Answer:
[tex]\vec{r(t)}=t\hat{i}+6t^2\hat{j}+(3t^2+72t^4)\hat{k} \text{ For }t \in (-\infty, \infty)[/tex]
Step-by-step explanation:
First plug the equation of y into the equation of z, so that we get their intersection:
We plug
[tex]y=6x^2[/tex]
Into: [tex]z=3x^2+2y^2[/tex]
So, we get:
[tex]z=3x^2+2(6x^2)^2\\z=3x^2+2(36x^4)\\z=3x^2+72x^4[/tex]
Then we set
[tex] x=t[/tex]
And plug that in the equation [tex]y=6x^2[/tex] and the one we just got for z.
So that we get:
[tex]y=6t^2, z=3t^2+72t^4[/tex]
Therefore, the vector function that represents the curve of intersection is:
[tex]\vec{r(t)}=t\hat{i}+6t^2\hat{j}+(3t^2+72t^4)\hat{k} \text{ For }t \in (-\infty, \infty)[/tex]
