Art of Problem Solving
Art of Problem Solving
AoPS Online
Math texts, online classes, and more
for students in grades 5-12.
Visit AoPS Online
Books for Grades 5-12 Online Courses
Beast Academy
Engaging math books and online learning
for students ages 6-13.
Visit Beast Academy
Books for Ages 6-13 Beast Academy Online
AoPS Academy
Small live classes for advanced math
and language arts learners in grades 2-12.
Visit AoPS Academy
Find a Physical Campus Visit the Virtual Campus

1964 AHSME Problems/Problem 30: Difference between revisions

← Older editNewer edit →
Talkinaway (talk | contribs)
680 edits
No edit summary
Added Solution #2
Line 6: Line 6:




==Solution==
==Solution 1==


Dividing the quadratic by <math>7 + 4\sqrt{3}</math> to obtain a monic polynomial will give a linear coefficient of <math>\frac{2 + \sqrt{3}}{7 + 4\sqrt{3}}</math>.  Rationalizing the denominator gives:
Dividing the quadratic by <math>7 + 4\sqrt{3}</math> to obtain a monic polynomial will give a linear coefficient of <math>\frac{2 + \sqrt{3}}{7 + 4\sqrt{3}}</math>.  Rationalizing the denominator gives:
Line 12: Line 12:
<math>\frac{(2 + \sqrt{3})(7 - 4\sqrt{3})}{7^2 - 4^2 \cdot 3}</math>
<math>\frac{(2 + \sqrt{3})(7 - 4\sqrt{3})}{7^2 - 4^2 \cdot 3}</math>


<math>=\frac{14 - 12 - \sqrt{3}}{49-48}</math>


<math>\frac{14 - 12 - \sqrt{3}}{1}</math>
<math>=2 - \sqrt{3}</math>
 
 
<math>2 - \sqrt{3}</math>


Dividing the constant term by <math>7 + 4\sqrt{3}</math> (and using the same radical conjugate as above) gives:
Dividing the constant term by <math>7 + 4\sqrt{3}</math> (and using the same radical conjugate as above) gives:
Line 22: Line 20:
<math>\frac{-2}{7 + 4\sqrt{3}}</math>
<math>\frac{-2}{7 + 4\sqrt{3}}</math>


<math>=-2(7 - 4\sqrt{3})</math>


<math>-2(7 - 4\sqrt{3})</math>
<math>=8\sqrt{3} - 14</math>
 
 
<math>8\sqrt{3} - 14</math>


So, dividing the original quadratic by the coefficient of <math>x^2</math> gives <math>x^2 + (2 - \sqrt{3})x + 8\sqrt{3} - 14 = 0</math>
So, dividing the original quadratic by the coefficient of <math>x^2</math> gives <math>x^2 + (2 - \sqrt{3})x + 8\sqrt{3} - 14 = 0</math>
Line 34: Line 30:
<math>\sqrt{(2 - \sqrt{3})^2 - 4(8\sqrt{3} - 14)(1)}</math>
<math>\sqrt{(2 - \sqrt{3})^2 - 4(8\sqrt{3} - 14)(1)}</math>


<math>\sqrt{7 - 4\sqrt{3} - 32\sqrt{3} + 56}</math>
<math>=\sqrt{7 - 4\sqrt{3} - 32\sqrt{3} + 56}</math>
 
<math>=\sqrt{63 - 36\sqrt{3}}</math>
 
<math>=3\sqrt{7 - 4\sqrt{3}}</math>
 
Note that if we take <math>\frac{1}{3}</math> of one of the answer choices and square it, we should get <math>7 - 4\sqrt{3}</math>.
The only answers that are (sort of) divisible by <math>3</math> are <math>6 \pm 3\sqrt{3}</math>, so those would make a good first guess.  And given that there is a negative sign underneath the radical, <math>6 - 3\sqrt{3}</math> is the most logical place to start.
 
Since <math>\frac{1}{3}</math> of the answer is <math>2 - \sqrt{3}</math>, and <math>(2 - \sqrt{3})^2 = 7 - 4\sqrt{3}</math>, the answer is indeed <math>\boxed{\textbf{(D)}}</math>.
 
==Solution 2==
===Submitted by MyUsernameWasTaken===
====A step-by-step solution====
 
By observation, the original equation can be rewritten as
 
<math>=(4+4\sqrt{3}+3)x^2+(2+\sqrt{3})x-2=0</math>
 
<math>=(2+\sqrt{3})^2x^2+(2+\sqrt{3})x-2=0</math>
 
Substituting <math>u = (2+\sqrt{3})x</math>,
 
<math>u^2+u-2=0</math>
 
<math>(u-1)(u+2)=0</math>
 
<math>u=1</math> or <math>u=-2</math>
 
First root of <math>x</math>:
 
<math>(2+\sqrt{3})x_1=1</math>
 
<math>x_1=\frac{1}{2+\sqrt{3}}</math>
 
<math>x_1=2-\sqrt{3}</math>
 
Second root of <math>x</math>:
 
<math>(2+\sqrt{3})x_2=-2</math>
 
<math>x_2=\frac{-2}{2+\sqrt{3}}</math>
 
<math>x_2=-2(2-\sqrt{3})</math>
 
<math>x_2=-4+2\sqrt{3}</math>
 
Now, to find which root of <math>x</math> is larger:
 
Assume that <math>2-\sqrt{3}>-4+2\sqrt{3}</math>.
 
<math>6>3\sqrt{3}</math>
 
<math>2>\sqrt{3}</math>
 
<math>\sqrt{4}>\sqrt{3}</math> which is true. Hence, the first root of <math>x</math> is the larger one.
 
Finally, finding the difference between the larger and smaller roots of <math>x</math>:


<math>\sqrt{63 - 36\sqrt{3}}</math>
<math>x_1-x_2</math>


<math>3\sqrt{7 - 4\sqrt{3}}</math>
<math>=(2-\sqrt{3})-(-4+2\sqrt{3})</math>


Note that if we take <math>\frac{1}{3}</math> of one of the answer choices and square it, we should get <math>7 - 4\sqrt{3}</math>.  The only answers that are (sort of) divisible by <math>3</math> are <math>6 \pm 3\sqrt{3}</math>, so those would make a good first guess.  And given that there is a negative sign underneath the radical, <math>6 - 3\sqrt{3}</math> is the most logical place to start.
<math>=6-3\sqrt{3}</math>


Since <math>\frac{1}{3}</math> of the answer is <math>2 - \sqrt{3}</math>, and <math>(2 - \sqrt{3})^2 = 7 - 4\sqrt{3}</math>, the answer is indeed <math>\boxed{\textbf{(D) }}</math>
Therefore, the answer is <math>\boxed{\textbf{(D)}}</math>.


==See Also==
==See Also==

Revision as of 13:39, 24 March 2023

Problem

The larger root minus the smaller root of the equation \[(7+4\sqrt{3})x^2+(2+\sqrt{3})x-2=0\] is

$\textbf{(A) }-2+3\sqrt{3}\qquad\textbf{(B) }2-\sqrt{3}\qquad\textbf{(C) }6+3\sqrt{3}\qquad\textbf{(D) }6-3\sqrt{3}\qquad \textbf{(E) }3\sqrt{3}+2$


Solution 1

Dividing the quadratic by $7 + 4\sqrt{3}$ to obtain a monic polynomial will give a linear coefficient of $\frac{2 + \sqrt{3}}{7 + 4\sqrt{3}}$. Rationalizing the denominator gives:

$\frac{(2 + \sqrt{3})(7 - 4\sqrt{3})}{7^2 - 4^2 \cdot 3}$

$=\frac{14 - 12 - \sqrt{3}}{49-48}$

$=2 - \sqrt{3}$

Dividing the constant term by $7 + 4\sqrt{3}$ (and using the same radical conjugate as above) gives:

$\frac{-2}{7 + 4\sqrt{3}}$

$=-2(7 - 4\sqrt{3})$

$=8\sqrt{3} - 14$

So, dividing the original quadratic by the coefficient of $x^2$ gives $x^2 + (2 - \sqrt{3})x + 8\sqrt{3} - 14 = 0$

From the quadratic formula, the positive difference of the roots is $\frac{\sqrt{b^2 - 4ac}}{a}$. Plugging in gives:

$\sqrt{(2 - \sqrt{3})^2 - 4(8\sqrt{3} - 14)(1)}$

$=\sqrt{7 - 4\sqrt{3} - 32\sqrt{3} + 56}$

$=\sqrt{63 - 36\sqrt{3}}$

$=3\sqrt{7 - 4\sqrt{3}}$

Note that if we take $\frac{1}{3}$ of one of the answer choices and square it, we should get $7 - 4\sqrt{3}$. The only answers that are (sort of) divisible by $3$ are $6 \pm 3\sqrt{3}$, so those would make a good first guess. And given that there is a negative sign underneath the radical, $6 - 3\sqrt{3}$ is the most logical place to start.

Since $\frac{1}{3}$ of the answer is $2 - \sqrt{3}$, and $(2 - \sqrt{3})^2 = 7 - 4\sqrt{3}$, the answer is indeed $\boxed{\textbf{(D)}}$.

Solution 2

Submitted by MyUsernameWasTaken

A step-by-step solution

By observation, the original equation can be rewritten as

$=(4+4\sqrt{3}+3)x^2+(2+\sqrt{3})x-2=0$

$=(2+\sqrt{3})^2x^2+(2+\sqrt{3})x-2=0$

Substituting $u = (2+\sqrt{3})x$,

$u^2+u-2=0$

$(u-1)(u+2)=0$

$u=1$ or $u=-2$

First root of $x$:

$(2+\sqrt{3})x_1=1$

$x_1=\frac{1}{2+\sqrt{3}}$

$x_1=2-\sqrt{3}$

Second root of $x$:

$(2+\sqrt{3})x_2=-2$

$x_2=\frac{-2}{2+\sqrt{3}}$

$x_2=-2(2-\sqrt{3})$

$x_2=-4+2\sqrt{3}$

Now, to find which root of $x$ is larger:

Assume that $2-\sqrt{3}>-4+2\sqrt{3}$.

$6>3\sqrt{3}$

$2>\sqrt{3}$

$\sqrt{4}>\sqrt{3}$ which is true. Hence, the first root of $x$ is the larger one.

Finally, finding the difference between the larger and smaller roots of $x$:

$x_1-x_2$

$=(2-\sqrt{3})-(-4+2\sqrt{3})$

$=6-3\sqrt{3}$

Therefore, the answer is $\boxed{\textbf{(D)}}$.

See Also

1964 AHSC (ProblemsAnswer KeyResources)
Preceded by
Problem 29 		Followed by
Problem 31
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35 36 37 38 39 40
All AHSME Problems and Solutions

These problems are copyrighted © by the Mathematical Association of America.

Retrieved from "https://wiki.aopstest.com/wiki/index.php?title=1964_AHSME_Problems/Problem_30&oldid=191263"