To the first point: you have k-linear maps \theta\colon A \to k^n and \theta'\colon {\frak a}/{\frak a^2} \to k^n and the second an isomorphism, so to compute the dimension of \theta(\mathfrak{b}) ...

In general that's false, but a similar result is true: \begin{align} \int_{x_1}^{x_2}\int_{y_1}^{y_2}g(x)+h(y)\ dxdy &= \int_{x_1}^{x_2}\int_{y_1}^{y_2}g(x)\ dxdy + \int_{x_1}^{x_2}\int_{y_1}^{y_2} h(y)\ dxdy \\ &= (y_2-y_1)\int_{x_1}^{x_2}g(x)\ dx + (x_2-x_1)\int_{y_1}^{y_2}h(y)\ dy \end{align}

Suppose we had functions g,h with g(x) h(y) = 1 - x^2 y^2 . Then substituting in x:=1, y:=1 , we would have g(1) h(1) = 0 , so either g(1) = 0 or h(1) = 0 . But we also must have ...

1) Let \epsilon>0. Then there is N\in\mathbb N with \displaystyle\sum_{n=N+1}^\infty |y_n|<\epsilon. Now the collection \{a_1,...,a_N\} is finite so we can find a continuous function \phi:[0,1]\to \mathbb C ...

I was able to construct a counterexample to show that it does not follow that f is differentiable at the origin but I am not sure if how that relates to the continuity of f . Consider the ...

To prove your (two-variable) function is continuous at (0,0), you have to prove f(x,y)\rightarrow f(0,0) for (x,y)\rightarrow(0,0), along any path. However, to prove it's not continuous at (0,0) ...