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Prim · Answer 1 · 2019-07-16T11:48:13+0000

It is easy when we follow the method of substitution and probably the quickest way to obtain the answer. So, let us start without any wait by using LaTeX.

$\begin{bmatrix}(1)/(6)x & - & (1)/(2)y & = & 2 \\ \\ (1)/(3)x & - & (4)/(5)y & = & - 2 \end{bmatrix}$

Isolate the variable of x to proceed further for substitution.

$\bf{(1)/(6)x - (1)/(2)y + (1)/(2)y = 2 + (1)/(2)y}$

$\bf{6 * (1)/(6)x = 6 * 2 + 6 * (1)/(2)y}$

$\bf{(6 * 1)/(6)x = 12 + (6)/(2)y}$

$\bf{x = 12 + 3y}$

Let us substitute back into our equation marked as 2nd equation in this current system, that is:

$\bf{(1)/(3) \Big(12 + 3y \Big) - (4)/(5)y = - 2}$

$\bf{(12)/(3) + (3y)/(3) - (4)/(5)y = - 2}$

$\bf{y + 4 - (4)/(5)y = - 2}$

$\bf{y - (4)/(5)y + 4 - 4 = - 2 - 4}$

$\bf{y - (4)/(5)y = - 6}$

$\bf{y * 5 - (4)/(5)y * 5 = - 6 * 5}$

$\bf{5y - 4y = - 30}$

$\boxed{\mathbf{y = - 30}}$

$\bf{\since \quad y = - 30; \: \: x = 12 + 3y}$

$\mathbf{\therefore \quad x = 12 + 3 (- 30)}$

$\mathbf{x = 12 - 3 * 30}$

$\mathbf{x = 12 - 90}$

$\boxed{\mathbf{x = - 78}}$

Hope it helps.

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