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Title: TMC1874 Mathematics For Computing tutorial 3 solution
Description: Tutorial Solution Chapter 3: Determinants
Description: Tutorial Solution Chapter 3: Determinants
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TMC1874 Mathematics For Computing
Tutorial Solution
Chapter 3: Determinants
1
...
(a)
t
2
−3
t−1
(b)
t−1
−2
0
0
t
0
1
−1
t+1
Solution
(b)
−3
= t(t − 1) + 6 = t2 − t + 6
...
Compute the following determinants via reduction to triangular form
...
K
...
K
...
13
a1
3
...
c3
Solution
a1
b1
c1
(3R 2 + R 1 → R 1 )
(−2R 3 + R 1 → R 1 )
W
...
Tiong
a2
b2
c2
a 1 + 3b 1
b1
c1
a3
b3
c3
=5
a 2 + 3b 2
b2
c2
a 1 + 3b 1 − 2c 1
b1
c1
a 3 + 3b 3
b3
c3
a 2 + 3b 2 − 2c 2
b2
c2
=5
a 3 + 3b 3 − 2c 3
b3
c3
=5
Page 3 of 12
TMC1874 Mathematics For Computing
a 1 + 3b 1 − 2c 1
b1
c1
∴
a 2 + 3b 2 − 2c 2
b2
c2
a 3 + 3b 3 − 2c 3
b3
= 5
...
Evaluate following determinants via reduction to triangular form
...
K
...
t+2
(d) One possible solution:
t+1
2
t+1
−4
=
t−3
−4
(−
8+( t−3)( t+1)
t +1
2
2
R1 + R2 → R2)
t+1
= 8 + (t − 3)(t + 1) = t − 2t + 5
...
Let A =
4
2
1
3
−3
4
...
Let A =
2
1
−1
0
−1
2
1
2
0
−2
−3
−1
(a) det(M12 )
3
4
−2
5
...
K
...
Apply the theorem on page 21 (refer to lecture notes) to evaluate the given determinants
...
K
...
Let A = −3
4
2
4
−4
8
1
...
Solution
4
−4
A 11 =
A 21 =
A 31 =
−
1
−3
= 24, A 12 = −
5
4
1
−3
= 19, A 13 =
5
4
4
= −4,
−4
8
6
= −42, A 22 =
5
4
8
6
= −2, A 23 = −
5
4
2
= 32,
−4
2
−4
2
4
8
6
= −30, A 32 = −
1
−3
8
6
= −30, A 33 =
1
−3
2
= 30
...
W
...
Tiong
Page 7 of 12
TMC1874 Mathematics For Computing
Solution
6
| A | = −3
4
2
4
−4
8
4
1 =6
−4
5
1
−3
−2
5
4
1
−3
+8
5
4
4
−4
= 6(24) − 2(−19) + 8(−4)
= 150
(c) Show that A(adj A) = (adj A)A = det(A)I 3
...
Given
A −1 =
1
1
1
5
1
3
2
9
1
(d) 0
1
1
2
1
0
0 = det(A)I 3
1
0
0 = det(A)I 3
1
1
(adj A)
...
K
...
2
Finding cofactors:
1
2
A 21 =
−
A 31 =
2
2
= −4, A 12 = −
0
3
1
2
2
1
= 4, A 22 =
0
3
1
1
A 11 =
2
2
= 6, A 13 =
0
3
1
= 1,
2
2
1
= −6, A 23 = −
0
3
1
= 1,
2
2
1
= 0, A 32 = −
2
2
2
1
= 2, A 33 =
2
2
1
= −1
...
−1
Finding inverse:
−4
1
1
6
A −1 =
(adj A) =
det(A)
4
1
4
−6
1
−1
0
2 = 3
2
1
−1
4
1
0
−3
2
1
2
−1
4
1
4
...
K
...
3
By following the same procedure, we can find the value of the rest of cofactors
accordingly
...
1
2 −1 −2
15 −6 −6 −3
Hence,
A −1 =
−21
−4
1
15
1
1
(adj A) = −
det(A)
9
=
7
3
4
9
1
−9
5
−3
3
1
2
−6
−1
3
−1
9
−2
9
3
4
−1
−6
−1
3
−4
9
−2
3
1
9
2
9
1
3
1
9
2
3
2
3
6
−1
−2
−3
...
K
...
Page 10 of 12
TMC1874 Mathematics For Computing
The matrix is singular or noninvertible since the determinant is 0
...
3
Finding cofactors:
2
1
A 21 =
−
A 31 =
3
0
= 1, A 12 = −
2
1
3
0
= 3, A 13 =
2
1
1
1
1
1
= −1, A 22 =
2
1
1
1
= 1, A 23 = −
2
1
1
= 0,
1
1
2
A 11 =
2
= −2,
1
1
1
= 1, A 32 = −
3
0
1
1
= −3, A 33 =
3
0
1
= 2
...
2
Finding inverse:
1
1
1
−1
3
(adj A) =
A =
det(A)
2
−2
−1
1
0
1
1
2
−3 = 3
2
2
−1
−1
2
1
2
0
0
−3
...
1
The matrix is singular or noninvertible since the determinant is 0
...
If possible, solve the following linear system by Cramer’s rule:
3x
x
x
+
+
+
4y
2y
3y
+
6z
−
z
=
=
=
4
4
...
K
...
−1
Next, compute the determinant:
3
|A| = 1
1
4
2
3
6
0 = 4
...
Next, find the solution
4
4
8
3
1
1
y =
z
=
|A|
4
6
4
0
8 −1
3
1
1
x =
4
2
3
6
0
−1
|A|
4 4
2 4
3 8
|A|
=
−16
= −4,
4
=
16
= 4,
4
=
0
= 0
...
11
...
3
Solution
1
The coefficient matrix is A = 1
0
1
...
K
...
So the determinant is | A | = 1
0
1
5
4
3
−2
−3
2
3
2 =
1
1
= − = −1
Title: TMC1874 Mathematics For Computing tutorial 3 solution
Description: Tutorial Solution Chapter 3: Determinants
Description: Tutorial Solution Chapter 3: Determinants