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Define f(1) in a way that extends f(s)=(s^3-1)/(s^2-1) to be continuous at s=1. Show step-by-step solution.

Define f(1) in a way that extends f(s)=(s^3-1)/(s^2-1) to be continuous at s=1. Show step-by-step solution.
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define f(1) in a way that extends f(s)=(s^3-1)/(s^2-1) to be continuous at s=1. Show step-by-step solution.

asked
User Sameer Damir
by
7.6k points

1 Answer

3 votes
for a function to be continous right hand limit should be equal to left hand limit
so que means that we have simply find the limit at s tends to 10
f(s)=[(s-1)(s^2+1s-1)]/[(s-1)(s+1...

=>f(s)=[s^2+1s+1]/(s+1)

putting s=1

f(s)=6
answered
User Charlton
by
8.0k points
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