If A and B are n by n matrices with all entries equal to 1, find (AB)i j. Summation | StudySoup

Textbook Solutions for Linear Algebra and Its Applications,

Chapter 1 Problem 1.4.18

Question

If A and B are n by n matrices with all entries equal to 1, find (AB)i j. Summation notation turns the product AB, and the law (AB)C = A(BC), into (AB)i j = k aikbk j j k aikbk j! c jl = k aik j bk jc jl! . Compute both sides if C is also n by n, with every c jl = 2.

Solution

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The first step in solving 1 problem number 18 trying to solve the problem we have to refer to the textbook question: If A and B are n by n matrices with all entries equal to 1, find (AB)i j. Summation notation turns the product AB, and the law (AB)C = A(BC), into (AB)i j = k aikbk j j k aikbk j! c jl = k aik j bk jc jl! . Compute both sides if C is also n by n, with every c jl = 2.
From the textbook chapter Matrices and Gaussian Elimination you will find a few key concepts needed to solve this.

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full solution

Title Linear Algebra and Its Applications, 4 
Author Gilbert Strang
ISBN 9780030105678

If A and B are n by n matrices with all entries equal to 1, find (AB)i j. Summation

Chapter 1 textbook questions

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