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Derivativeshard
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A particle traverses a path defined by the vector-valued function r(t)=⟨ln⁡(t),tan⁡−1(t)⟩\mathbf{r}(t) = \langle \ln(t), \tan^{-1}(t) \rangler(t)=⟨ln(t),tan−1(t)⟩ for t>0t > 0t>0. At what time ttt is the tangent line to the path parallel to the line y=12x+7y = \frac{1}{2}x + 7y=21​x+7?