Answer:
(30,35,0)
Step-by-step explanation:
We are given that
[tex]C(t)=(2t^2,t^3-4t,0)[/tex]
[tex]t_0=3,t_1=4[/tex]
The velocity of particle,[tex]v(t)=c'(t)=(4t,3t^2-4,0)[/tex]
Substitute [tex]t_0=3[/tex]
[tex]C(3)=(2(3)^2,(3)^3-4(3),0))=(18,15,0)[/tex]
[tex]v(3)=(4(3),3(3)^2-4,0)=(12,23,0)[/tex]
The tangent line at t=3 is given by
[tex]l(t)=c(2)+(t-3)v(3)=(18,15,0)+(t-3)(12,23,0)[/tex]
Now, substitute t=4
[tex]l(4)=(18,15,0)+(4-3)+(12,23,0)=(18,12,0)+(12,23,0)[/tex]
[tex]l(4)=(30,35,0)[/tex]
Hence, the position of particle at [tex]t_1=4[/tex]=(30,35,0)
