A given set of vectors is said to form a basis if the set of vectors are both linearly independent and forms a spanning set for the given space. In this exercise, the learners are asked to determine whether the concatenated vectors are spanning set, linearly independent and form a basis. Required: 1. Create a function with three output [ss, li,bas] which will determine whether the vectors are spanning set, linearly independent and forms a basis for R^n. 2. The name of the function is splibas. 3. The function accepts the concatenated vectors A and the program will solve the reduced row echelon form from which the interpretation will be done whether the vectors are linearly independent, spanning set and forming a basis for R^n Function e H Save C Reset I MATLAB Documentation 1 %This program accepts the concatenated column vectors A, where the size of the Matrix will initially be checked. It will be transformed into its 2 %reduced row echelon form from which the program shall interpret whether it forms a basis, is linearly independent or spanning set for R^n. Code to call your function e C Reset A = [1 2 3;4 5 6;7 8 9] 2 [SS1, LI1, BAS1] = splibas(A)
A given set of vectors is said to form a basis if the set of vectors are both linearly independent and forms a spanning set for the given space. In this exercise, the learners are asked to determine whether the concatenated vectors are spanning set, linearly independent and form a basis. Required: 1. Create a function with three output [ss, li,bas] which will determine whether the vectors are spanning set, linearly independent and forms a basis for R^n. 2. The name of the function is splibas. 3. The function accepts the concatenated vectors A and the program will solve the reduced row echelon form from which the interpretation will be done whether the vectors are linearly independent, spanning set and forming a basis for R^n Function e H Save C Reset I MATLAB Documentation 1 %This program accepts the concatenated column vectors A, where the size of the Matrix will initially be checked. It will be transformed into its 2 %reduced row echelon form from which the program shall interpret whether it forms a basis, is linearly independent or spanning set for R^n. Code to call your function e C Reset A = [1 2 3;4 5 6;7 8 9] 2 [SS1, LI1, BAS1] = splibas(A)
Database System Concepts
7th Edition
ISBN:9780078022159
Author:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan
Publisher:Abraham Silberschatz Professor, Henry F. Korth, S. Sudarshan
Chapter1: Introduction
Section: Chapter Questions
Problem 1PE
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![A given set of vectors is said to form a basis if the set of vectors are both linearly independent and forms a spanning set for the given space. In this exercise, the learners are
asked to determine whether the concatenated vectors are spanning set, linearly independent and form a basis.
Required:
1. Create a function with three output [ss, li,bas] which will determine whether the vectors are spanning set, linearly independent and forms a basis for R^n.
2. The name of the function is splibas.
3. The function accepts the concatenated vectors A and the program will solve the reduced row echelon form from which the interpretation will be done whether the vectors are
linearly independent, spanning set and forming a basis for R^n
Function e
A Save
C Reset
I MATLAB Documentation
1 %This program accepts the concatenated column vectors A, where the size of the Matrix will initially be checked.
It will be transformed into its
2 %reduced row echelon form from which the
ogram shall interpret whether it forms a basis, is linearly independent or spanning set for R^n.
3
Code to call your function e
C Reset
1 A = [1 2 3;4 5 6;7 8 9]
2 [SS1, LI1,BAS1] = splibas (A)
3](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F164509af-de19-4a58-8e1f-bb47e22a8621%2F6f06cf42-79a8-4e79-9e7a-00bea3504193%2Fyp4h2eh_processed.png&w=3840&q=75)
Transcribed Image Text:A given set of vectors is said to form a basis if the set of vectors are both linearly independent and forms a spanning set for the given space. In this exercise, the learners are
asked to determine whether the concatenated vectors are spanning set, linearly independent and form a basis.
Required:
1. Create a function with three output [ss, li,bas] which will determine whether the vectors are spanning set, linearly independent and forms a basis for R^n.
2. The name of the function is splibas.
3. The function accepts the concatenated vectors A and the program will solve the reduced row echelon form from which the interpretation will be done whether the vectors are
linearly independent, spanning set and forming a basis for R^n
Function e
A Save
C Reset
I MATLAB Documentation
1 %This program accepts the concatenated column vectors A, where the size of the Matrix will initially be checked.
It will be transformed into its
2 %reduced row echelon form from which the
ogram shall interpret whether it forms a basis, is linearly independent or spanning set for R^n.
3
Code to call your function e
C Reset
1 A = [1 2 3;4 5 6;7 8 9]
2 [SS1, LI1,BAS1] = splibas (A)
3
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