Let $X$, $Y$, $Z$ be integral schemes of finite type over a field $K$ (i.e., locally affine opens are finitely-generated algebras over $K$). Suppose we have the following condition$\colon$ $f \colon Y \to X$ is finite, $g \colon Z \to X$ is dominant (i.e., there is an inclusion ${\cal O}_X \hookrightarrow {\cal O}_Z$). Consider the fibre product $Y \times_X Z$. Let $\eta_Z \colon= {\mathrm{Spec}}\,k(Z)$ be a generic point of $Z$. Q. Under the assumption - $k(Y) \cap k(Z) = k(X)$, - What is the example such that $Y \times_X Z$ is not integral ? -