|
|
(9 intermediate revisions by 6 users not shown) |
Line 1: |
Line 1: |
− | == Problem ==
| + | #REDIRECT [[2010 AMC 12B Problems/Problem 21]] |
− | Let <math>a > 0</math>, and let <math>P(x)</math> be a polynomial with integer coefficients such that
| |
− | | |
− | <center>
| |
− | <math>P(1) = P(3) = P(5) = P(7) = a</math>, and<br/>
| |
− | <math>P(2) = P(4) = P(6) = P(8) = -a</math>.
| |
− | </center>
| |
− | | |
− | What is the smallest possible value of <math>a</math>?
| |
− | | |
− | <math>\textbf{(A)}\ 105 \qquad \textbf{(B)}\ 315 \qquad \textbf{(C)}\ 945 \qquad \textbf{(D)}\ 7! \qquad \textbf{(E)}\ 8!</math>
| |
− | | |
− | == Solution ==
| |
− | We observe that because <math>P(1) = P(3) = P(5) = P(7) = a</math>, if we define a new polynomial <math>R(x)</math> such that <math>R(x) = P(x) - a</math>, <math>R(x)</math> has roots when <math>P(x) = a</math>; namely, when <math>x=1,3,5,7</math>.
| |
− | | |
− | Thus since <math>R(x)</math> has roots when <math>x=1,3,5,7</math>, we can factor the product <math>(x-1)(x-3)(x-5)(x-7)</math> out of <math>R(x)</math> to obtain a new polynomial <math>Q(x)</math> such that <math>(x-1)(x-3)(x-5)(x-7)(Q(x)) = R(x) = P(x) - a</math>.
| |
− | | |
− | Then, plugging in values of <math>2,4,6,8,</math> we get
| |
− | | |
− | <cmath>P(2)-a=(2-1)(2-3)(2-5)(2-7)Q(2) = -15Q(2) = -2a</cmath>
| |
− | <cmath>P(4)-a=(4-1)(4-3)(4-5)(4-7)Q(4) = 9Q(4) = -2a</cmath>
| |
− | <cmath>P(6)-a=(6-1)(6-3)(6-5)(6-7)Q(6) = -15Q(6) = -2a</cmath>
| |
− | <cmath>P(8)-a=(8-1)(8-3)(8-5)(8-7)Q(8) = 105Q(8) = -2a</cmath>
| |
− | | |
− | <math>-2a=-15Q(2)=9Q(4)=-15Q(6)=105Q(8).</math>
| |
− | Thus, the least value of <math>a</math> must be the <math>lcm(15,9,15,105)</math>.
| |
− | Solving, we receive <math>315</math>, so our answer is <math> \boxed{\textbf{(B)}\ 315} </math>.
| |
− | | |
− | To complete the solution, we can let <math>a = 315</math>, and then try to find <math>Q(x)</math>. We know from the above calculation that <math>Q(2)=42, Q(4)=-70, Q(6)=42</math>, and <math>Q(8)=-6</math>. Then we can let <math>Q(x) = T(x)(x-2)(x-6)+42</math>, getting <math>T(4)=28, T(8)=-4</math>. Let <math>T(x)=L(x)(x-8)-4</math>, then <math>L(4)=-8</math>. Therefore, it is possible to choose <math>T(x) = -8(x-8)-4 = -8x + 60</math>, so the goal is accomplished. As a reference, the polynomial we get is
| |
− | | |
− | <cmath>P(x) = (x-1)(x-3)(x-5)(x-7)((-8x + 60)(x-2)(x-6)+42) + 315</cmath><math></math>
| |
− | | |
− | <math> = -8 x^7+252 x^6-3248 x^5+22050 x^4-84392 x^3+179928 x^2-194592 x+80325</math>
| |
− | | |
− | == See also ==
| |
− | {{AMC10 box|year=2010|ab=B|num-b=24|after=Last question}}
| |
− | See also
| |
− | [[Category:Intermediate Algebra Problems]] | |
− | {{MAA Notice}}
| |