(e) \( 6 s^{2}-7 s t-5 t^{2} \)

This quadratic expression is an excellent candidate for factoring! To factor \( 6s^2 - 7st - 5t^2 \), we look for two numbers that multiply to \( 6 \times (-5) = -30 \) and add to \( -7 \). Those numbers are \( -10 \) and \( 3 \). We can then rewrite the expression and use grouping to factor it completely. After a bit of rearrangement, we get \( 6s^2 - 10st + 3st - 5t^2 \). Grouping terms gives us \( (6s^2 - 10st) + (3st - 5t^2) \), which factors down to \( 2s(3s - 5t) + t(3s - 5t) \). Finally, we can factor out \( (3s - 5t) \), yielding \( (3s - 5t)(2s + t) \). Voila! Alternatively, if factoring isn’t your favorite pastime, you could also employ the quadratic formula. Just bear in mind, it might get a tiny bit more complex!