%5E2%2B4(x%2B2)%2B3.jpeg "(x+2)^2+4(x+2)+3")
Factoring and Solving (x+2)^2 + 4(x+2) + 3
This expression, (x+2)^2 + 4(x+2) + 3, appears complex, but can be easily factored and solved by understanding a few key concepts:
Recognizing the Pattern
The expression is structured in a way that resembles a quadratic equation. Notice the repeated term "(x+2)". We can simplify this by making a substitution.
Let: u = (x+2)
Now our expression becomes: u^2 + 4u + 3
Factoring the Quadratic
The quadratic expression u^2 + 4u + 3 can be factored by finding two numbers that add up to 4 (the coefficient of the middle term) and multiply to 3 (the constant term).
These numbers are 1 and 3:
- 1 + 3 = 4
- 1 * 3 = 3
Therefore, we can factor the quadratic as: (u + 1)(u + 3)
Back-Substituting
Now, let's substitute back our original value for u:
(u + 1)(u + 3) becomes ((x+2) + 1)((x+2) + 3)
Simplifying
Finally, we can simplify the expression:
- (x + 3)(x + 5)
Finding the Solutions
To find the solutions (also called roots or zeros), we set the expression equal to zero and solve for x:
- (x + 3)(x + 5) = 0
This means either (x + 3) = 0 or (x + 5) = 0.
- Therefore, x = -3 or x = -5
Conclusion
We've successfully factored and solved the expression (x+2)^2 + 4(x+2) + 3 by using substitution, recognizing the quadratic pattern, and applying basic factorization techniques. The solutions to this expression are x = -3 and x = -5.