Active forum topics
- Inverse Trigo
- General Solution of $y' = x \, \ln x$
- engineering economics: construct the cash flow diagram
- Eliminate the Arbitrary Constants
- Law of cosines
- Maxima and minima (trapezoidal gutter)
- Special products and factoring
- Integration of 4x^2/csc^3x√sinxcosx dx
- application of minima and maxima
- Sight Distance of Vertical Parabolic Curve
New forum topics
- Inverse Trigo
- General Solution of $y' = x \, \ln x$
- engineering economics: construct the cash flow diagram
- Integration of 4x^2/csc^3x√sinxcosx dx
- Maxima and minima (trapezoidal gutter)
- Special products and factoring
- Newton's Law of Cooling
- Law of cosines
- Can you help me po to solve this?
- Eliminate the Arbitrary Constants
Recent comments
- Yes.1 month ago
- Sir what if we want to find…1 month ago
- Hello po! Question lang po…1 month 3 weeks ago
- 400000=120[14π(D2−10000)]
(…2 months 3 weeks ago - Use integration by parts for…3 months 3 weeks ago
- need answer3 months 3 weeks ago
- Yes you are absolutely right…3 months 3 weeks ago
- I think what is ask is the…3 months 3 weeks ago
- $\cos \theta = \dfrac{2}{…3 months 4 weeks ago
- Why did you use (1/SQ root 5…3 months 4 weeks ago
To factor out $x^3 + 3x^2 -4x
To factor out $x^3 + 3x^2 -4x - 12$, let's try thinking what might be its factors. Let's try $x+2$. If we divide $x^3 + 3x^2 -4x - 12$ by $x+2$, the quotient will be $x^2 + x -6$, remainder zero. If the reminder is zero when we divide a higher degree polynomial equation by a lower-degree polynomial equation, then this lower-degree polynomial equation is one of the factors of this higher-degree polynomial equation.
The factors of $x^3 + 3x^2 -4x - 12$ is $x^2 + x -6$ and $x+2$. But notice that the expression $x^2 + x -6$ can be factored out into $x+3$ and $x-2$. Therefore...the factored form of $x^3 + 3x^2 -4x - 12$ is $(x+3)(x-2)(x+2)$.
$$\color{green}{x^3 + 3x^2 -4x - 12 = (x+3)(x-2)(x+2)}$$
Alternate solutions are encouraged...