Difference between revisions of "Template:ProbAMC"
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== See also == | == See also == | ||
− | {{AMC{{{tentwelve}}} box|year={{{year}}}|ab={{{ab|}}}|num-b={{{num-b}}}|num-a={{{num-a}}}}} | + | {{AMC{{{tentwelve}}} box|year={{{year}}}|ab={{{ab|}}}|num-b={{{num-b}}}|num-a={{{num-a}}}|before={{{before|}}}|after={{{after|}}}}} |
[[Category:{{{diff}}} {{{subject}}} Problems]]<noinclude> | [[Category:{{{diff}}} {{{subject}}} Problems]]<noinclude> |
Revision as of 12:53, 19 January 2008
Contents
Problem
This problem has not been edited in. If you know this problem, please help us out by adding it.
\mathrm{(A)}\ {{{answera}}} \qquad \mathrm{(B)}\ {{{answerb}}} \qquad \mathrm{(C)}\ {{{answerc}}} \qquad \mathrm{(D)}\ {{{answerd}}} \qquad \mathrm{(E)}\ {{{answere}}}
Solution
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See also
{{AMC{{{tentwelve}}} box|year={{{year}}}|ab=|num-b={{{num-b}}}|num-a={{{num-a}}}|before=|after=}}
[[Category:{{{diff}}} {{{subject}}} Problems]]
Documentation
Use it as follows:
{{subst:probAMC | problem = | answera = | answerb = | answerc = | answerd = | answere = | solution = | tentwelve = | year = | ab = | num-b = | num-a = | diff = | subject = }}
Note that tentwelve should be either 10 or 12, and num-b/a refer to the number before/after the current problem (ex, if the problem is number 5, then num-b=4 and num-a=6).
As an example, (see 2002 AMC 12B Problems/Problem 24)
{{subst:probAMC | problem = A [[convex polygon|convex]] [[quadrilateral]] $ABCD$ with area $2002$ contains a point $P$ in its interior such that $PA = 24, PB = 32, PC = 28, PD = 45$. Find the perimeter of $ABCD$. | answera = 4\sqrt{2002} | answerb = 2\sqrt{8465} | answerc = 2(48+\sqrt{2002}) | answerd = 2\sqrt{8633} | answere = 4(36 + \sqrt{113}) | solution =We have $$[ABCD] = 2002 \le \frac 12 (AC \cdot BD)$$ (Why is this true? Try splitting the quadrilateral along $AC$ and then using the triangle area formula), with equality if $\overline{AC} \perp \overline{BD}$. By the [[triangle inequality]], $$\begin{align*}AC &\le PA + PC = 52\\ PD &\le PB + PD = 77\end{align*}$$ with equality if $P$ lies on $\overline{AC}$ and $\overline{BD}$ respectively. Thus $$2002 \le \frac{1}{2} AC \cdot BD \le \frac 12 \cdot 52 \cdot 77 = 2002$$ Therefore $\overline{AC} \perp \overline{BD}$ at point $P$. [[Image:2002_12B_AMC-24.png|center]] By the [[Pythagorean Theorem]], $$\begin{align*} AB = \sqrt{PA^2 + PB^2} = \sqrt{24^2 + 32^2} = 40\\ BC = \sqrt{PB^2 + PC^2} = \sqrt{32^2 + 28^2} = 4\sqrt{113}\\ CD = \sqrt{PC^2 + PD^2} = \sqrt{28^2 + 45^2} = 53\\ DA = \sqrt{PD^2 + PA^2} = \sqrt{45^2 + 24^2} = 51 \end{align*}$$ The perimeter of $ABCD$ is $AB + BC + CD + DA = 4(36 + \sqrt{113}) \Rightarrow \mathrm{(E)}$. | tentwelve = 12 | year = 2002 | ab = B | num-b = 23 | num-a = 25 | diff = Introductory | subject = Geometry }}