### X2+5X+6=0 Factorizacion

### X2-5X+6=0 Por Factorizacion

x^{2}-5x+6=0 To solve the inequality, factor in the right side. You can factorize the quadratic equation ax2+bx+c=aleft(x-x 1 ight)left(x-x 2 ight), where x 1 and x 2 are the solutions to the quadratic equation ax2+bx+c=0.x=rac-left(-5 ight)sqrtleft(-5 ight)2-4.

### Factorizacion De Polinomios X2-5X+6

EXAMPLE 3: Factorize and solve the equation $latex = 9x2+6x+1=0 $. Solution: Using the same procedure as in the previous examples, we can obtain the factorized equation: 3x+1)(3x+1)=0 $latex $ We equalized each component to zero and came to the following conclusion: 3x+1=0 $latex $latex (3x+1)=$y $ $latex x=-rac13% $EJEMPLO 4 Factorize and solve the equation latex 6x2 $ -7x+2=0 $. Solution: We may start by separating the media term: latex 6x2 $ -4x-3x+2=0 $ And now we repeat the process of the previous examples: 2x(3x-2)-1(3x-2)=0 $latex $latex (3x-2, 2x-1)=0 $ We equalized each component to zero and came to the following conclusion: 3x-2=0 $latex $latex (2x-1)=0 $y $ $latex x=rac223 y=rac12 $ y $latex $

Ejercicios de factorizacin de polinomiosAnte que ver ejercicios de factorizacin de polinomios, saber con exactitud a que corresponden, ya que la factorizacin de polinomios is un contenido matematico que rene las tcnicas para escribirlos como producto de monomios This composition is based on the basic arithmetic theory, which guarantees the following:

Factorization is the opposite of expansion. If we write the number 3128 as (8 times 17 times 23), we will get useful information about the number. For example, 3128 is divisible by 8, 17, and 23. It is also possible to calculate (3128 div 23) without using a calculator. Similarly, in algebra, factorizing an algebraic expression is a very useful and vital skill. In fact, expanding a complicated parntesis collection in lgebra is not recommended unless you have another option. Factorization is often the best thing to do. Factorizacin also allows us to answer some types of equations and see them again when we look at quadratic equations and again in the mdulo TIMES Polinomios (Aos 9-10). A quadratic expression has the form (ax2+bx+c), where (a,b,c) are numbers associated with (a).