Difference between revisions of "2005 AIME I Problems/Problem 6"

(Solution)
(Solution 2)
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<math>\lfloor P \rfloor = 1 + 44 = \boxed{045}</math>.
 
<math>\lfloor P \rfloor = 1 + 44 = \boxed{045}</math>.
  
== Solution 2 ==
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== Solution 3 ==
  
 
If we don't see the fourth power, we can always factor the LHS to try to create a quadratic substitution. Checking, we find that <math>x=0</math> and <math>x=2</math> are both roots. Synthetic division gives
 
If we don't see the fourth power, we can always factor the LHS to try to create a quadratic substitution. Checking, we find that <math>x=0</math> and <math>x=2</math> are both roots. Synthetic division gives
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<math>y=x^2-2x+1=(x-1)^2</math>, giving us
 
<math>y=x^2-2x+1=(x-1)^2</math>, giving us
 
<math>(y-1)(y+1)=2005</math>. From here we proceed as in Solution 1 to get <math>\boxed{045}</math>.
 
<math>(y-1)(y+1)=2005</math>. From here we proceed as in Solution 1 to get <math>\boxed{045}</math>.
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 +
-Solution by '''thecmd999'''
  
 
== See also ==
 
== See also ==

Revision as of 01:45, 24 September 2012

Problem

Let $P$ be the product of the nonreal roots of $x^4-4x^3+6x^2-4x=2005.$ Find $\lfloor P\rfloor.$

Solution 1

The left-hand side of that equation is nearly equal to $(x - 1)^4$. Thus, we add 1 to each side in order to complete the fourth power and get $(x - 1)^4 = 2006$.

Let $r = \sqrt[4]{2006}$ be the positive real fourth root of 2006. Then the roots of the above equation are $x = 1 + i^n r$ for $n = 0, 1, 2, 3$. The two non-real members of this set are $1 + ir$ and $1 - ir$. Their product is $P = 1 + r^2 = 1 + \sqrt{2006}$. $44^2 = 1936 < 2006 < 2025 = 45^2$ so $\lfloor P \rfloor = 1 + 44 = 045$.

Solution 2

Starting like before, $(x-1)^4= 2006$ This time we apply differences of squares. $(x-1)^4-2006=0$ so $((x-1)^2+\sqrt{2006})((x-1)^2 -\sqrt{2006})=0$ If you think of each part of the product as a quadratic, then $((x-1)^2+\sqrt{2006})$ is bound to hold the two non-real roots since the other definitely crosses the x-axis twice since it is just $x^2$ translated down and right. Therefore the products of the roots of $((x-1)^2+\sqrt{2006})$ or $P=1+\sqrt{2006}$ so

$\lfloor P \rfloor = 1 + 44 = \boxed{045}$.

Solution 3

If we don't see the fourth power, we can always factor the LHS to try to create a quadratic substitution. Checking, we find that $x=0$ and $x=2$ are both roots. Synthetic division gives $(x^2-2x)(x^2-2x+2)=2005$. We now have our quadratic substitution of $y=x^2-2x+1=(x-1)^2$, giving us $(y-1)(y+1)=2005$. From here we proceed as in Solution 1 to get $\boxed{045}$.

-Solution by thecmd999

See also

2005 AIME I (ProblemsAnswer KeyResources)
Preceded by
Problem 5
Followed by
Problem 7
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
All AIME Problems and Solutions