Let a be an integer coprime with 20. Then a is coprime with both 4 and 5. By the Fermat—Euler theorem, we have a^2 \equiv 1 \bmod 4 and a^4 \equiv 1 \bmod 5. By the Chinese Remainder ...

I assume that O(\Omega) is the set of holomorphic functions on \Omega, which many also denote as H(\Omega). The requisite such g(z) may be found constructively as follows: Pick z_0 \in \Omega ...

Set the two equations equal to each other. Then for each of the three coordinates, you will get an equation in s and t, so you will have three equations in two variables. If the two lines are ...

These very detailed notes (a student project) has all the details for this result, including all definitions and some examples. The limit for a Cauchy sequence (A_n) is the set of all limits of ...

\begin{align*} s_A &= u_A t+\frac{1}{2}a_A t^2 \\ &= 0(t)+\frac{1}{2}(1.5)t^2 \\ s_B &= u_B t+\frac{1}{2}a_B t^2 \\ &= 0(t)+\frac{1}{2}(2)t^2 \\ s_B &= s_A + 100 \\ t^2 &= 0.75t^2 ...

The map from I_0 to I_1 is the composite of the projection I_0\to\textrm{coker}\,i with the injection \textrm{coker}\,i\to I_1.