Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
Solution Manual
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
,Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
Solutions to Exercises in Chapter 1
Section 1.2
1.1 A matrix is an orthogonal matrix if
XTX = I
Is the following matrix an orthogonal matrix?
−1 −1
1
X= 1 −1
2 −1 1
1 1
Solution:
x={{-1.,-1},{1,-1},{-1,1},{1,1}}/2;
Transpose[x].x//MatrixForm
yields
1 0
0 1
Therefore, X is an orthogonal matrix.
1.2 If
1 −1 1 1
A= B=
2 −1 4 −1
does (A + B)2 = A 2 + B 2?
Solution:
a={{1,-1},{2,-1}};
b={{1,1},{4,-1}};
((a+b).(a+b)-a.a-b.b)//MatrixForm
yields
0 0
0 0
Therefore, the expressions are equal.
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
,Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
1.3 Given the two matrices
1 4 −3 4 1
A= and B= 2 6
2 5 4 0 3
Find the matrix products AB and BA.
Solution:
1 4 −3 4 1 12 16
AB = =
2 6
2 5 4 0 3 18 44
4 1 6 21 −8
1 4 −3
BA = 2 6
= 14 38 18
0 3 2 5 4 6 15 12
Aa={{1,4,-3},{2,5,4}};
Bb={{4,1},{2,6},{0,3}};
Aa.Bb//MatrixForm
Bb.Aa//MatrixForm
1.4 Given the following matrices and their respective orders: A (nm), B (pm), and C (ns).
Show one way in which these three matrices can be multiplied. What is the order of the resulting
matrix?
Solution:
CT ABT → (n s)T (n m)( p m)T → (s n)(n m)(m p) → (s p)
1.5 Given
ab b2
A=
−a −ab
2
Determine A2.
Solution: From Eq. (1.13)
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
, Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
a12 a11 + a12a21 a12 (a11 + a22 )
a11 a a 2
AA =
a22 = a (a + a ) a a + a2
12 11
a21 a22 a21
21 11 22 21 12 22
a2b2 − a2b2 b2 (ab − ab)
= =0
−a (ab − ab ) −a b + a b
2 2 2 2 2
Aa={{a b, b^2},{-a^2,-a b}};
Aa.Aa//MatrixForm
1.6 Given the matrix
−4 −3 −1
A= 2 1 1
4 −2 4
Determine the value of 4I − 4A − A2 + A3.
Solution:
6 11 −3
A2 = −2 −7 3
−4 −22 10
−14 −1 −7
3
A = 6 −7 7
12 −30 22
Then,
1 0 0 −4 −3 −1
− 4
4I − 4 A − A + A = 4 0 1
2 3 0 2 1 1
0 0 1 4 −2 4
6 11 −3 −14 −1 −7
− −2 −7 3 + 6 −7 7
−4 −22 10 12 −30 22
0 0 0
= 0 0 0
0 0 0
Mathematica verification
Aa={{-4,-3,-1},{2,1,1},{4,-2,4}};
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
Solution Manual
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
,Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
Solutions to Exercises in Chapter 1
Section 1.2
1.1 A matrix is an orthogonal matrix if
XTX = I
Is the following matrix an orthogonal matrix?
−1 −1
1
X= 1 −1
2 −1 1
1 1
Solution:
x={{-1.,-1},{1,-1},{-1,1},{1,1}}/2;
Transpose[x].x//MatrixForm
yields
1 0
0 1
Therefore, X is an orthogonal matrix.
1.2 If
1 −1 1 1
A= B=
2 −1 4 −1
does (A + B)2 = A 2 + B 2?
Solution:
a={{1,-1},{2,-1}};
b={{1,1},{4,-1}};
((a+b).(a+b)-a.a-b.b)//MatrixForm
yields
0 0
0 0
Therefore, the expressions are equal.
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
,Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
1.3 Given the two matrices
1 4 −3 4 1
A= and B= 2 6
2 5 4 0 3
Find the matrix products AB and BA.
Solution:
1 4 −3 4 1 12 16
AB = =
2 6
2 5 4 0 3 18 44
4 1 6 21 −8
1 4 −3
BA = 2 6
= 14 38 18
0 3 2 5 4 6 15 12
Aa={{1,4,-3},{2,5,4}};
Bb={{4,1},{2,6},{0,3}};
Aa.Bb//MatrixForm
Bb.Aa//MatrixForm
1.4 Given the following matrices and their respective orders: A (nm), B (pm), and C (ns).
Show one way in which these three matrices can be multiplied. What is the order of the resulting
matrix?
Solution:
CT ABT → (n s)T (n m)( p m)T → (s n)(n m)(m p) → (s p)
1.5 Given
ab b2
A=
−a −ab
2
Determine A2.
Solution: From Eq. (1.13)
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
, Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
a12 a11 + a12a21 a12 (a11 + a22 )
a11 a a 2
AA =
a22 = a (a + a ) a a + a2
12 11
a21 a22 a21
21 11 22 21 12 22
a2b2 − a2b2 b2 (ab − ab)
= =0
−a (ab − ab ) −a b + a b
2 2 2 2 2
Aa={{a b, b^2},{-a^2,-a b}};
Aa.Aa//MatrixForm
1.6 Given the matrix
−4 −3 −1
A= 2 1 1
4 −2 4
Determine the value of 4I − 4A − A2 + A3.
Solution:
6 11 −3
A2 = −2 −7 3
−4 −22 10
−14 −1 −7
3
A = 6 −7 7
12 −30 22
Then,
1 0 0 −4 −3 −1
− 4
4I − 4 A − A + A = 4 0 1
2 3 0 2 1 1
0 0 1 4 −2 4
6 11 −3 −14 −1 −7
− −2 −7 3 + 6 −7 7
−4 −22 10 12 −30 22
0 0 0
= 0 0 0
0 0 0
Mathematica verification
Aa={{-4,-3,-1},{2,1,1},{4,-2,4}};
Solution Manual for Advanced Engineering Mathematics with Mathematica 1st edition by Edward Magrab
