Download Visvesvaraya Technological University (VTU) BE ( Bachelor of Engineering) ECE (Electronic engineering) 2017 Scheme 2020 January Previous Question Paper 3rd Sem 17MAT31 Engineering Mathematics III
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Third Semester B.E. Degree Examination, Dec.2019/Jan.2020
Engineering Mathematics  III
Time: 3 hrs. Max. Marks: 100
Note: Answer any FIVE full questions, choosing ONE full question from each module.
Module1
1 a.
Find the Fourier series expansion of f(x) = x  x
2
in (?it, n), hence deduce that
rc

1 1 I 1
12 = 1
2
+ 2
2 4
3
2
+ 4
2
+ ?
(08 Marks)
b. Find the half range cosine series for the function f(x) = _( x 1)
2
in 0 < x < 1. (06 Marks)
c. Express y as a Fourier series upto first harmonics given
x 0 60
0
120? 180? 240? 300?
y 7.9 7.2 3.6 0.5 0.9 6.8
(06 Marks)
OR
2 a. Obtain the Fourier series for the function :
1 +
4x
in
3
? < x 0
3 2
1 
4x 3
in0
3 2
'
Hence deduce that Tr
1
? = ?+ ? + +
8 12
1
3'
1
5
x in 0 < x < y
2
TC ? x in V < x <
2
Show that the half range sine series as
4
f(x) = ? [sin x ,
3
4
5
2
sin 3x sin 5x
Obtain the Fourier series upto first harmonics given :
x 0 1 2 3 4 5 6
y 9 18 24 28 26 20 9
(06 Marks)
Module2
3 a. Find the complex Fourier transform of the function :
1 for I a
f(x) and hence evaluate f
sin x
dx .
0 for lxl>a
Find the Fourier cosine transform of e
ax
.
Solve by using z transforms u
n
,, ? 4u
n
= 0 given that uo = 0 and u
1
= 2.
f(x) =
b.
if f(x)
(08 Nlarks)
(06 'Marks)
c.
=X, .
b.
c.
(08 Marks)
(06 Marks)
(06 Marks)
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17MAT31
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Third Semester B.E. Degree Examination, Dec.2019/Jan.2020
Engineering Mathematics  III
Time: 3 hrs. Max. Marks: 100
Note: Answer any FIVE full questions, choosing ONE full question from each module.
Module1
1 a.
Find the Fourier series expansion of f(x) = x  x
2
in (?it, n), hence deduce that
rc

1 1 I 1
12 = 1
2
+ 2
2 4
3
2
+ 4
2
+ ?
(08 Marks)
b. Find the half range cosine series for the function f(x) = _( x 1)
2
in 0 < x < 1. (06 Marks)
c. Express y as a Fourier series upto first harmonics given
x 0 60
0
120? 180? 240? 300?
y 7.9 7.2 3.6 0.5 0.9 6.8
(06 Marks)
OR
2 a. Obtain the Fourier series for the function :
1 +
4x
in
3
? < x 0
3 2
1 
4x 3
in0
3 2
'
Hence deduce that Tr
1
? = ?+ ? + +
8 12
1
3'
1
5
x in 0 < x < y
2
TC ? x in V < x <
2
Show that the half range sine series as
4
f(x) = ? [sin x ,
3
4
5
2
sin 3x sin 5x
Obtain the Fourier series upto first harmonics given :
x 0 1 2 3 4 5 6
y 9 18 24 28 26 20 9
(06 Marks)
Module2
3 a. Find the complex Fourier transform of the function :
1 for I a
f(x) and hence evaluate f
sin x
dx .
0 for lxl>a
Find the Fourier cosine transform of e
ax
.
Solve by using z transforms u
n
,, ? 4u
n
= 0 given that uo = 0 and u
1
= 2.
f(x) =
b.
if f(x)
(08 Nlarks)
(06 'Marks)
c.
=X, .
b.
c.
(08 Marks)
(06 Marks)
(06 Marks)
171\
OR
4 a. Find the Fourier sine and Cosine transforms of :
x 0 < x < 2
f(x) =
0 elsewhere
b. Find the Z ? transform of : i) n
2
ii) ne
ar
'.
c. Obtain the inverse Z ? transform of 2z
2
+3z
(z+ 2)(z ?4)
(08 Marks)
(06 Marks)
(06 Marks)
Module3
5 a. 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
(08 Marks)
b.
Fit a parabola y = ax

bx + c in the least square sense for the data :
x 1 2 3 4 5
y 10 12 13 16 19
(06 Marks)
c. Find the root of the equation xe
x
cosx = 0 by Regula Falsi method correct to three
decimal places in (0, 1). (06 Marks)
OR
6 a. If 8x ? lOy + 66 = 0 and 40x ? 18y = 214 are the two regression lines, find the mean of x's,
mean of y's and the coefficient of correlation. Find o if 6
x = 3.
(08 Marks)
b. Fit an exponential curve of the form y = ae
bx
by the method of least squares for the data :
No. of petals 5 6 7 8 9 10
No. of flowers 133 55 23 7 2 2
(06 Marks)
c. Using Newton?Raphson method, find the root that lies near x = 4.5 of the equation tanx = x
correct to four decimal places. (06 Marks)
Mod u le4
7 a. From the following table find the number of students who have obtained marks :
i) less than 45 ii) between 40 and 45.
Marks 30 ? 40 40 ? 50 50 ? 60 60 ? 70 70 ? 80
No. of students 31 42 51 35 31
(06 Marks)
b. Using Newton's divided difference formula construct an interpolating polynomial for the
following data :
x 4 5 7 10 11 13
f(x) 48 100 294 900 1210 2028
and hence find f(8).
C.
Evaluate
dx
taking seven ordinates by applying Simpson s 78 rule.
o 1+x
(08 Marks)
(06 Marks)
2 of 3
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17MAT31
USN
a.;
U
co
CO
E
CO
CO
bl.)
0
et
v. F.,
+
r"1
:
13
`R.
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cu
O
[1:
0
V
U
et a
"G
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CO
co
0
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a. 0.,
0
?
co 4
?
>,,
t?.0
c
ri.) ?
.1)
O cu
s
r.)
8
r
~: ri
. .
0
z
CO
0
Third Semester B.E. Degree Examination, Dec.2019/Jan.2020
Engineering Mathematics  III
Time: 3 hrs. Max. Marks: 100
Note: Answer any FIVE full questions, choosing ONE full question from each module.
Module1
1 a.
Find the Fourier series expansion of f(x) = x  x
2
in (?it, n), hence deduce that
rc

1 1 I 1
12 = 1
2
+ 2
2 4
3
2
+ 4
2
+ ?
(08 Marks)
b. Find the half range cosine series for the function f(x) = _( x 1)
2
in 0 < x < 1. (06 Marks)
c. Express y as a Fourier series upto first harmonics given
x 0 60
0
120? 180? 240? 300?
y 7.9 7.2 3.6 0.5 0.9 6.8
(06 Marks)
OR
2 a. Obtain the Fourier series for the function :
1 +
4x
in
3
? < x 0
3 2
1 
4x 3
in0
3 2
'
Hence deduce that Tr
1
? = ?+ ? + +
8 12
1
3'
1
5
x in 0 < x < y
2
TC ? x in V < x <
2
Show that the half range sine series as
4
f(x) = ? [sin x ,
3
4
5
2
sin 3x sin 5x
Obtain the Fourier series upto first harmonics given :
x 0 1 2 3 4 5 6
y 9 18 24 28 26 20 9
(06 Marks)
Module2
3 a. Find the complex Fourier transform of the function :
1 for I a
f(x) and hence evaluate f
sin x
dx .
0 for lxl>a
Find the Fourier cosine transform of e
ax
.
Solve by using z transforms u
n
,, ? 4u
n
= 0 given that uo = 0 and u
1
= 2.
f(x) =
b.
if f(x)
(08 Nlarks)
(06 'Marks)
c.
=X, .
b.
c.
(08 Marks)
(06 Marks)
(06 Marks)
171\
OR
4 a. Find the Fourier sine and Cosine transforms of :
x 0 < x < 2
f(x) =
0 elsewhere
b. Find the Z ? transform of : i) n
2
ii) ne
ar
'.
c. Obtain the inverse Z ? transform of 2z
2
+3z
(z+ 2)(z ?4)
(08 Marks)
(06 Marks)
(06 Marks)
Module3
5 a. 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
(08 Marks)
b.
Fit a parabola y = ax

bx + c in the least square sense for the data :
x 1 2 3 4 5
y 10 12 13 16 19
(06 Marks)
c. Find the root of the equation xe
x
cosx = 0 by Regula Falsi method correct to three
decimal places in (0, 1). (06 Marks)
OR
6 a. If 8x ? lOy + 66 = 0 and 40x ? 18y = 214 are the two regression lines, find the mean of x's,
mean of y's and the coefficient of correlation. Find o if 6
x = 3.
(08 Marks)
b. Fit an exponential curve of the form y = ae
bx
by the method of least squares for the data :
No. of petals 5 6 7 8 9 10
No. of flowers 133 55 23 7 2 2
(06 Marks)
c. Using Newton?Raphson method, find the root that lies near x = 4.5 of the equation tanx = x
correct to four decimal places. (06 Marks)
Mod u le4
7 a. From the following table find the number of students who have obtained marks :
i) less than 45 ii) between 40 and 45.
Marks 30 ? 40 40 ? 50 50 ? 60 60 ? 70 70 ? 80
No. of students 31 42 51 35 31
(06 Marks)
b. Using Newton's divided difference formula construct an interpolating polynomial for the
following data :
x 4 5 7 10 11 13
f(x) 48 100 294 900 1210 2028
and hence find f(8).
C.
Evaluate
dx
taking seven ordinates by applying Simpson s 78 rule.
o 1+x
(08 Marks)
(06 Marks)
2 of 3
17MAT31
OR
8 a. In a table given below, the values of y are consecutive terms of a series of which 23.6 is the
6
th
term. Find the first and tenth terms of the series by Newton's formulas.
x 3 4 5 6 7 8 9
y 4.8 8.4 14.5 23.6 36.2 52.8 73.9
(08 Marks)
b. Fit an interpolating polynomial of the form x = f(y) for data and hence find x(5) given :
x 2 10 17
y 1 3 4
(06 Marks)
0.6
c.
Use Simpson's
3
rd
rule to find j e'dx by taking 6 subintervals.
U
(06 Marks)
Module5
9 a.
Verify Green's theorem in the plane for
4),(3x
2
8y
2
)dx
+ (4y ? 6xy)dy where C is the
closed curve bounded by y =Fc and y = x
2
. (08 Marks)
b. Evaluate xydx + xy'dy by Stoke's theorem where C is the square in the x ? y plane with
vertices (1, 0)(1, 0)(0, l)(0, ?1). (06 Marks)
c. Prove that Catenary is the curve which when rotated about a line generates a surface of
minimum area. (06 Marks)
OR
10 a. If F = 2xy + yz

X7 k and S is the rectangular parallelepiped bounded by x = 0, y = 0,
z = 0, x 2, y 1, = 3 evaluate
n ds
(08 Marks)
b.
?
d
Derive Euler's equation in the standard form viz ?
a
y
dx
of
a
y
'
= 0 . (06 Marks)
It
c.
Find the external of the functional 1=
6
1
.
? y
12
2y sin x )dx under the end conditions
y(0) = y(n/2) = 0. (06 Marks)
3 of 3
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This post was last modified on 02 March 2020