The equation can be rewritten as two separate equations joined by "and" as follows:
\( 4x^3 - 12 = 10 \) and \( +3 = 0 \)
If we consider the correct understanding:
\( 4x^3 - 12 + 3 = 10 \) splits into:
\( 4x^3 - 12 = 7 \) and \( = 0 \) (the latter equation only clarifies the constant on the right side but doesn't contribute meaningfully).
A more relevant separation is:
- \( 4x^3 - 12 + 3 = 10 \) (starting from the original)
- Which reduces to \( 4x^3 - 12 = 7 \)
So, the two equations are:
\( 4x^3 - 12 = 7 \) and \( 7 + 3 = 10 \).
Thus:
Final Form: \( 4x^3 - 12 = 7 \) and \( 7 + 3 = 10 \).