Let f(x) = {e^x, x < 0 {x+a, x ≥ 0, is continuous in (−∞, +∞), find a?

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Answer 1 · 2018-06-23T08:50:25

See explanation.

The function is:

$f(x)={(e^x;x<0),(x+a;x>=0):}$

For every $x in RR-{0}$ the function is continuous.

To make it continuous for all $x in RR$ we have to find the value of $a$ for which

The limit on the left side is $1$ and the limit on the right side is $a$ , so to make them equal $a$ must have the value of $1$

Answer: The function is contnuous for all $x in RR$ if $a=1$