Difference between revisions of "2014 AMC 12B Problems/Problem 16"

Latest revision as of 18:47, 2 November 2025

Problem

Let $P$ be a cubic polynomial with $P(0) = k$ , $P(1) = 2k$ , and $P(-1) = 3k$ . What is $P(2) + P(-2)$ ?

$\textbf{(A)}\ 0\qquad\textbf{(B)}\ k\qquad\textbf{(C)}\ 6k\qquad\textbf{(D)}\ 7k\qquad\textbf{(E)}\ 14k$

Solution

Let $P(x) = Ax^3+Bx^2 + Cx+D$ . Plugging in $0$ for $x$ , we find $D=k$ , and plugging in $1$ and $-1$ for $x$ , we obtain the following equations: $A+B+C+k=2k$ $-A+B-C+k=3k$ Adding these two equations together, we get $2B=3k$ If we plug in $2$ and $-2$ in for $x$ , we find that $P(2)+P(-2) = 8A+4B+2C+k+(-8A+4B-2C+k)=8B+2k$ Multiplying the third equation by $4$ and adding $2k$ gives us our desired result, so $P(2)+P(-2)=12k+2k=\boxed{\textbf{(E)}\ 14k}$

Solution 2

If we use Gregory's Triangle, the following happens: $P(-1), P(0), P(1)$ $3k , k , 2k$ $-2k , k$ $3k$

Since this is cubic, the common difference is $3k$ for the linear level so the string of $3k$ s are infinite in each direction. If we put a $3k$ on each side of the original $3k$ , we can solve for $P(-2)$ and $P(2)$ .

$P(-2), P(-1), P(0), P(1), P(2)$ $8k , 3k , k , 2k , 6k$ $-5k , -2k , k , 4k$ $3k , 3k , 3k$

The above shows us that $P(-2)$ is $8k$ and $P(2)$ is $6k$ so $8k+6k=14k$ .

NOTE (not from author): The link you put for gregory's triangle doesn't work so please explain it in your post or find a resource that does work; there isn't much on google.

NOTE (not from author or user above): I have now updated the link. It should work.

Solution 3

First, define $G(x)=P(x)+P(-x).$ We have $G(-1)=G(1)=5k$ and $G(0)=2k.$ Notice that $G(x)$ is of the form $a*x^2+b,$ since if we added $P(x)+P(-x),$ the $x$ and $x^3$ terms would cancel out. Plug in the values, and you get $a=3k, b=2k,$ so $P(2)+P(-2)=G(2)=14k.$

(E)

@@ Line 33: / Line 33: @@
 NOTE (not from author): The link you put for gregory's triangle doesn't work so please explain it in your post or find a resource that does work; there isn't much on google.
+NOTE (not from author or user above): I have now updated the link. It should work.
+==Solution 3==
+First, define <cmath>G(x)=P(x)+P(-x).</cmath> We have <cmath>G(-1)=G(1)=5k</cmath> and <cmath>G(0)=2k.</cmath> Notice that <cmath>G(x) </cmath> is of the form <cmath>a*x^2+b,</cmath> since if we added <cmath>P(x)+P(-x),</cmath> the <cmath>x</cmath> and <cmath>x^3</cmath> terms would cancel out. Plug in the values, and you get <cmath>a=3k, b=2k,</cmath> so <cmath>P(2)+P(-2)=G(2)=14k.</cmath>
+(E)
 == See also ==
 {{AMC12 box|year=2014|ab=B|num-b=15|num-a=17}}
 {{MAA Notice}}

2014 AMC 12B (Problems • Answer Key • Resources)
Preceded by Problem 15	Followed by Problem 17
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