Find all values of t such that \(6t - \frac23 + \frac{t}{5} = 4 + \frac{2-t}{3} \) .
If you find more than one answer, enter every answer you find as list separated by commas.
+118667 \(6t - \frac23 + \frac{t}{5} = 4 + \frac{2-t}{3}\)
The lowest common denominator is 15 so multiply both sides by 15
\(6t - \frac23 + \frac{t}{5} = 4 + \frac{2-t}{3}\\ 15(6t - \frac23 + \frac{t}{5}) = 15(4 + \frac{2-t}{3})\\ 90t-10+3t=60+5(2-t)\)
Can you take it from there?
