Let us learn about inverse of matrix
A matrix can be defined as the table of values arranged in row and column form which represent one or more linear algebraic equations.
There are many different ways to solve a matrix based on the given linear equations.
The operations performed over the matrix are multiplication, division, addition, subtraction and even inverse.
Solving matrices may be difficult at first, but with hard-working, studying and practice you can be able to work through any matrix problem.
• Let us consider the given problem(s) and form the matrix from the given linear equations. You are supposed to solving two or more problems given in algebraic or linear form.
• Rewrite these equations into matrix form, by start writing the numbers left of the equal symbol in equation 1 over the numbers left of the equal symbol in equation 2. This matrix can be named as "A."
• Now replace the letter x over letter y. this matrix can be named as "X."
• At last, write the number right of the equal symbol in equation 1 over the number right of the equal symbol in equation 2.
• This is referred as matrix "B."
Inverse of a Matrix:
To determine the inverse of the given matrix A. The inverse of a function can be obtained by dividing the function by 1, the inverse of A matrix can be obtained by placing a 1 on the cross-multiplied value of the matrix A.
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