Podcast #128: We chat with Kent C Dodds about why he loves React and discuss what life was like in the dark days before Git. Listen now.

### Questions (15)

 7 Are there infinitely many primes that are 1 more a square-free number? 5 If $T$ is a bounded linear operator from $L^p(\mathbb{R})$ to $L^q(\mathbb{R})$ and $T$ is non-zero, then $p \leq q$ 4 How exactly is this integral finite? 4 How to show these moments are determined? 4 What is the Fixed Subfield of this Group?

### Reputation (566)

 +15 Maximum and minimum for $f(z)=z^m \Pi_n (1-z/a_n)$ and $g(z)=z^m \Pi_n(1-z/|a_n|)$ +10 Are there infinitely many primes that are 1 more a square-free number? +10 How to show these moments are determined? +10 If $T$ is a bounded linear operator from $L^p(\mathbb{R})$ to $L^q(\mathbb{R})$ and $T$ is non-zero, then $p \leq q$

 3 Does there exist an exponential function not vanishing at $-\infty?$ 2 Prove Limit to Infinity using Epsilon-N proof 1 How exactly is this integral finite? 1 $f_1 , f_2 , … , f_n$ is a sequence of holomorphic function in an open set $\Omega$ , and also $|f_1|+…+|f_n|$ attains its maximum in $\Omega$ 1 Boundedness of $|f^{'}(0)||$ given the following

### Tags (33)

 3 complex-analysis × 9 2 calculus × 2 3 functions × 2 1 improper-integrals × 3 3 analysis × 2 1 harmonic-functions × 2 3 exponential-function 1 inequality × 2 3 real-analysis 0 functional-analysis × 4