Can the following Bell states have probability amplitudes other than 1/2 and still be entangled?

Absolutely.

Given an arbitrary two-qubit state $|psi rangle $, it is NOT entangled if we can write $|psi rangle $ as: $$ |psi rangle = |arangle otimes |brangle hspace{.75 cm} textrm{where} |arangle, |b rangle in mathbb{C}^2 $$

Thus, there are many entangled states! Essentially, if you pick a random two-qubit pure state, it is most likely to be an entangled state. Now, not all entangled state are equal. Some are more entangled than other. For example, Bell states are maximal entangled state, but a state like $|psi rangle = dfrac{sqrt{3}}{2}|00rangle + dfrac{1}{2}|11rangle $ is less entangled than the Bell states. In fact, we can quantify this using the concept of "Concurrence" which is directly related to the concept of "Entanglement of Formation" (Here is the original paper on these concepts).

For the Bell state $|psi_{Bell} rangle = dfrac{|00rangle + |11rangle}{sqrt{2}} $, the Concurrence measurement is $1$, which is the same for entanglement of formation.

For another state, say the one you interested in, $|phi rangle = dfrac{sqrt{3}}{2}|00rangle + dfrac{1}{2}|11rangle $, you can work out the Concurrence measurement value for this state to be $dfrac{3}{4}$ which is less than $1$. Thus, one would say that this state is less entangled than the Bell state $|psi_{Bell} rangle$.