Solving the Equation
To solve the equation x³ + 2x² + 0 = 0, we start by substituting u = x². This simplifies the equation significantly.
Step 1: Rewrite in Terms of u
Substituting u into the equation, we get:
u² + 2u + 0 = 0Step 2: Factor the Equation
Next, we need to factor the quadratic equation u² + 2u = 0.
By factoring, we can express it as:
u(u + 2) = 0Step 3: Find the Solutions for u
The factored equation u(u + 2) = 0 gives us the solutions:
- u = 0
- u + 2 = 0 → u = -2
Step 4: Return to x
Now we substitute back for x. Recall that u = x²:
- x² = 0 → x = 0
- x² = -2 → x = ±√-2 → x = ±i√2
Final Solutions
Thus, the solutions to the original equation x³ + 2x² = 0 are:
- x = 0
- x = ±i√2 (the imaginary solutions)
In summary, we used a substitution method to simplify and factor the equation, and by doing so, we identified both real and imaginary solutions for x.