At which points on the curve $\alpha(t):=(3t-t^3,3t^2,3t+t^3)$ the corresponding tangent lines are parallel to the plane $3x+y+z+2=0$?
At which points tangent to a curve is parallel to given plane?
2 Answers
Hints:
- The tangent line at $t$ has direction $\alpha'(t)$
- The normal of a plane given by $ax + by + cz + d = 0$ is $(a,b,c)$.
- In order for a line to be parallel to a plane, its direction vector must be orthogonal to the normal to the plane.
This will give you a polynomial equation in $t$.
The tangent line at $t$ has slope $\alpha'(t) = (3-3t^2,6t, 3 + 3t^2)$, and for it to be parallel to the plane given by the equation $3x+y+z +2= 0$, with normal $(3,1,1)$, we must have $(3-3t^2,6t, 3 + 3t^2) \cdot (3,1,1) = 0$.
Then
$\begin{align*}&(3-3t^2,6t, 3 + 3t^2)\cdot (3,1,1)=9-9t^2+6t+3+3t^2=-6t^2+6t+ 12=0\\ &\Leftrightarrow t^2-t-2=0 \Leftrightarrow(t+1)(t-2)=0\end{align*}$
And we get
$t = -1$ or $t=2$.
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0@Gigili Sorry for this comment on an old answer but does this give the times $t$ at which the space curve is tangential to the plane? I'm doing a similar problem and I'm not sure if it's related to this. – 2016-11-02
$n=(3,1,2)$ is a normal vecttor to the plane . We have : $\alpha'(t)=(3-3t^2,6t,3+3t^2)$ is a tangent line director vector is parallel to the plane if it's normal to $n$, thus : $n.\alpha'(t)=0$, thus : $3(1-t^2) + 2t + 1+t^2=0$ $-2t^2 + 2t +4 =0 $ $t^2-t-2 =0 $ gives : $t=-1$ or $t=2$