What is the new Transposing Method to solve linear equations?

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The Transposing Arrangement transposes the algebraic provisions (numbers, parameters, countenance...) from party to party of the equation by changing them to the facing signs, periodliness care the equation balanced. This arrangement has enlightened advantages aggravate the balancing arrangement

The balancing arrangement creates the embrace communication of algebraic provisions on the 2 partys of the of the equation. Example. Solve: ##x + (m - n)/2 = n + 3## ##x + (m - n)/2 - (m - n)/2 = n + 3 - (m - n)/2## ##x = n + 3 - (m - n)/2## This embrace communication looks uncompounded and gentle at the rise of one stride equation. However, when the equations get over intricate, this embrace communication takes too enlightened period and easily leads to error/mistake. The Transposing Arrangement smartly solves equations by enlightened uncompoundedr operations. Example. Solve: ##(m + n - p)/(q - r) = (t + u)/(x - 7).## ##(x - 7) = ((t + u)(q - r))/(m + n - p)## ##x = 7 + ((t + u)(q - r))/(m + n - p)## There is no enlightened communication of provisions on twain partys of the equation.

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