Difference between revisions of "2014 AIME II Problems/Problem 5"

Revision as of 14:50, 31 December 2023

Problem

Real numbers $r$ and $s$ are roots of $p(x)=x^3+ax+b$ , and $r+4$ and $s-3$ are roots of $q(x)=x^3+ax+b+240$ . Find the sum of all possible values of $|b|$ .

Solution 1

Because the coefficient of $x^2$ in both $p(x)$ and $q(x)$ is 0, the remaining root of $p(x)$ is $-(r+s)$ , and the remaining root of $q(x)$ is $-(r+s+1)$ . The coefficients of $x$ in $p(x)$ and $q(x)$ are both equal to $a$ , and equating the two coefficients gives $rs-(r+s)^2 = (r+4)(s-3)-(r+s+1)^2$ from which $s = \tfrac 12 (5r+13)$ . The product of the roots of $p(x)$ differs from that of $q(x)$ by $240$ , so $(r+4)\cdot \tfrac 12 (5r+7)\cdot \tfrac 12(7r+15)- r\cdot \tfrac 12 (5r+13)\cdot \tfrac 12(7r+13)=240$ from which $r^2+4r-5 =0$ , with roots $r=1$ and $r=-5$ .

If $r = 1$ , then the roots of $p(x)$ are $r=1$ , $s=9$ , and $-(r+s)=-10$ , and $b=-rst=90$ .

If $r = -5$ , then the roots of $p(x)$ are $r=-5$ , $s=-6$ , and $-(r+s)=11$ , and $b=-rst=-330$ .

Therefore the requested sum is $|- 330| + |90| = \boxed{420}$ .

Solution 2

Let $r$ , $s$ , and $-r-s$ be the roots of $p(x)$ (per Vieta's). Then $r^3 + ar + b = 0$ and similarly for $s$ . Also, $q(r+4) = (r+4)^3 + a(r+4) + b + 240 = 12r^2 + 48r + 304 + 4a = 0$

Set up a similar equation for $s$ :

$q(s-3) = (s-3)^3 + a(s-3) + b + 240 = -9s^2 + 27s + 213 - 3a = 0.$

Simplifying and adding the equations gives $\begin{align}\tag{*} r^2 - s^2 + 4r + 3s + 49 &= 0 \end{align}$ Now, let's deal with the $ax$ terms. Plugging the roots $r$ , $s$ , and $-r-s$ into $p(x)$ yields a long polynomial, and plugging the roots $r+4$ , $s-3$ , and $-1-r-s$ into $q(x)$ yields another long polynomial. Equating the coefficients of $x$ in both polynomials, we get: $rs + (-r-s)(r+s) = (r+4)(s-3) + (-r-s-1)(r+s+1),$ which eventually simplifies to $s = \frac{13 + 5r}{2}.$ Substitution into (*) should give $r = -5$ and $r = 1$ , corresponding to $s = -6$ and $s = 9$ , and $|b| = 330, 90$ , for an answer of $\boxed{420}$ .

Solution 2

The roots of $p(x)$ are $r$ , $s$ , and $-r-s$ since they sum to $0$ by Vieta's Formula (co-efficient of $x^2$ term is $0$ ).

Similarly, the roots of $q(x)$ are $r + 4$ , $s - 3$ , and $-r-s-1$ , as they too sum to $0$ .

Then:

$a = rs+r(-r-s)+s(-r-s) = rs-(r+s)^2$ and $-b = rs(-r-s)$ from $p(x)$ and

$a=(r+4)(s-3)+(r+4)(-r-s-1)+(s-3)(-r-s-1) = (r+4)(s-3)-(r+s+1)^2$ and $-(b+240)=(r+4)(s-3)(-r-s-1)$ from $q(x)$ .

From these equations, we can write that $rs-(r+s)^2 = (r+4)(s-3)-(r+s+1)^2 = a$ and simplifying gives $2s-5r-13=0 \Rightarrow s = \frac{5r+13}{2}.$

We now move to the other two equations regarding the product of the roots. We see that we can cancel a negative from both sides to get $rs(r+s) = b$ $(r+4)(s-3)(r+s+1)=b + 240.$ Subtracting the first equation from the second equation gives us $(r+4)(s-3)(r+s+1) - rs(r+s) = 240$ .

Expanding, simplifying, substituting $s = \frac{5r+13}{2}$ , and simplifying some more yields the simple quadratic $r^2 + 4r - 5 = 0$ , so $r = -5, 1$ . Then $s = -6, 9$ .

Finally, we substitute back into $b=rs(r+s)$ to get $b = (-5)(-6)(-5-6) = -330$ , or $b = (1)(9)(1 + 9) = 90$ .

The answer is $|-330|+|90| = \boxed{420}$ .

Solution 3

By Vieta's, we know that the sum of roots of $p(x)$ is $0$ . Therefore, the roots of $p$ are $r, s, -r-s$ . By similar reasoning, the roots of $q(x)$ are $r + 4, s - 3, -r - s - 1$ . Thus, $p(x) = (x - r)(x - s)(x + r + s)$ and $q(x) = (x - r - 4)(x - s + 3)(x + r + s + 1)$ .

Since $p(x)$ and $q(x)$ have the same coefficient for $x$ , we can go ahead and match those up to get $\begin{align*} rs - r(r + s) - s(r + s) &= (r + 4)(s - 3) - (r + 4)(r + s + 1) - (s - 3)(r + s + 1) \\ 0 &= -13 - 5r + 2s \\ s &= \frac{5r + 13}{2} \end{align*}$

At this point, we can go ahead and compare the constant term in $p(x)$ and $q(x)$ . Doing so is certainly valid, but we can actually do this another way. Notice that $p(s) = 0$ . Therefore, $q(s) = 240$ . If we plug that into our expression, we get that $\begin{align*} q(s) &= 3(s - r - 4)(r + 2s + 1) \\ 240 &= 3(s - r - 4)(r + 2s + 1) \\ 240 &= 3\left( \frac{3r + 5}{2} \right)(6r + 14) \\ 80 &= (3r + 5)(3r + 7) \\ 0 &= r^2 + 4r - 5 \end{align*}$ This tells us that $(r, s) = (1, 9)$ or $(-5, -6)$ . Since $-b$ is the product of the roots, we have that the two possibilities are $1 \cdot 9 \cdot (-10) = -90$ and $(-5)(-6)11 = 330$ . Adding the absolute values of these gives us $\boxed{420}$ .

@@ Line 2: / Line 2: @@
 <!-- don't remove the following tag, for PoTW on the Wiki front page--><onlyinclude>Real numbers <math>r</math> and <math>s</math> are roots of <math>p(x)=x^3+ax+b</math>, and <math>r+4</math> and <math>s-3</math> are roots of <math>q(x)=x^3+ax+b+240</math>. Find the sum of all possible values of <math>|b|</math>.<!-- don't remove the following tag, for PoTW on the Wiki front page--></onlyinclude>
-==Solution==
+==Solution 1==
 Because the coefficient of <math>x^2</math> in both <math>p(x)</math> and <math>q(x)</math> is 0, the remaining root of <math>p(x)</math> is <math>-(r+s)</math>, and the remaining root of <math>q(x)</math> is <math>-(r+s+1)</math>. The coefficients of <math>x</math> in <math>p(x)</math> and <math>q(x)</math> are both equal to <math>a</math>, and equating the two coefficients gives
 <cmath>rs-(r+s)^2 = (r+4)(s-3)-(r+s+1)^2 </cmath>from which <math>s = \tfrac 12 (5r+13)</math>. The product of the roots of <math>p(x)</math> differs from that of <math>q(x)</math> by <math>240</math>, so<cmath>(r+4)\cdot \tfrac 12 (5r+7)\cdot \tfrac 12(7r+15)- r\cdot \tfrac 12 (5r+13)\cdot \tfrac 12(7r+13)=240</cmath>from which <math>r^2+4r-5 =0</math>, with roots <math>r=1</math> and <math>r=-5</math>.

2014 AIME II (Problems • Answer Key • Resources)
Preceded by Problem 4	Followed by Problem 6
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15
All AIME Problems and Solutions

Page

Toolbox

Search

Difference between revisions of "2014 AIME II Problems/Problem 5"

Revision as of 14:50, 31 December 2023

Contents

Problem

Solution 1

Solution 2

Solution 2

Solution 3

See also