Difference between revisions of "2005 AMC 12A Problems/Problem 9"

Latest revision as of 01:45, 14 January 2021

Problem

There are two values of $a$ for which the equation $4x^2 + ax + 8x + 9 = 0$ has only one solution for $x$ . What is the sum of these values of $a$ ?

$(\mathrm {A}) \ -16 \qquad (\mathrm {B}) \ -8 \qquad (\mathrm {C})\ 0 \qquad (\mathrm {D}) \ 8 \qquad (\mathrm {E})\ 20$

Solution

Video Solution

https://youtu.be/3dfbWzOfJAI?t=222 ~pi_is_3.14

Solution 1

A quadratic equation always has two roots, unless it has a double root. That means we can write the quadratic as a square, and the coefficients 4 and 9 suggest this. Completing the square, $0 = (2x \pm 3)^2 = 4x^2 \pm 12x + 9$ , so $\pm 12 = a + 8 \Longrightarrow a = 4, -20$ . The sum of these is $-20 + 4 = -16 \Rightarrow \mathrm{(A)}$ .

Solution 2

Another method would be to use the quadratic formula, since our $x^2$ coefficient is given as 4, the $x$ coefficient is $a+8$ and the constant term is $9$ . Hence, $x = \frac{-(a+8) \pm \sqrt {(a+8)^2-4(4)(9)}}{2(4)}$ Because we want only a single solution for $x$ , the determinant must equal 0. Therefore, we can write $(a+8)^2 - 144 = 0$ which factors to $a^2 + 16a - 80 = 0$ ; using Vieta's formulas we see that the sum of the solutions for $a$ is the opposite of the coefficient of $a$ , or $-16 \Rightarrow \mathrm{ (A)}$ .

Solution 3

Using the discriminant, the result must equal $0$ . $D = b^2 - 4ac$ $= (a+8)^2 - 4(4)(9)$ $= a^2 + 16a + 64 - 144$ $= a^2 + 16a - 80 = 0 \Rightarrow$ $(a + 20)(a - 4) = 0$ Therefore, $a = -20$ or $a = 4$ , giving a sum of $-16 \Rightarrow \mathrm{ (A)}$ .

Solution 4

First, notice that for there to be only $1$ root to a quadratic, the quadratic must be a square. Then, notice that the quadratic and linear terms are both squares. Thus, the value of $a$ must be such that both $(2x+3)^2$ and $(2x-3)^2$ . Clearly, $a=4$ or $a=-20$ . Hence $-20 + 4 = -16 \Rightarrow \mathrm{(A)}$ .

Solution by franzliszt

@@ Line 5: / Line 5: @@
 == Solution ==
+=== Video Solution ===
+https://youtu.be/3dfbWzOfJAI?t=222
+~pi_is_3.14
+=== Solution 1 ===
 A [[quadratic equation]] always has two roots, unless it has a double root. That means we can write the quadratic as a square, and the coefficients 4 and 9 suggest this. [[Completing the square]], <math>0 = (2x \pm 3)^2 = 4x^2 \pm 12x + 9</math>, so <math>\pm 12 = a + 8 \Longrightarrow a = 4, -20</math>. The sum of these is <math>-20 + 4 = -16 \Rightarrow \mathrm{(A)}</math>.
+=== Solution 2 ===
 Another method would be to use the quadratic formula, since our <math>x^2</math> coefficient is given as 4, the <math>x</math> coefficient is <math>a+8</math> and the constant term is <math>9</math>. Hence, <math>x = \frac{-(a+8) \pm \sqrt {(a+8)^2-4(4)(9)}}{2(4)}</math> Because we want only a single solution for <math>x</math>, the determinant must equal 0. Therefore, we can write <math>(a+8)^2 - 144 = 0</math> which factors to <math>a^2 + 16a - 80 = 0</math>; using [[Vieta's formulas]] we see that the sum of the solutions for <math>a</math> is the opposite of the coefficient of <math>a</math>, or <math>-16 \Rightarrow \mathrm{ (A)}</math>.
+=== Solution 3 ===
+Using the [[discriminant]], the result must equal <math>0</math>.
+<math>D = b^2 - 4ac</math>
+<math>  = (a+8)^2 - 4(4)(9)</math>
+<math>  = a^2 + 16a + 64 - 144</math>
+<math>  = a^2 + 16a - 80 = 0 \Rightarrow</math>
+<math>   (a + 20)(a - 4) = 0</math>
+Therefore, <math>a = -20</math> or <math>a = 4</math>, giving a sum of <math>-16 \Rightarrow \mathrm{ (A)}</math>.
+===Solution 4===
+First, notice that for there to be only <math>1</math> root to a quadratic, the quadratic must be a square. Then, notice that the quadratic and linear terms are both squares. Thus, the value of <math>a</math> must be such that both <math>(2x+3)^2</math> and <math>(2x-3)^2</math>. Clearly, <math>a=4</math> or <math>a=-20</math>. Hence <math>-20 + 4 = -16 \Rightarrow \mathrm{(A)}</math>.
+Solution by franzliszt
 == See also ==
@@ Line 13: / Line 34: @@
 [[Category:Introductory Algebra Problems]]
+{{MAA Notice}}

2005 AMC 12A (Problems • Answer Key • Resources)
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