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The denominators of each fraction are different, \(3t\) and \(7t\), so a common denominator must be created. This is found by working out the lowest common multiple of \(3t\) and \(7t\) which is \(21t\).

\(\frac{5}{3t} - \frac{2}{7t}\)

To create a common denominator of \(21t\), the first fraction's numerator and denominator must be multiplied by 7 and the second fraction's numerator and denominator must be multiplied by 3:

\(\frac{35}{21t} - \frac{6}{21t}\)

\(\frac{35 - 6}{21t} = \frac{29}{21t}\)

This fraction cannot be simplified any further, so \(\frac{29}{21t}\) is the final answer.

\((y + 4) \times (y - 2)\) can be written as \((y + 4)(y - 2)\).

\(\frac{2}{y + 4}\) (multiply numerator and denominator by \(y - 2\)) \(+ \frac{3}{y - 2}\) (multiply numerator and denominator by \(y + 4\)) \(= \frac{2(y - 2)}{(y + 4)(y - 2)} + \frac{3(y + 4)}{(y - 2)(y + 4)}\)

\(2(y - 2) = 2 \times y + 2 \times -2 = 2y + -4 = 2y - 4\)

\(3(y + 4) = 3 \times y + 3 \times 4 = 3y + 12\)

This gives \(\frac{2y - 4}{(y + 4)(y - 2)} + \frac{3y + 12}{(y - 2)(y + 4)}\).

\(= \frac{2y - 4 + 3y + 12}{(y - 2)(y + 4)}\)

Collect the like terms: \(2y - 4 + 3y + 12\). \(2y + 3y = 5y\). \(-4 + 12 = 8\).

\(= \frac{5y + 8}{(y - 2)(y + 4)}\)