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11 Samacheer Maths Solutions for 7.3.6

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11 Samacheer Maths Solutions for 7.3.6

7.3.6

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11 Samacheer Maths Solutions for 7.3.6

11 Samacheer Maths Solutions for 7.3.6 is given in a real board in a hand written format. This would be useful for students to understand the solution in easy and simple manner. The grasping power increases by reading the solution in a notes format. Hence we have given all the solution in volume 2 in this board format. Please share with your friends if you find this format useful.



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Other Solutions

Exercise 7.3

  • 11 Samacheer Maths Solutions

    6 Solutions

Exercise 7.3.1

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11 Samacheer Maths Solutions

    Exercise 7.3.2

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    11 Samacheer Maths Solutions

      Exercise 7.3.3

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      11 Samacheer Maths Solutions

        Exercise 7.3.4

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        11 Samacheer Maths Solutions

          Exercise 7.3.5

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          11 Samacheer Maths Solutions

            Exercise 7.3.6

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            11 Samacheer Maths Solutions

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              11 Samacheer Maths Solutions for 7.3.6

              It is one of the oldest concepts in the history of Mathematics.It hasTrademarkia hasThe concept were developed during the 17th century.The mathematicians needed matrices and determinants when they were trying to solve a problem with multiple linear equations.Some of the clay tablets that were made with the matrices are still preserved.

              The normal life has applications for this.In modern application the matrices can be used to solve complex problems using a computer.Predicting and model developments using matrices are included in the analytics problems.A lawyer and a mathematician in the 17th century came up with the idea of a matrix.Since the concept of matrix was invented it had a powerful application among the concepts of mathematics.

              In regards to organised cars in a parking area coconut trees in a farm land and storage of boxes in a storage area we can see matrices in common practise.The basis for the term determinants can be found in the form of a quadratic form.Gauss was the person who came up with this in the 17th century.The concept of determinants was redefined by another mathematician.The coefficients of a linear equation are written using matrices.

              In data is represented in excel spread sheet as a matrices which is used in almost all corporates and educational institutionsMany of the dashboard developed for management decision making and operational analysis are in a matrices format with rows and columns.A table with years in the columns and states in the rows can show the population in India over the past 10 years.There are rows and columns of elements distributed in two Dimentionals.The rows and columns are usually covered by a square brackets to indicate that a matrix has been created.

              If the matrices have A number of rows and B number of columns then the size of the matrices is determined by the number of rows and columns in the matrices.If there are 10 rows and 5 columns in a matrices the size is 50.The row matrices are the ones that have a single row.column matrices are the matrices that only have one column.The zero matrices are a type of matrices that all elements are 0.

              It's also known as a void matrix or a null matrix.equal number of row elements and column elements are what the square matrices have.In a square matrix the main diagonal is represented by elements that fall in the diagonal line.There are a lot of different names for that diagonal.It's called a diagonal main diagonal or leading diagonal elements.

              The rest of the elements are all zero on the unit matrix.All the elements in the diagonal will have the same value.The triangular matrix is a special type of matrix that is found in the square matrix.If all elements in the bottom of the diagonal are zero it's called the triangular matrix.If all the elements in the matrices are equal we can say that both are equal.

              If any of the elements isn't the same or not in the same order then it's a matrix.Adding subtracting and multiplication are some of the operations we can do on the matrix.It's impossible to division two matrices.The operations of addition subtraction and multiplication need to be satisfied before they can be performed.If we need to multiple a matrix with a constant then we need to add the elements of the matrix with the scalar element.

              If both matrices have the same number of rows and columns we are able to add and subtract matrices.The addition of matrix A with matrix B shows A+B of the elements of the matrix.The A-B of the elements of the matrices is indicated by the addition of Matrix A with Matrix B.We need to verify whether the number of rows and columns of one matrix is the same as the number of rows and columns in the other matrix.We need to mention in the result that it's not possible.