x 1 x 2 x 3 x 4 24 0

See a solution process below: Explanation: First, expand the term in parenthesis by multiplying the terms in parenthesis by the term outside the parenthesis: 2x+ (3)(x+ 2)− 6 ⇒ (x−2)(x+ 3) = 2x. (x-2) (x_3)=2x/. Resultado de (31x-8)-(3x)=12x-5: (31x-8)-(3x)=12x-5 Movemos todos los personajes a la izquierda: (31x-8)-(3x)-(12x-5)=0 Sumamos todos los números y todas las variables.-3x+(31x-8)-(12x-5)=0 Nos deshacemos de los paréntesis.-3x+31x-12x-8+5=0 Sumamos todos los números y todas las variables. 16x-3=0 Movemos todos los términos que contienen x al lado izquierdo, todos los demás términos al Solution. We have been given, 1 x - 1 x - 2 = 3, x ≠ 0, 2. Now we solve the above equation as follows, ( x - 2) - x ( x - 2) ( x) = 3. - 2 x 2 - 2 x = 3. -2 = 3x 2 - 6x. 3x 2 - 6x + 2 = 0. Now we also know that for an equation ax 2 + bx + c = 0, the discriminant is given by the following equation: Click here👆to get an answer to your question ️ If (2 - x^2)(x - 3)^3(x + 1)(x^2- 3x - 4)> 0 , then x belong to materi pai kelas 4 semester 2 kurikulum merdeka. x={ 0, 5, 5/2+-sqrt15/2i } Let fx = x-1x-2x-3x-4 Then f0 = -1-2-3-4 = 4! = 24 f5 = 5-15-25-35-4 = 432*1 = 4! = 24 So both x=0 and x=5 are roots and x and x-5 are factors. fx-24 = x-1x-2x-3x-4-24 =x^4-10x^3+35x^2-50x =xx-5x^2-5x+10 The remaining quadratic factor is in the form ax^2+bx+c, with a=1, b=-5 and c=10. This has zeros given by the quadratic formula x = -b+-sqrtb^2-4ac/2a =5+-sqrt5^2-4110/2 =5+-sqrt-15/2 =5/2+-sqrt15/2i Algebra Examples Popular Problems Algebra Solve for x 4x-3-2x-1>0 Step 1Simplify .Tap for more steps...Step each for more steps...Step the distributive by .Step the distributive by .Step by adding for more steps...Step from .Step and .Step 2Add to both sides of the 3Divide each term in by and for more steps...Step each term in by .Step the left for more steps...Step the common factor of .Tap for more steps...Step the common by .Step the right for more steps...Step by .Step 4The result can be shown in multiple FormInterval Notation

x 1 x 2 x 3 x 4 24 0