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Title: HNC HND in Mechanical Electrical Electronic Engineering Unit 1 - Analytical Methods for Engineers
Description: HNC HND in Mechanical Electrical Electronic Engineering Unit 1 - Analytical Methods for Engineers
Description: HNC HND in Mechanical Electrical Electronic Engineering Unit 1 - Analytical Methods for Engineers
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Tom Obrien
HNC Level 4
Unit Number and title: Unit 1
Analytical Methods for Engineers
Assignment Title: Calculus
Assignment Number: 3
Date: November 2016
1
Tom Obrien
HNC Level 4
Contents Page:
Page 1:
Page 2:
-
Title Page
-
Contents Page
-
Task 3
...
2
Question 1
Question 2
Question 3
Question 4
-
Task 3
...
4
Question 1
-
Task 3
...
4
Question 3
-
Task 3
...
5
Question 5a
Question 5b
Question 5c
Question 5di
-
Task 3
...
4
Question 6a
Question 6b
Question 6c
Page 3 to 4:
Page 5 to 6:
Page 7 to 8:
Page 9:
Page 9 to 10:
Page 10:
Page 11:
Page 12:
Page 13:
Page 14 to 15:
-
2
Tom Obrien
HNC Level 4
3
Task 3
...
2
1)
dy
= 6cosec 3t
dx
dy
= 18cosec 3t
dt
substitute t =
π
4
3π
3π
dy
= 18 cosec ×
× cot
4
4
dt
cot
2)
3t
3π
= tan
= −1
4
4
36 × −1 = −36
y = 3√x
2
y = 3x sin2x
1
Lny = ln(3) + ln(x) + ln(sin2x)
2
1 2cos2x
1 dy
= 0 + +
2x
sin2x
y dx
dy
1 2cos2x
=y
+
dx
2x
sin2x
3)
dy
= 3√x sin
dx
1 2cos2x
+
2x
sin2x
2arctan2x
u=
u = 2x
2
×2
1 + (2x)
u=
4
1 + 4x
Tom Obrien
HNC Level 4
4)
arcosh4x
u=
u=
u = 4x
1
(4x) − 1
4
√16x − 1
6
Tom Obrien
HNC Level 4
7
Task 3
...
4
1)
y=
x=
2x
− 5x + 12x − 7
3
dy
= 2x − 10x + 12
dx
−b ± √b − 4ac 10 ± (10 − 4 × 2 × 12)
=
2a
2×2
x=
10 + 2 10 − 2 10 ± √4
=
=
4
4
2×2
+x = 3 and − x = 2
d y
=2
d x
− 10 + 12 = 4 − 10
x = 3 so 4 × 3 − 10 = 2 (MAX)
2)
x = 2 so 4 × 2 − 10 = −2 (MIN)
A(surface area) = πr + 2πrh
v = 1000000 = πr h
h=
10
πr
a = πr + 2 ×
10
πr
a = πr + 2 × 10 × r
du
= 2πr
dx
da
= 2πr − 2 × 10 r
dr
= 2πr −
2x10
=0
r
2πr =
2x10
r
=0
Tom Obrien
HNC Level 4
r =
v+
v=
v=
v=
π
(hr + 2r
3
r=
π
(r +
3
π
(r +
3
π
(r
3
rh + h
v=
r) × (h +
r) × (h +
r 2r
r +r
2πrh
×
3
v=
2x10
r
3√10
= 68
...
2
π
h) − r h
3
πr
×
3
2πrh du
=
3
dv
dv
×
dh
h)
π
h) − r h
3
r
h+
π
h
h
r = 8cm
h = 0
...
2) ( × 8 × −0
...
702cm
π
h) − r h
3
Tom Obrien
HNC Level 4
11
4)
H = KI Rt
R=
H
KI t
1
dr
=
dt KI t
dr −2 × H
=
KI t
di
dr =
=±
−H
dr
=
dy KI t
1
−2H
−H
dht
di +
dt
KI t
KI t
KI t
0
...
0025
0
...
6 − ±0
...
0025
= ±0
...
95%
)
Tom Obrien
HNC Level 4
5)
S = 2t − 13t + 24t + 10
v=
dx
= 6t − 26t + 24t
dt
A=
dv d x
=
= 12t − 26
dt dt
so t = 0 and v = 10ms
5a)
so t = 0 and a = −26ms
t = 4s
v = (6 × 4) − (26 × 4) + (24 × 4) = 16ms
5b)
a = (12 × 4) − (26) = 22ms
t=
v = 6t − 26t + 24t
26 ± √−26t − 4 × 6 × 24
2×6
=
5c)
64 ± √100 64 ±
=
12
122
+=
10
5di)
37
9
and −=
6
2
a = 10
= 12t − 26
10 + 26
= t = 3s
12
5
a=5
= 12t − 26
5 + 26
= t = 2
...
8s
12
5e)
v = (6(3) − 26 × 3 + 24) − (6(2) − 26 × 2 + 24) = 100ms
13
Tom Obrien
HNC Level 4
14
6a)
6b)
y = 9−x
y=x +3
y=
9 − x dx
y=
x + 3dx
A=
A=
=
9×2−2
2
A=
−
9−x
2
x
+ 3x
3
9 × −3 − 3
2
= 16 + 31
...
5
−3
2
+3×2 −
+ 3 × 3 = 8 − −18 = 26
...
5 − 26
...
83
Tom Obrien
HNC Level 4
15
6c)
y = 9−x
y=x +3
y = (9 − x)(9 − x) = 81 − 9x − 9x − x
y = 81 − 18x + x
y = (x + 3)(x + 3) = (x + 3x + 3x + 9)
=
v=π
+6
+9
y dx
81 − 18 +
81x −
x
9x
+
3
x
x + 6x + 9x
x
+ 2x + 9x
5
=
−3
2
− 9 × −3 + 81 − 3
− 9 × 2 + 81 × 2 −
3
3
−(
2
−3
+2×2 +9×2 −
+2 −3 +9 −3 )
3
3
2
2
= (π 2 − 36 + 162 − (−9 − 81 − 243)) − (π 6 + 16 + 18 − (−48
...
6
5
3
= π 461
2
− π(170)
3
1450
...
3 cubic units
Title: HNC HND in Mechanical Electrical Electronic Engineering Unit 1 - Analytical Methods for Engineers
Description: HNC HND in Mechanical Electrical Electronic Engineering Unit 1 - Analytical Methods for Engineers
Description: HNC HND in Mechanical Electrical Electronic Engineering Unit 1 - Analytical Methods for Engineers