spacewater
Junior Member
- Joined
- Jul 10, 2009
- Messages
- 67
Determine the values of b and c such that the function is continuous on the entire real number line.
\(\displaystyle f(x) =( x+1, 1< x < 3\)
\(\displaystyle ( x^2 +bx+c, |x-2|>= 1\)
Can someone point out the first step to approach this kind of problem?
\(\displaystyle f(x) =( x+1, 1< x < 3\)
\(\displaystyle ( x^2 +bx+c, |x-2|>= 1\)
Can someone point out the first step to approach this kind of problem?