Notes - Continuous Mathematics HT23, Continuity
Continuity
What does it mean for a function $f : D \to \mathbb{R}, D \subseteq \mathbb{R}$ to be continuous at a point $x$?
What does it mean for a function $f : D \to \mathbb{R}, D \subseteq \mathbb{R}^n$ to be continuous at a point $\pmb x$?
Is the composition of two continuous functions continuous?
Yes.
Is $ \vert f \vert $ continuous if $f$ is?
Yes.
Under what conditions is $f^n$ continuous if $f$ is?
Under what conditions is $\log f$ continuous if $f$ is?
$f$ nonnegative.
Under what conditions is $f/g$ continuous if $f$ and $g$ are?
$g$ nonzero.
What does it mean for a function $f : D \to \mathbb{R}, D \subseteq \mathbb{R}$ to be differentiable at a point $x$?
How can you view the operator $\frac{\text{d}\space}{\text{d}x}$ as a function?
It takes in a function and produces a new function.
Is the composition of two differentiable functions differentiable?
Yes.
Is the maximum of two differentiable functions differentiable?
No.
Is the modulus of a differentiable function differentiable?
No.