Solve the following equation and check your answer:(2/3)(3x-2) = (4/5)(2x-3) - (4/3)

We have: ∴ x = -6 Check: Hence, LHS = RHS.

Mathematics

Solve the following equation and check your answer:
$\dfrac{2}{3}(3x - 2) = \dfrac{4}{5}(2x - 3)-\dfrac{4}{3}$

Linear Eqns One Variable

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Answer

We have:

$\phantom{=} \dfrac{2}{3}(3x - 2) = \dfrac{4}{5}(2x - 3)-\dfrac{4}{3} \\[1em] \Rightarrow \dfrac{6x - 4}{3} = \dfrac{12(2x - 3) - 20}{15} \\[1em] \Rightarrow \dfrac{6x - 4}{3} = \dfrac{24x - 36 - 20}{15} \\[1em] \Rightarrow \dfrac{6x - 4}{3} = \dfrac{24x - 56}{15} \\[1em] \Rightarrow 15(6x - 4) = 3(24x - 56) \quad \text{[By cross multiplication]} \\[1em] \Rightarrow 90x - 60 = 72x - 168 \\[1em] \Rightarrow 90x - 72x = 60 - 168 \quad \text{[Transposing -60 to RHS and +72x to LHS]} \\[1em] \Rightarrow 18x = -108 \\[1em] \Rightarrow x = \dfrac{-108}{18} \\[1em]$

∴ x = -6

Check:

$\text{LHS} = \dfrac{2}{3}(3x - 2) \\[1em] \phantom{\text{LHS}} = \dfrac{2}{3}(-20) \\[1em] \phantom{\text{LHS}} = -\dfrac{40}{3} \\[2em] \text{RHS} = \dfrac{4}{5}(2x - 3) - \dfrac{4}{3} \\[1em] \phantom{\text{RHS}} = \dfrac{4}{5}(-15) - \dfrac{4}{3} \\[1em] \phantom{\text{RHS}} = -12 - \dfrac{4}{3} \\[1em] \phantom{\text{RHS}} = -\dfrac{40}{3}$

Hence, LHS = RHS.

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Linear Eqns One Variable

Answer

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