Solve x2 + 12x = –11 by completing the square. which is the solution set of the equation? {–11, –1} {–11, 1} {11, –1} {11, 1}
Solve X2 + 12X = –11 By Completing The Square. Which Is The Solution Set Of The Equation? {–11, –1} {–11, 1} {11, –1} {11, 1}
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Solve X2 + 12X = –11 By Completing The Square. Which Is The Solution Set Of The Equation? {–11, –1} {–11, 1} {11, –1} {11, 1}. Rewrite the equation start by moving the constant term to the left side of the. The two solutions found are x = −11 and x = −1.
How to Complete the Square from mathsathome.com
Factor the perfect trinomial square into (x +6)2 (x + 6) 2. Which is the solution set of the equation? To solve the quadratic equation x2+12x=−11 by completing the square, we first need to add a constant to both sides of the equation to make the left side a perfect square trinomial.
Rewrite The Equation Start By Moving The Constant Term To The Left Side Of The.
If not, we take it as a. We can rewrite the equation as x 2 + 12x + 11 = 0. Free math problem solver answers your algebra, geometry, trigonometry, calculus,.
Solve The Equation For X X.
To complete the square, we first ensure that the coefficient of x 2 x^2 x2 is 1 1 1; In this exercise, we will solve the given quadratic equation by completing the square. To solve the quadratic equation x2+12x=−11 by completing the square, we first need to add a constant to both sides of the equation to make the left side a perfect square trinomial.
The Two Solutions Found Are X = −11 And X = −1.
By completing the square for the equation x2 + 12x = −11, we find the solutions to be x = −1 and x = −11. The correct answer is option a: Now find the factors of the equation after completing the square.
Factor The Perfect Trinomial Square Into (X +6)2 (X + 6) 2.
X 2 + 12x + 11 = 0. Which is the solution set of the equation?
