Yahoo Answers is shutting down on May 4th, 2021 (Eastern Time) and beginning April 20th, 2021 (Eastern Time) the Yahoo Answers website will be in read-only mode. There will be no changes to other Yahoo properties or services, or your Yahoo account. You can find more information about the Yahoo Answers shutdown and how to download your data on this help page.
Trending News
Matrix "hence" question?
Basically I have this matrix question.
I succeeded in the first part, and the answers match.
Here are the answers:
x= (1/22)(a-3b+11c),
y=(1/22)(5a+7b-11c)
z=(1/22)(-13a-5b+11c)
Now the problem really arises from the Hence part.
It also says "otherwise", so I simply found the inverse using the Adjoint method.
However I am curious, what did I miss?
How can I use the results of x y and z to find the inverse?
I do realize that the equations can form the given matrix.
Thanks in advance!!
1 Answer
- IndicaLv 76 years agoFavorite Answer
You can write the system of equations as M[x,y,z] = [a,b,c] where M is the matrix of coefficients
The solution to this system is [x,y,z] = M⁻¹[a,b,c]
Hence if you know the solution for x,y,z and you express it in form [x,y,z]=N[a,b,c] then N=M⁻¹
Given solutions can be written [x,y,z] = (1/22){ {1,-3,11}, {5,7,-11}, {-13,-5,11} }[a,b,c] (matrix by row)
Hence M⁻¹ = (1/22){ {1,-3,11}, {5,7,-11}, {-13,-5,11} }
