for
0 for
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?sin x
dx
Hence evaluate j
f(x)=
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xix
>a
(06 Marks)
t (sec) 0 T/6 T13 T/2 2T/3 5T/6 T
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A (amp) 1.98 1.30 1.05 1.30 -0.88 -0.25 1.98Show that there is a direct current part of 0.75amp in the variable current and obtain the
amplitude of the first harmonic. (08 Marks)
OR
2 a.
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.Obtain the Fourier series for the function f(x) = 0 x <
b. Represent the function
x, for 0 < x < it/2
f(x)
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"7 12 for rc/2in a half range Fourier sine series. (05 Marks)
C. Determine the constant term and the first cosine and sine terms of the Fourier series
expansion of y from t
(05 Marks)
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Module-23 'Find the complex Fourier transform of the function
xc' 0 45 90 135 180 225 270 315
y 2 3/2 1 1/2 0 1/2 1 3/2
b.
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If u(z)*3z +12
show that u
o
= 0 u
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1= 0 = 2 11. (05 Marks)
(7
-1
)
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c. Obtain the Fourier cosine:transform of the function4x, 0 < x
.
<1
f(x) = 4 x, I< x <4
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(05 Marks)0 X > 4
I
;
)
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".c.
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ofThird Semester B.F. Degree Examination, Dec..241*Jan.2020
Engineering Mathematics ? III
Time: 3 hrs. Max. Marks: 80
Note: Answer any FIVE full questions, choosing ONE fill! question from each module.
--- Content provided by FirstRanker.com ---
Module- IObtain the Fourier expansion of the function f(x) = x over the interval (-7c, rc). Deduce that
1 1 1
? = 1 ?
4 3 5 7
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(08 Marks)The following table gives the variations of a periodic current A over a certain period T:
CS
E.
15MAT31
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USNb.
1 for
0 for
?
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sin xdx
Hence evaluate j
f(x)=
x
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ix>a
(06 Marks)
t (sec) 0 T/6 T13 T/2 2T/3 5T/6 T
A (amp) 1.98 1.30 1.05 1.30 -0.88 -0.25 1.98
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Show that there is a direct current part of 0.75amp in the variable current and obtain theamplitude of the first harmonic. (08 Marks)
OR
2 a.
.
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Obtain the Fourier series for the function f(x) = 0 x <b. Represent the function
x, for 0 < x < it/2
f(x)
"7 12 for rc/2
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in a half range Fourier sine series. (05 Marks)C. Determine the constant term and the first cosine and sine terms of the Fourier series
expansion of y from t
(05 Marks)
Module-2
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3 'Find the complex Fourier transform of the functionxc' 0 45 90 135 180 225 270 315
y 2 3/2 1 1/2 0 1/2 1 3/2
b.
If u(z)
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*3z +12show that u
o
= 0 u
1
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= 0 = 2 11. (05 Marks)(7
-1
)
c. Obtain the Fourier cosine:transform of the function
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4x, 0 < x.
<1
f(x) = 4 x, I< x <4
(05 Marks)
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0 X > 4I
;
)
".
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c.1 of 3
b. Find the Fourier sine transform of f(x) =
OR
4 a. Obtain the Z-transform of cosnO and sinnO.
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15(06 Mark
and hence evaluate
f
x sin mx
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dx m > 0.1 + x
-
0
(05 Marks)
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c.Solve by using Z-transforms y,,, + 2v
+ yn n with yo = 0 =
yi.
(05 Marks)
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Module-35 a. Fit a second degree parabola y = ax' + bx + c in the least square sense for the following data
and hence estimate y at x = 6. (06 Marks)
b. Obtain the lines of regression and hence find the coefficient of correlation for the data:
x 1 3 4 2 5 8 9 10 13 15
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y 8 6 10 8 12 16 16 10 32 32(05 Marks'
c? Use Newton-Raphson method to find a real root of xsinx + cosx = 0 near x = rt. Carryout the
upto four decimal places of accuracy. (05 Marks)
OR
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6 a. Show that a real root of the equation tanx + tanhx = 0 lies between 2 and 3. Then apply theRegula Falsi method to find third approximation. (06 Marks)
b. Compute the coefficient of con
-
elation and the equation of the lines of regression for the
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data:x 1 2 3 4 5 6 7
y 9 8 10 12 11 13 14
(05 Marks)
c.
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Fit a curve of the form y = aebx
for the data:
x 0 2 4
y 8.12 10 31.82
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(05 Marks)Module-4
7 a. From the following table find the number of students who have obtained:
i) Less than 45 marks
ii) Between 40 and 45 marks.
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2 3 4 5y 10 12 13 16 19
Marks 30-40 40-50 50-60 60-70 70-80
Number of students 31 42 51 35 31
(06 Marks)
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b.Construct the interpolating polgnomial for the data given below using Newton's general
interpolation formula for divided differences and hence find y at x = 3.
x 2 4 5 6 8 10
y 10 96 196 350 868 1746
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(05 Marks)r
C. Evaluate dx by Weddle's rule. Taking seven ordinates. Hence find log
e
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2. (05 Marks)1 +
2 of 3
-
A4vC
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FirstRanker.com - FirstRanker's Choice
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Cip
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IgrAT;
of
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Third Semester B.F. Degree Examination, Dec..241*Jan.2020Engineering Mathematics ? III
Time: 3 hrs. Max. Marks: 80
Note: Answer any FIVE full questions, choosing ONE fill! question from each module.
Module- I
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Obtain the Fourier expansion of the function f(x) = x over the interval (-7c, rc). Deduce that1 1 1
? = 1 ?
4 3 5 7
(08 Marks)
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The following table gives the variations of a periodic current A over a certain period T:CS
E.
15MAT31
USN
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b.1 for
0 for
?
sin x
--- Content provided by FirstRanker.com ---
dxHence evaluate j
f(x)=
x
ix
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>a(06 Marks)
t (sec) 0 T/6 T13 T/2 2T/3 5T/6 T
A (amp) 1.98 1.30 1.05 1.30 -0.88 -0.25 1.98
Show that there is a direct current part of 0.75amp in the variable current and obtain the
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amplitude of the first harmonic. (08 Marks)OR
2 a.
.
Obtain the Fourier series for the function f(x) = 0 x <
--- Content provided by FirstRanker.com ---
b. Represent the functionx, for 0 < x < it/2
f(x)
"7 12 for rc/2
in a half range Fourier sine series. (05 Marks)
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C. Determine the constant term and the first cosine and sine terms of the Fourier seriesexpansion of y from t
(05 Marks)
Module-2
3 'Find the complex Fourier transform of the function
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xc' 0 45 90 135 180 225 270 315y 2 3/2 1 1/2 0 1/2 1 3/2
b.
If u(z)
*3z +12
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show that uo
= 0 u
1
= 0 = 2 11. (05 Marks)
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(7-1
)
c. Obtain the Fourier cosine:transform of the function
4x, 0 < x
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.<1
f(x) = 4 x, I< x <4
(05 Marks)
0 X > 4
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I;
)
".
c.
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1 of 3b. Find the Fourier sine transform of f(x) =
OR
4 a. Obtain the Z-transform of cosnO and sinnO.
15
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(06 Markand hence evaluate
f
x sin mx
dx m > 0.
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1 + x-
0
(05 Marks)
c.
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Solve by using Z-transforms y,,, + 2v+ yn n with yo = 0 =
yi.
(05 Marks)
Module-3
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5 a. Fit a second degree parabola y = ax' + bx + c in the least square sense for the following dataand hence estimate y at x = 6. (06 Marks)
b. Obtain the lines of regression and hence find the coefficient of correlation for the data:
x 1 3 4 2 5 8 9 10 13 15
y 8 6 10 8 12 16 16 10 32 32
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(05 Marks'c? Use Newton-Raphson method to find a real root of xsinx + cosx = 0 near x = rt. Carryout the
upto four decimal places of accuracy. (05 Marks)
OR
6 a. Show that a real root of the equation tanx + tanhx = 0 lies between 2 and 3. Then apply the
--- Content provided by FirstRanker.com ---
Regula Falsi method to find third approximation. (06 Marks)b. Compute the coefficient of con
-
elation and the equation of the lines of regression for the
data:
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x 1 2 3 4 5 6 7y 9 8 10 12 11 13 14
(05 Marks)
c.
Fit a curve of the form y = ae
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bxfor the data:
x 0 2 4
y 8.12 10 31.82
(05 Marks)
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Module-47 a. From the following table find the number of students who have obtained:
i) Less than 45 marks
ii) Between 40 and 45 marks.
2 3 4 5
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y 10 12 13 16 19Marks 30-40 40-50 50-60 60-70 70-80
Number of students 31 42 51 35 31
(06 Marks)
b.
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Construct the interpolating polgnomial for the data given below using Newton's generalinterpolation formula for divided differences and hence find y at x = 3.
x 2 4 5 6 8 10
y 10 96 196 350 868 1746
(05 Marks)
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rC. Evaluate dx by Weddle's rule. Taking seven ordinates. Hence find log
e
2. (05 Marks)
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1 +2 of 3
-
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?
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c)r)?7,
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LIBRARy
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015MAT31
OR
8 a. Use Lagrange's interpolation formula to find f(4) given below. (06 Marks)
6
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f(x) -4 mi 14 1584
b.
Use Simpson's 3/8
11
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' rule to evaluate I e"dxC.
The area of a circle (A) corresponding to diatneter (D) is given by
D 80 85 90 95 100
A 5026 5674 6362 7088 7854
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(05 Marks)Find the area corresponding to diameter 105 using an appropriate interpolation formula.
(05 Marks)
Module-5
9 a. Evaluate Green's theorem for (1),.(xy + y
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2) dx + x
2
dy where c is the closed curve of the region
bounded by y = x and y (06 Marks)
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b. Find the extrema! of the functional f (x2
+3/
2
+ 2y
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2+ 2xy)dx (05 Marks)
z,
c. Varity Stoke's theorem for F = (2x ? y) yz
2 .
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? y`z k where S is the upper half surface ofthe sphere x
2
+
y
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+ z-
= I C is its boundary. (05 Marks)
OR
of af
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10 a. Derive Euler's equation in the standard formd
0 .
dx , )
(06 Marks)
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0y1b. If F = 2xyi +3,
2
41+ xzk and S is the rectangular parallelepiped bounded by x ? 0, y = 0,
z = 0, x = 2, y = 1, z = 3. Evaluate if F.fids (05 Marks)
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c. Prove that the shortest distance between two points in a plane is along the straight linejoining them or prove that the geodesics on a plane are straight lines. (05 Marks)
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