Local Connectedness is not Preserved under Infinite Product

Theorem
The property of local connectedness is not preserved under the operation of forming an infinite product space.

Proof
Let $T = \left({\mathcal C, \tau_d}\right)$ be the Cantor space.

Let $A_n = \left({\left\{{0, 2}\right\}, \tau_n}\right)$ be the discrete space of the two points $0$ and $2$.

Let $\displaystyle A = \prod_{n \mathop = 1}^\infty A_n$.

Let $T' = \left({A, \tau}\right)$ be the product space where $\tau$ is the Tychonoff topology on $A$.

From Cantor Space as Countably Infinite Product, $T'$ is homeomorphic to $T$.

From Totally Disconnected and Locally Connected Space is Discrete, we have that $A_n$ is locally connected.

But we also have that the Cantor Space is not Locally Connected.

Hence the result.