Numerical Methods for Engineers
7th Edition
ISBN: 9780073397924
Author: Steven C. Chapra Dr., Raymond P. Canale
Publisher: McGraw-Hill Education
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Textbook Question
Chapter 10, Problem 9P
Solve the following set of equations with LU decomposition:
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The set of all 3 x 3 upper triangular matrices
6) Determine whether each of the following sets, together with the standard
operations, is a vector space. If it is, then simply write 'Vector space'. You do not
have to prove all ten vector space axioms. If it is not, then identify one of the ten
vector space axioms with its number in the attached sheet that fails and also show
that how it fails.
a) The set of all polynomials of degree four or less.
b) The set of all 2 x 2 singular matrices.
c) The set {(x, y) : x ≥ 0, y is a real number}.
d) C[0,1], the set of all continuous functions defined on the interval [0,1].
7) Given u = (-2,1,1) and v = (4,2,0) are two vectors in R³-space. Find u xv and
show that it is orthogonal to both u and v.
8) a) Find the equation of the least squares regression line for the data points
below.
(-2,0), (0,2), (2,2)
b) Graph the points and the line that you found from a) on the same Cartesian
coordinate plane.
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1
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1) a) Find a matrix P such that PT AP orthogonally diagonalizes the following matrix
A.
= [{² 1]
A =
b) Verify that PT AP gives the correct diagonal form.
2
01
-2
3
2) Given the following matrices A =
-1
0
1] an
and B =
0
1
-3
2
find the following matrices:
a) (AB) b) (BA)T
3) Find the inverse of the following matrix A using Gauss-Jordan elimination or
adjoint of the matrix and check the correctness of your answer (Hint: AA¯¹ = I).
[1 1 1
A = 3 5 4
L3 6 5
4) Solve the following system of linear equations using any one of Cramer's Rule,
Gaussian Elimination, Gauss-Jordan Elimination or Inverse Matrix methods and
check the correctness of your answer.
4x-y-z=1
2x + 2y + 3z = 10
5x-2y-2z = -1
5) a) Describe the zero vector and the additive inverse of a vector in the vector
space, M3,3.
b) Determine if the following set S is a subspace of M3,3 with the standard
operations. Show all appropriate supporting work.
Please help solve the following whilst showing all working out. Is part of exam revision questions but no solution is given
Chapter 10 Solutions
Numerical Methods for Engineers
Ch. 10 - 10.1 Use the rules of matrix multiplication to...Ch. 10 - 10.2 (a) Use naive Gauss elimination to decompose...Ch. 10 - 10.3 (a) Solve the following system of equations...Ch. 10 - 10.4 Solve the following system of equations using...Ch. 10 - Determine the total flops as a function of the...Ch. 10 - Use LU decomposition to determine the matrix...Ch. 10 - 10.7 Perform Crout decomposition on
Then,...Ch. 10 - The following system of equations is designed to...Ch. 10 - 10.9 Solve the following set of equations with LU...Ch. 10 - 10.10 (a) Determine the LU decomposition without...
Ch. 10 - Use the following LU decomposition to (a) compute...Ch. 10 - Determine Ae,A1,andAfor [A]=[82109131516] Scale...Ch. 10 - 10.13 Determine the Frobenius and the row-sum...Ch. 10 - 10.14 A matrix is defined as
Using the...Ch. 10 - 10.15 (a) Determine the condition number for the...Ch. 10 - 10.16 Determine the condition number based on the...Ch. 10 - Besides the Hilbert matrix, there are other...Ch. 10 - 10.18 Develop a user-friendly program for LU...Ch. 10 - Develop a user-friendly program for LU...Ch. 10 - Use iterative refinement techniques to improve...Ch. 10 - 10.21 Consider vectors:
Vector is...Ch. 10 - 10.22 Consider the following vectors:
Where is...Ch. 10 - 10.23 Let the function be defined on the interval ...Ch. 10 - 10.24 (a) Create a Hilbert matrix. This will be...Ch. 10 - Polynomial interpolation consists of determining...
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- please help me with this question with working out thanksarrow_forwardPage < 1 of 2 - ZOOM + 1) a) Find a matrix P such that PT AP orthogonally diagonalizes the following matrix A. = [{² 1] A = b) Verify that PT AP gives the correct diagonal form. 2 01 -2 3 2) Given the following matrices A = -1 0 1] an and B = 0 1 -3 2 find the following matrices: a) (AB) b) (BA)T 3) Find the inverse of the following matrix A using Gauss-Jordan elimination or adjoint of the matrix and check the correctness of your answer (Hint: AA¯¹ = I). [1 1 1 A = 3 5 4 L3 6 5 4) Solve the following system of linear equations using any one of Cramer's Rule, Gaussian Elimination, Gauss-Jordan Elimination or Inverse Matrix methods and check the correctness of your answer. 4x-y-z=1 2x + 2y + 3z = 10 5x-2y-2z = -1 5) a) Describe the zero vector and the additive inverse of a vector in the vector space, M3,3. b) Determine if the following set S is a subspace of M3,3 with the standard operations. Show all appropriate supporting work.arrow_forwardUsing Karnaugh maps and Gray coding, reduce the following circuit represented as a table and write the final circuit in simplest form (first in terms of number of gates then in terms of fan-in of those gates).arrow_forward
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- Find the sum of products expansion of the function F (x, y, z) = ̄x · y + x · z in two ways: (i) using a table; and (ii) using Boolean identitiesarrow_forwardThe NOR operator, denoted as ↓, behaves as 0 ↓ 0 = 1, 0 ↓ 1 = 0, 1 ↓ 0 = 0,1 ↓ 1 = 0. Show that the any Boolean function over any number of variables can be expressed using onlyNOR operators (in addition to those variables and constants). HINT: Recall that any Boolean function hasa representation as a sum of products expansionarrow_forwardConsider the Turing machine given in lecture which decides the languageB = {w#w | w is a binary string}.Simulate the Turing machine to show that the string 1001#1001 will be accepted by the Turing machine. Show all steps.arrow_forward
- Q/Find the Laurent series of (2-3) cos↓ around z = 1. 2-1arrow_forward#1). A technique is given with 150 mAs is 40 kV and produces an EI value = 400. Find the new EI value, if mAs is 75 and 34 kV are used.arrow_forwardQ3: Answer the following: (i) Let f(z) is an analytic function in a simply connected domain S and y is a simple, closed, positively oriented contour lying in S. Prove that f, f(z)dz = 0.arrow_forward
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