Find the general solution of y'' + 29y' + 208y = 0 Put your answer in the form y = C1x" e"1" + C2x"+e"2" or y = e"1" (C1 cos(qx) + C2 sin(qæ)) Show complete solution how you obtained r1 and r2 If ri < r2 then put ri first as exponent of the first term with C1 1. If ri > r2 then put ri as exponent of the 2nd term with C2 Solution: Answer: type answer here Find the general solution of y'' – 10y' + 21y = 0 Put your answer in the form y = C1x" e"1" + C2 x"+e"2* or y = e"1# (C1 cos(qx) + C2 sin(qæ)) Show complete solution how you obtained ri and r2 If rị < r2 then put ri first as exponent of the first term with C1 If ri > r2 then put ri as exponent of the 2nd term with C2 2. Solution: Answer: type answer here
Find the general solution of y'' + 29y' + 208y = 0 Put your answer in the form y = C1x" e"1" + C2x"+e"2" or y = e"1" (C1 cos(qx) + C2 sin(qæ)) Show complete solution how you obtained r1 and r2 If ri < r2 then put ri first as exponent of the first term with C1 1. If ri > r2 then put ri as exponent of the 2nd term with C2 Solution: Answer: type answer here Find the general solution of y'' – 10y' + 21y = 0 Put your answer in the form y = C1x" e"1" + C2 x"+e"2* or y = e"1# (C1 cos(qx) + C2 sin(qæ)) Show complete solution how you obtained ri and r2 If rị < r2 then put ri first as exponent of the first term with C1 If ri > r2 then put ri as exponent of the 2nd term with C2 2. Solution: Answer: type answer here
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Transcribed Image Text:Find the general solution of
y'' + 29y' + 208y = 0
Put your answer in the form y = C1x" e"1" + C2x"+e"2" or y = e"1" (C1 cos(qx) + C2 sin(qæ))
Show complete solution how you obtained r1 and r2
If ri < r2 then put ri first as exponent of the first term with C1
1.
If ri > r2 then put ri as exponent of the 2nd term with C2
Solution:
Answer:
type answer here
Find the general solution of
y'' – 10y' + 21y = 0
Put your answer in the form y = C1x" e"1" + C2 x"+e"2* or y = e"1# (C1 cos(qx) + C2 sin(qæ))
Show complete solution how you obtained ri and r2
If rị < r2 then put ri first as exponent of the first term with C1
If ri > r2 then put ri as exponent of the 2nd term with C2
2.
Solution:
Answer:
type answer here
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