Show that the graph ofr = ti +1 + tt j +1 t 2tk, t> 0lies in the plane x y + z + 1 = 0

Chapter 12, Problem 40

(choose chapter or problem)

Show that the graph of

$\mathbf{r}=t \mathbf{i}+\frac{1+t}{t} \mathbf{j}+\frac{-\mathbf{t}^{2}}{t} \mathbf{k}, \quad t>0$

lies in the plane $x-y+z+1=0$.

Equation Transcription:

𝐫 $=t$ 𝐢 $+\frac{1\ +\ t}{t}$ 𝐣 $+\frac{1\ -\ {t}^{2}}{t}$ 𝐤, $t>0$

$x-y+z+1=0$

Text Transcription:

r=ti +1 + t/t j+1 - t^2/t k, t>0

x-y+z+1=0

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