The solution to \(\dfrac{{3x - 2}}{3} = 4\) is?
\(4\dfrac{2}{3}\)
The solution to \(\dfrac{{x - 1}}{{x + 2}}=\dfrac{{x + 3}}{{x - 1}}\) is?
\(x = - \dfrac{5}{7}\)
The solution to \(\dfrac{{a + 2}}{3} - \dfrac{{a + 1}}{2}=1\) is?
\(a = - 5\)
The solutions to \(y = x - 3\) and \(2x + 3y = 26\) are?
\(x = 7,\,y = 4\)
The solutions to \(2x + y=8\) and \(x - 3y = 11\) are?
\(x = 5,\,y = - 2\)
