Difference between revisions of "Mock AIME 2 2006-2007 Problems"
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== Problem 1 == | == Problem 1 == | ||
− | A positive integer is called a dragon if it can be | + | A positive integer is called a ''dragon'' if it can be written as the sum of four positive integers <math>a,b,c,</math> and <math>d</math> such that <math>a+4=b-4=4c=d/4.</math> Find the smallest dragon. |
− | [[Mock_AIME_2_2006-2007/Problem_1|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_1|Solution]] |
== Problem 2 == | == Problem 2 == | ||
− | The set <math> | + | The set <math>S</math> consists of all integers from <math>1</math> to <math>2007,</math> inclusive. For how many elements <math>n</math> in <math>S</math> is <math>f(n) = \frac{2n^3+n^2-n-2}{n^2-1}</math> an integer? |
− | [[Mock_AIME_2_2006-2007/Problem_2|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_2|Solution]] |
== Problem 3 == | == Problem 3 == | ||
− | Let <math> | + | Let <math>S</math> be the sum of all positive integers <math>n</math> such that <math>n^2+12n-2007</math> is a perfect square. Find the remainder when <math>S</math> is divided by <math>1000.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_3|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_3|Solution]] |
== Problem 4 == | == Problem 4 == | ||
− | Let <math> | + | Let <math>n</math> be the smallest positive integer for which there exist positive real numbers <math>a</math> and <math>b</math> such that <math>(a+bi)^n=(a-bi)^n</math>. Compute <math>\frac{b^2}{a^2}</math>. |
− | [[Mock_AIME_2_2006-2007/Problem_4|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_4|Solution]] |
== Problem 5 == | == Problem 5 == | ||
− | Given that <math> | + | Given that <math> iz^2=1+\frac 2z + \frac{3}{z^2}+\frac{4}{z ^3}+\frac{5}{z^4}+\cdots</math> and <math>z=n\pm \sqrt{-i},</math> find <math> \lfloor 100n \rfloor.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_5|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_5|Solution]] |
== Problem 6 == | == Problem 6 == | ||
− | If <math> | + | If <math>\tan 15^\circ \tan 25^\circ \tan 35^\circ =\tan \theta</math> and <math>0^\circ \le \theta \le 180^\circ, </math> find <math>\theta.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_6|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_6|Solution]] |
== Problem 7 == | == Problem 7 == | ||
− | A right circular cone of base radius <math> | + | A right circular cone of base radius <math>17</math>cm and slant height <math>51</math>cm is given. <math>P</math> is a point on the circumference of the base and the shortest path from <math>P</math> around the cone and back is drawn (see diagram). If the length of this path is <math>m\sqrt{n},</math> where <math>m</math> and <math>n</math> are relatively prime positive integers, find <math>m+n.</math> |
− | [[Image: | + | [[Image:Mock_AIME_2_2007_Problem8.jpg]] |
− | [[Mock_AIME_2_2006-2007/Problem_7|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_7|Solution]] |
== Problem 8 == | == Problem 8 == | ||
− | The positive integers <math> | + | The positive integers <math>x_1, x_2, ... , x_7</math> satisfy <math>x_6 = 144</math> and <math>x_{n+3} = x_{n+2}(x_{n+1}+x_n)</math> for <math>n = 1, 2, 3, 4</math>. Find the last three digits of <math>x_7</math>. |
− | [[Mock_AIME_2_2006-2007/Problem_8|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_8|Solution]] |
== Problem 9 == | == Problem 9 == | ||
− | In right triangle <math> | + | In right triangle <math>ABC,</math> <math>\angle C=90^\circ.</math> Cevians <math>AX</math> and <math>BY</math> intersect at <math>P</math> and are drawn to <math>BC</math> and <math>AC</math> respectively such that <math>\frac{BX}{CX}=\frac23</math> and <math>\frac{AY}{CY}=\sqrt 3.</math> If <math>\tan \angle APB= \frac{a+b\sqrt{c}}{d},</math> where <math>a,b,</math> and <math>d</math> are relatively prime and <math>c</math> has no perfect square divisors excluding <math>1,</math> find <math>a+b+c+d.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_9|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_9|Solution]] |
== Problem 10 == | == Problem 10 == | ||
− | Find the number of solutions, in degrees, to the equation <math> | + | Find the number of solutions, in degrees, to the equation <math>\sin^{10}x + \cos^{10}x = \frac{29}{16}\cos^4 2x,</math> where <math>0^\circ \le x^\circ \le 2007^\circ.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_10|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_10|Solution]] |
== Problem 11 == | == Problem 11 == | ||
Find the sum of the squares of the roots, real or complex, of the system of simultaneous equations | Find the sum of the squares of the roots, real or complex, of the system of simultaneous equations | ||
− | <math> | + | <math>x+y+z=3,~x^2+y^2+z^2=3,~x^3+y^3+z^3 =3.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_11|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_11|Solution]] |
== Problem 12 == | == Problem 12 == | ||
− | In quadrilateral <math> | + | In quadrilateral <math>ABCD,</math> <math>m \angle DAC= m\angle DBC </math> and <math>\frac{[ADB]}{[ABC]}=\frac12.</math> If <math>AD=4,</math> <math>BC=6</math>, <math>BO=1,</math> and the area of <math>ABCD</math> is <math>\frac{a\sqrt{b}}{c},</math> where <math>a,b,c</math> are relatively prime positive integers, find <math>a+b+c.</math> |
− | Note*: <math> | + | Note*: <math>[ABC]</math> and <math>[ADB]</math> refer to the areas of triangles <math>ABC</math> and <math>ADB.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_12|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_12|Solution]] |
== Problem 13 == | == Problem 13 == | ||
− | In his spare time, Richard Rusczyk shuffles a standard deck of 52 playing cards. He then turns the cards up one by one from the top of the deck until the third ace appears. If the expected (average) number of cards Richard will turn up is <math> | + | In his spare time, Richard Rusczyk shuffles a standard deck of 52 playing cards. He then turns the cards up one by one from the top of the deck until the third ace appears. If the expected (average) number of cards Richard will turn up is <math>m/n,</math> where <math>m</math> and <math>n</math> are relatively prime positive integers, find <math>m+n.</math> |
− | [[Mock_AIME_2_2006-2007/Problem_13|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_13|Solution]] |
== Problem 14 == | == Problem 14 == | ||
− | In triangle ABC, <math> | + | In triangle ABC, <math>AB = 308</math> and <math>AC=35.</math> Given that <math>AD</math>, <math>BE,</math> and <math>CF,</math> intersect at <math>P</math> and are an angle bisector, median, and altitude of the triangle, respectively, compute the length of <math>BC.</math> |
[[Image:Mock AIME 2 2007 Problem14.jpg]] | [[Image:Mock AIME 2 2007 Problem14.jpg]] | ||
− | [[Mock_AIME_2_2006-2007/Problem_14|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_14|Solution]] |
== Problem 15 == | == Problem 15 == | ||
− | A <math> | + | A <math>4\times4\times4</math> cube is composed of <math>64</math> unit cubes. The faces of <math>16</math> unit cubes are colored red. An arrangement of the cubes is <math>\mathfrak{Intriguing}</math> if there is exactly <math>1</math> red unit cube in every <math>1\times1\times4</math> rectangular box composed of <math>4</math> unit cubes. Determine the number of <math>\mathfrak{Intriguing}</math> colorings. |
− | [[Mock_AIME_2_2006-2007/Problem_15|Solution]] | + | [[Mock_AIME_2_2006-2007 Problems/Problem_15|Solution]] |
[[Image:CubeArt.jpg]] | [[Image:CubeArt.jpg]] |
Latest revision as of 22:49, 25 February 2017
Contents
Problem 1
A positive integer is called a dragon if it can be written as the sum of four positive integers and such that Find the smallest dragon.
Problem 2
The set consists of all integers from to inclusive. For how many elements in is an integer?
Problem 3
Let be the sum of all positive integers such that is a perfect square. Find the remainder when is divided by
Problem 4
Let be the smallest positive integer for which there exist positive real numbers and such that . Compute .
Problem 5
Given that and find
Problem 6
If and find
Problem 7
A right circular cone of base radius cm and slant height cm is given. is a point on the circumference of the base and the shortest path from around the cone and back is drawn (see diagram). If the length of this path is where and are relatively prime positive integers, find
Problem 8
The positive integers satisfy and for . Find the last three digits of .
Problem 9
In right triangle Cevians and intersect at and are drawn to and respectively such that and If where and are relatively prime and has no perfect square divisors excluding find
Problem 10
Find the number of solutions, in degrees, to the equation where
Problem 11
Find the sum of the squares of the roots, real or complex, of the system of simultaneous equations
Problem 12
In quadrilateral and If , and the area of is where are relatively prime positive integers, find
Note*: and refer to the areas of triangles and
Problem 13
In his spare time, Richard Rusczyk shuffles a standard deck of 52 playing cards. He then turns the cards up one by one from the top of the deck until the third ace appears. If the expected (average) number of cards Richard will turn up is where and are relatively prime positive integers, find
Problem 14
In triangle ABC, and Given that , and intersect at and are an angle bisector, median, and altitude of the triangle, respectively, compute the length of
Problem 15
A cube is composed of unit cubes. The faces of unit cubes are colored red. An arrangement of the cubes is if there is exactly red unit cube in every rectangular box composed of unit cubes. Determine the number of colorings.