Let $Y^2=f(X)$ be an Elliptic curve over a finite field $\mathbb{F}_p$ where $f(X)=X^3+aX+b$
In an undergraduate coursebook on an Applied Algebra course it states that "It is plausible to suggest that $f(X)$ will be a quadratic residue for approximately half of all the points $X \in \mathbb{F}_p$."
I know that exactly half of all non-zero elements of $\mathbb{F}_p$ are quadratic residues and hence only half will be of the form $Y^2 = f(X)$ for some quadratic residue $Y$. But how does this imply that $f(X)$ will be a quadratic residue for approximately half of all points $X$ in $\mathbb{F}_p$? Is it not possible to have more than 2 distinct elements (say $3$ elements in this example) $X$ in $\mathbb{F}_p$ such that for some $Y^2$ we have $Y^2 = f(s) = f(t) = f(u)$ for distinct $x,t,u \in \mathbb{F}_p$?