VEDIC MATHEMATICS

  VEDIC MATHS                             By OMKAR TENDOLKA R Hello friends,                       This is  post number 43 from the series of "Vedic maths" blogs. Here in this blog we will learn about   " Simultaneous Linear Equations part-3 " . In the previous blog we studied how to solve two types of basic equations. In this blog we will  study how to solve simultaneous linear equations.  What Are Simultaneous Linear Equations? Simultaneous linear equations have two variables in them. Let us say x and y. Since there are two  variables in the equation we cannot solve it by itself. We need another equation with the same variable  values to find the answer. When these two equations are solved together we get the values of the  variables x and y. In the traditional method a new set of equations is formed in order to equalize the coefficients of  any one variable. But forming new equations is a time-consuming procedure. Secondly, equalizing the  coefficients is not alw

VEDIC MATHS                             By OMKAR TENDOLKA R Hello friends,                       This is  post number 41 from the series of "Vedic maths" blogs. Here in this blog we will learn about   " Simultaneous Linear Equations part-2 " . In the previous blog we studied how to solve two types of basic equations. In this blog we will  study how to solve simultaneous linear equations.  What Are Simultaneous Linear Equations? Simultaneous linear equations have two variables in them. Let us say x and y. Since there are two  variables in the equation we cannot solve it by itself. We need another equation with the same variable  values to find the answer. When these two equations are solved together we get the values of the  variables x and y. In the traditional method a new set of equations is formed in order to equalize the coefficients of  any one variable. But forming new equations is a time-consuming procedure. Secondly, equalizing the  coefficients is not alway

VEDIC MATHS                             By OMKAR TENDOLKA R Hello friends,                       This is  post number 41 from the series of "Vedic maths" blogs. Here in this blog we will learn about   " Simultaneous Linear Equations part-1 " . In the previous blog we studied how to solve two types of basic equations. In this blog we will  study how to solve simultaneous linear equations.  What Are Simultaneous Linear Equations? Simultaneous linear equations have two variables in them. Let us say x and y. Since there are two  variables in the equation we cannot solve it by itself. We need another equation with the same variable  values to find the answer. When these two equations are solved together we get the values of the  variables x and y. In the traditional method a new set of equations is formed in order to equalize the coefficients of  any one variable. But forming new equations is a time-consuming procedure. Secondly, equalizing the  coefficients is not alway

   VEDIC MATHS                             By OMKAR TENDOLKA R Hello friends,                       This is  post number 40 from the series of "Vedic maths" blogs. Here in this blog we will learn about   " General Equations " . In all the blogs that we have discussed till now have deals with the arithmetical part of Vedic  Mathematics. In this blog, we will study the algebraic part of this science.  In Vedic Mathematics there are many simple formulae for solving different types of equations.  Each such formula can be used for a particular category of equations.  TYPE 1: To  solve an equation of the type ax + b = cx + d.  Formula for this type of equation is,               d - b  x   =   ----------               a - c Examples: 1) Solve the equation 5x + 3  =  4x + 7 . The equation is of the type ax + b = cx +  d.  where the values of a, b, c and d are 5, 3, 4 and 7 respectively.  The value of x can be solved by using  the formula as follow:              d - b  x   =

  VEDIC MATHS                             By OMKAR TENDOLKA R Hello friends,                       This is  post number 39 from the series of "Vedic maths" blogs. Here in this blog we will learn about   " Application   Digit-Sum Method-2 " . Digit-Sum Method: All the techniques that we have discussed in previous posts till now have emphasized various methods of quick  calculation. They have helped us in reducing our time  in some cases provided the final  answer without any actual calculation. In this post, we will study the  digit-sum method . This method is not used for quick calculation  but only  for quick checking of answers. It will help us verify the answer that we have obtained to a  particular question. Although the digit-sum method is discussed by  Jagadguru Bharati Krishna Maharaj  in his study,  mathematicians in other parts of the world were aware of this principle even before the thesis of  Swamiji was published.  Prof. Jackaw Trachtenberg  and other m

VEDIC MATHS                             By OMKAR TENDOLKA R Hello friends,                       This is  post number 38 from the series of "Vedic maths" blogs. Here in this blog we will learn about   " Application   Digit-Sum Method-1 " . Digit-Sum Method: All the techniques that we have discussed in previous posts till now have emphasized various methods of quick  calculation. They have helped us in reducing our time  in some cases provided the final  answer without any actual calculation. In this post, we will study the  digit-sum method . This method is not used for quick calculation  but only  for quick checking of answers. It will help us verify the answer that we have obtained to a  particular question. Although the digit-sum method is discussed by  Jagadguru Bharati Krishna Maharaj  in his study,  mathematicians in other parts of the world were aware of this principle even before the thesis of  Swamiji was published.  Prof. Jackaw Trachtenberg  and other mat