Difference between revisions of "1980 AHSME Problems/Problem 27"

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== Solution ==
 
== Solution ==
 
Lets set our original expression equal to <math>x</math>. So <math>\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}} = x</math>. Cubing this gives us <math>x^3 = (\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}})^3 = 5 + 2\sqrt{13} + 5 - 2\sqrt{13} + 3(\sqrt[3] {5+2\sqrt{13}}*\sqrt[3]{5-2\sqrt{13}})(\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}}) = 10 - 9x</math>
 
Lets set our original expression equal to <math>x</math>. So <math>\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}} = x</math>. Cubing this gives us <math>x^3 = (\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}})^3 = 5 + 2\sqrt{13} + 5 - 2\sqrt{13} + 3(\sqrt[3] {5+2\sqrt{13}}*\sqrt[3]{5-2\sqrt{13}})(\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}}) = 10 - 9x</math>
So we have <math>x^3 + 9x - 10 = 0</math>. We can easily see that 1 is a root of this polynomial. By synthetic division, the new polynomial is <math>x^2 + x + 10</math>, which has no real roots. Thus <math>\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}} = 1</math>. Since 1 is not A-D, our answer is <math>\fbox{E}</math>
+
So we have <math>x^3 + 9x - 10 = 0</math>. We can easily see that 1 is a root of this polynomial. By synthetic division, the new polynomial is <math>x^2 + x + 10</math>, which has no real roots. Thus <math>\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}} = 1</math>. Since 1 is not A-D, our answer is <math>\fbox{E}</math>.
  
 
== See also ==
 
== See also ==

Revision as of 17:21, 5 June 2015

Problem

The sum $\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}}$ equals

$\text{(A)} \ \frac 32 \qquad  \text{(B)} \ \frac{\sqrt[3]{65}}{4} \qquad  \text{(C)} \ \frac{1+\sqrt[6]{13}}{2} \qquad  \text{(D)}\ \sqrt[3]{2}\qquad \text{(E)}\ \text{none of these}$

Solution

Lets set our original expression equal to $x$. So $\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}} = x$. Cubing this gives us $x^3 = (\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}})^3 = 5 + 2\sqrt{13} + 5 - 2\sqrt{13} + 3(\sqrt[3] {5+2\sqrt{13}}*\sqrt[3]{5-2\sqrt{13}})(\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}}) = 10 - 9x$ So we have $x^3 + 9x - 10 = 0$. We can easily see that 1 is a root of this polynomial. By synthetic division, the new polynomial is $x^2 + x + 10$, which has no real roots. Thus $\sqrt[3] {5+2\sqrt{13}}+\sqrt[3]{5-2\sqrt{13}} = 1$. Since 1 is not A-D, our answer is $\fbox{E}$.

See also

1980 AHSME (ProblemsAnswer KeyResources)
Preceded by
Problem 26
Followed by
Problem 28
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