Find r(t) if r'(t)=ti+e^tj+te^k and r(0)=i+j+k

illusiia

illusiia

Answered question

2021-10-17

Find r(t) if r(t)=ti+etj+tek and r(0)=i+j+k

Answer & Explanation

AGRFTr

AGRFTr

Skilled2021-10-18Added 95 answers

r(t)=ti+etj+tetk
r(0)=i+j+k
Integrate each component of r(t) separetly. For the first component:
tdt=12t2+c1
The 1st component of r(0) is 1, so we can solve for c1
12(0)2+c1=1
c1=1
So we have the first component for r(t):
(12t2+1)i
For the 2nd component:
etdt=et+c2
The 2nd component of r(0) is 1, so we can solve for c2
e0+c2=1
1+c2=1
c2=0
So the 2nd component for r(t) is etj
For the 3rd component use integration by parts:
u=t du=dt
dv=etdt v=et
tetdt=uvvdu
=tetetdt
=tetet+c3
The 3rd component of r(0) is 1, so we can solve for c3
0e0e0+c3=1
1+c3=1
c3=2
So the 2nd component for r(t) is: (tetet+2)k
Result: (12t2+1)i+etj+(tetet+2)k

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