6. $\lim_{t \to \infty} \left< te^{-t}, \frac{t^3 + t}{2t^3 - 1}, t \sin \frac{1}{t} \right>$
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The expression inside the limit is: lim t→0 (6t^3 - t^2)/(2t^3 * sin(t)) To simplify this expression, we can factor out t^2 from the numerator: lim t→0 (t^2 * (6t - 1))/(2t^3 * sin(t)) Show more…
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