Continuity of a Function at x=-3 - Proving c Value

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KevinFan
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For what value of the constant c is the following function continuous at x = −3?
f(x)=(1/x+1/3)/(x+3) if x≠ -3
f(x)=c if x=-3please provide proof... I am so confused:(
 
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fresh_42 said:
Please provide the reason of your confusion ...
I am confused because the second part of the function is just "c" which is a constant does not involve x.
 
fresh_42 said:
What happens with ##f(x)## for ##x \neq -3## if you simplify the fractions? Have you tried to draw a graph around ##x = -3##?
I have tried to simplfy the function, it is f(x)=1/(3x) and I noticed for the simplfied function, x can be -3
 
fresh_42 said:
What happens with ##f(x)## for ##x \neq -3## if you simplify the fractions? Have you tried to draw a graph around ##x = -3##?
oh, is C=1/(3(-3))=-1/9 ??
 
fresh_42 said:
Yes. So now you have to find an argument, why ##f(x)## becomes continuous if we set ##f(-3)= -\frac{1}{9}##.
Many thanks for your help !
 
fresh_42 said:
Yes. So now you have to find an argument, why ##f(x)## becomes continuous if we set ##f(-3)= -\frac{1}{9}##.
On the oringinal function when x= -3, the function is undefined. However, if we set f(-3)=-1/9 then the oringinal function will become continuous on x=-3.
I think I understand now, thank you again for your help