{"status": "success", "data": {"description_md": "Let $\\triangle ABC$ be a right triangle with right angle at $C$. Let $D$ and $E$ be points on $\\overline{AB}$ with $D$ between $A$ and $E$ such that $\\overline{CD}$ and $\\overline{CE}$ trisect $\\angle C$. If $\\frac{DE}{BE} = \\frac{8}{15}$, then $\\tan B$ can be written as $\\frac{m\\sqrt{p}}{n}$, where $m$ and $n$ are relatively prime positive integers, and $p$ is a positive integer not divisible by the square of any prime. Find $m+n+p$.\n___\nLeading zeroes must be inputted, so if your answer is `34`, then input `034`. Full credit goes to [MAA](https://maa.org/) for authoring these problems. These problems were taken on the [AOPS](https://artofproblemsolving.com/) website.", "description_html": "<p>Let <span class=\"katex--inline\">\\triangle ABC</span> be a right triangle with right angle at <span class=\"katex--inline\">C</span>. Let <span class=\"katex--inline\">D</span> and <span class=\"katex--inline\">E</span> be points on <span class=\"katex--inline\">\\overline{AB}</span> with <span class=\"katex--inline\">D</span> between <span class=\"katex--inline\">A</span> and <span class=\"katex--inline\">E</span> such that <span class=\"katex--inline\">\\overline{CD}</span> and <span class=\"katex--inline\">\\overline{CE}</span> trisect <span class=\"katex--inline\">\\angle C</span>. If <span class=\"katex--inline\">\\frac{DE}{BE} = \\frac{8}{15}</span>, then <span class=\"katex--inline\">\\tan B</span> can be written as <span class=\"katex--inline\">\\frac{m\\sqrt{p}}{n}</span>, where <span class=\"katex--inline\">m</span> and <span class=\"katex--inline\">n</span> are relatively prime positive integers, and <span class=\"katex--inline\">p</span> is a positive integer not divisible by the square of any prime. Find <span class=\"katex--inline\">m+n+p</span>.</p>&#10;<hr><p>Leading zeroes must be inputted, so if your answer is <code>34</code>, then input <code>034</code>. Full credit goes to <a href=\"https://maa.org/\">MAA</a> for authoring these problems. These problems were taken on the <a href=\"https://artofproblemsolving.com/\">AOPS</a> website.</p>", "hints_md": "", "hints_html": "", "editorial_md": "", "editorial_html": "", "flag_hint": "", "point_value": 5, "problem_name": "2012 AIME I Problem 12", "can_next": true, "can_prev": true, "nxt": "/problem/12_aime_I_p13", "prev": "/problem/12_aime_I_p11"}}