Complete

$(x+\square)^2=$

Question

Complete

$(x+\square)^2=$

GinnyAnswer · Answer

Assume the missing term is 'a'. 
 Expand the expression ( x + a ) 2 to get x 2 + 2 a x + a 2 . 
 Express the completed square in general form: ( x + a ) 2 = x 2 + 2 a x + a 2 . 
 The completed expression is ( x + a ) 2 = x 2 + 2 a x + a 2 . 
 
 Explanation 
 
 Understanding the Problem We are given an incomplete expression ( x + □ ) 2 and asked to complete it. This means we need to find what goes in the square. Let's call the missing term 'a'. 
 
 Expanding the Expression So we have ( x + a ) 2 . Expanding this gives us x 2 + 2 a x + a 2 . Since the problem is incomplete, we cannot determine a specific numerical value for 'a'. We need more information, such as the coefficient of the x term or the constant term after expansion. 
 
 General Form of Completed Square Without additional information, we can only express the completed square in general form: ( x + a ) 2 = x 2 + 2 a x + a 2 . 
 
 Final Answer Since we cannot determine a specific value for the missing term, we will express the answer in terms of a variable 'a'. Therefore, the completed expression is ( x + a ) 2 = x 2 + 2 a x + a 2 .

Examples 
 Completing the square is a technique used in algebra to convert a quadratic expression into a perfect square trinomial. For example, if you're trying to solve a quadratic equation like x 2 + 6 x + 5 = 0 , completing the square helps rewrite it in the form ( x + a ) 2 + b = 0 , making it easier to find the solutions for x . This method is also used in various fields like physics to solve problems involving projectile motion or optimization problems in engineering to design efficient systems.

Anonymous · Answer

To complete the expression (x+ox)^2 , we denote the missing term as 'a' and expand to get ( x + a ) 2 = x 2 + 2 a x + a 2 . This generalized expression allows us to represent our solution without specific values for 'a'. 
 ;

Complete $(x+\square)^2=$

Answer (2)

Related Questions in Mathematics

[Jawaban] Given these four points: $A(3,-10), B(-1,10), C(-8,-6), D(-10,-3)$, find the coordinates of the midpoint of line segments $A B$ and $C D$. Round decimals to the nearest tenth. midpoint of $A B(x, y)=($ , ) midpoint of $C D(x, y)=($ , )

[Jawaban] Solve $6 x+8 \leq 20$ or $5+4 x \geq 33$

[Jawaban] What are the solutions to the following system? $\begin{array}{l} -2 x^2+y=-5 \\ y=-3 x^2+5 \end{array}$ A. $(\sqrt{5},-10)$ and $(-\sqrt{5},-10)$ B. $(0,2)$ C. $(1,-2)$ D. $(\sqrt{2},-1)$ and $(-\sqrt{2},-1)$

[Jawaban] Solve the following division problem: $349 lb 6 oz \div 130$ Select one of four: A. 4 lb 3 oz B. 6 lb 7 oz C. 3 lb 9 oz D. 2 lb 11 oz

[Jawaban] Choose the improper fraction equivalent to the mixed number below. $9 \frac{4}{8}$ A. $\frac{77}{80}$ B. $\frac{76}{8}$ C. $\frac{75}{9}$ D. $\frac{75}{8}$

Complete

$(x+\square)^2=$