Show a flowline of a vector field?

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Suy
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Show a flowline of a vector field??

Homework Statement



Consider the vector field F(x,y,z)=(8y,8x,2z).
Show that r(t)=(e8t+e−8t, e8t−e−8t, e2t) is a flowline for the vector field F.

r'(t)=F(r(t)) = (_,_,_)

Now consider the curve r(t)=(cos(8t), sin(8t), e2t) . It is not a flowline of the vector field F, but of a vector field G which differs in definition from F only slightly.

G(x,y,z)=(_,_,_)

Homework Equations



The Attempt at a Solution



I guess the first part of the question r'(t)=F(r(t)) = (8e8t-8e-8t,8e8t-8e-8t,2e2t)

For the second part, I don't understand the question... hope someone can explain to me?
 
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Suy said:

Homework Statement



Consider the vector field F(x,y,z)=(8y,8x,2z).
Show that r(t)=(e8t+e−8t, e8t−e−8t, e2t) is a flowline for the vector field F.

r'(t)=F(r(t)) = (_,_,_)

Now consider the curve r(t)=(cos(8t), sin(8t), e2t) . It is not a flowline of the vector field F, but of a vector field G which differs in definition from F only slightly.

G(x,y,z)=(_,_,_)

Homework Equations



The Attempt at a Solution



I guess the first part of the question r'(t)=F(r(t)) = (8e8t-8e-8t,8e8t-8e-8t,2e2t)
Okay, and do you understand why that is "(8y, 8x, 2z)"?

For the second part, I don't understand the question... hope someone can explain to me?
Do the same thing. If [itex]r(t)= (x, y, z)= (cos(8t), sin(8t), e^{2t})[/itex] what is [itex]r'(t)[/itex]? What is that in terms of x, y, and z?
 


Thanks for the reply! It definitely helped me understanding the question! And I know how to do it now!