Difference between revisions of "2007 iTest Problems"
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| − | ==Problem 1== | + | ==Multiple Choice Section== |
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| + | ===Problem 1=== | ||
A twin prime pair is a set of two primes <math>(p, q)</math> such that <math>q</math> is <math>2</math> greater than <math>p</math>. What is the arithmetic mean of the two primes in the smallest twin prime pair? | A twin prime pair is a set of two primes <math>(p, q)</math> such that <math>q</math> is <math>2</math> greater than <math>p</math>. What is the arithmetic mean of the two primes in the smallest twin prime pair? | ||
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[[2007 iTest Problems/Problem 1|Solution]] | [[2007 iTest Problems/Problem 1|Solution]] | ||
| − | ==Problem 2== | + | ===Problem 2=== |
Find <math>a + b</math> if <math>a</math> and <math>b</math> satisfy | Find <math>a + b</math> if <math>a</math> and <math>b</math> satisfy | ||
<math>3a + 7b = 1977</math> and <math>5a + b = 2007</math>. | <math>3a + 7b = 1977</math> and <math>5a + b = 2007</math>. | ||
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[[2007 iTest Problems/Problem 2|Solution]] | [[2007 iTest Problems/Problem 2|Solution]] | ||
| − | ==Problem 3== | + | ===Problem 3=== |
An abundant number is a natural number that's proper divisors sum is greater than the number. Which one of the following natural numbers is an abundant number? | An abundant number is a natural number that's proper divisors sum is greater than the number. Which one of the following natural numbers is an abundant number? | ||
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[[2007 iTest Problems/Problem 3|Solution]] | [[2007 iTest Problems/Problem 3|Solution]] | ||
| − | ==Problem 4== | + | ===Problem 4=== |
Star flips a quarter four times. Find the probability that the quarter lands heads exactly twice. | Star flips a quarter four times. Find the probability that the quarter lands heads exactly twice. | ||
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[[2007 iTest Problems/Problem 4|Solution]] | [[2007 iTest Problems/Problem 4|Solution]] | ||
| − | ==Problem 5== | + | ===Problem 5=== |
Compute the sum of all twenty-one terms of the geometric series | Compute the sum of all twenty-one terms of the geometric series | ||
<cmath>1 + 2 + 4 + 8 + \ldots + 1048576</cmath>. | <cmath>1 + 2 + 4 + 8 + \ldots + 1048576</cmath>. | ||
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[[2007 iTest Problems/Problem 5|Solution]] | [[2007 iTest Problems/Problem 5|Solution]] | ||
| − | ==Problem 6== | + | ===Problem 6=== |
Find the units digit of the sum | Find the units digit of the sum | ||
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[[2007 iTest Problems/Problem 6|Solution]] | [[2007 iTest Problems/Problem 6|Solution]] | ||
| − | ==Problem 7== | + | ===Problem 7=== |
An equilateral triangle with side length <math>1</math> has the same area as a square with side length <math>s</math>. | An equilateral triangle with side length <math>1</math> has the same area as a square with side length <math>s</math>. | ||
Find <math>s</math>. | Find <math>s</math>. | ||
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[[2007 iTest Problems/Problem 7|Solution]] | [[2007 iTest Problems/Problem 7|Solution]] | ||
| − | ==Problem 8== | + | ===Problem 8=== |
Joe is right at the middle of a train tunnel and he realizes that a train is coming. The train travels at a speed of 50 miles per hour, and Joe can run at a speed of 10 miles per hour. Joe hears the train whistle when the train is a half mile from the point where it will enter the tunnel. At that point in time, Joe can run toward the train and just exit the tunnel as the train meets him. Instead, Joe runs away from the train when he hears the whistle. How many seconds does he have to spare (before the train is upon him) when he gets to the tunnel entrance? | Joe is right at the middle of a train tunnel and he realizes that a train is coming. The train travels at a speed of 50 miles per hour, and Joe can run at a speed of 10 miles per hour. Joe hears the train whistle when the train is a half mile from the point where it will enter the tunnel. At that point in time, Joe can run toward the train and just exit the tunnel as the train meets him. Instead, Joe runs away from the train when he hears the whistle. How many seconds does he have to spare (before the train is upon him) when he gets to the tunnel entrance? | ||
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[[2007 iTest Problems/Problem 8|Solution]] | [[2007 iTest Problems/Problem 8|Solution]] | ||
| − | ==Problem 9== | + | ===Problem 9=== |
Suppose that <math>m</math> and <math>n</math> are positive integers such that <math>m < n</math>, the geometric mean of <math>m</math> and <math>n</math> is greater than <math>2007</math>, and the arithmetic mean of <math>m</math> and <math>n</math> is less than <math>2007</math>. How many pairs <math>(m, n)</math> satisfy these conditions? | Suppose that <math>m</math> and <math>n</math> are positive integers such that <math>m < n</math>, the geometric mean of <math>m</math> and <math>n</math> is greater than <math>2007</math>, and the arithmetic mean of <math>m</math> and <math>n</math> is less than <math>2007</math>. How many pairs <math>(m, n)</math> satisfy these conditions? | ||
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[[2007 iTest Problems/Problem 9|Solution]] | [[2007 iTest Problems/Problem 9|Solution]] | ||
| − | ==Problem 10== | + | ===Problem 10=== |
My grandparents are Arthur, Bertha, Christoph, and Dolores. My oldest grandparent is only <math>4</math> years older than my youngest grandparent. Each grandfather is two years older than his wife. If Bertha is younger than Dolores, what is the difference between Bertha’s age and the mean of my grandparents’ ages? | My grandparents are Arthur, Bertha, Christoph, and Dolores. My oldest grandparent is only <math>4</math> years older than my youngest grandparent. Each grandfather is two years older than his wife. If Bertha is younger than Dolores, what is the difference between Bertha’s age and the mean of my grandparents’ ages? | ||
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[[2007 iTest Problems/Problem 10|Solution]] | [[2007 iTest Problems/Problem 10|Solution]] | ||
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| + | ===Problem 11=== | ||
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| + | ===Problem 12=== | ||
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| + | ===Problem 13=== | ||
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| + | ===Problem 14=== | ||
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| + | ===Problem 15=== | ||
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| + | ===Problem 16=== | ||
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| + | ===Problem 17=== | ||
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| + | ===Problem 18=== | ||
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| + | ===Problem 19=== | ||
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| + | ===Problem 20=== | ||
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| + | ===Problem 21=== | ||
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| + | ===Problem 22=== | ||
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| + | ===Problem 23=== | ||
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| + | ===Problem 24=== | ||
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| + | ===Problem 25=== | ||
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| + | ==Short Answer Section== | ||
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| + | ===Problem 26=== | ||
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| + | ===Problem 27=== | ||
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| + | ===Problem 28=== | ||
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| + | ===Problem 29=== | ||
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| + | ===Problem 30=== | ||
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| + | ===Problem 31=== | ||
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| + | ===Problem 32=== | ||
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| + | ===Problem 33=== | ||
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| + | ===Problem 34=== | ||
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| + | ===Problem 35=== | ||
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| + | ===Problem 36=== | ||
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| + | ===Problem 37=== | ||
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| + | ===Problem 38=== | ||
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| + | ===Problem 39=== | ||
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| + | ===Problem 40=== | ||
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| + | ===Problem 41=== | ||
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| + | ===Problem 42=== | ||
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| + | ===Problem 43=== | ||
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| + | ===Problem 44=== | ||
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| + | ===Problem 45=== | ||
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| + | ===Problem 46=== | ||
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| + | ===Problem 47=== | ||
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| + | ===Problem 48=== | ||
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| + | ===Problem 49=== | ||
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| + | ===Problem 50=== | ||
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| + | ==Ultimate Question== | ||
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| + | ===Problem 51=== | ||
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| + | ===Problem 52=== | ||
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| + | ===Problem 53=== | ||
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| + | ===Problem 54=== | ||
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| + | ===Problem 55=== | ||
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| + | ===Problem 56=== | ||
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| + | ===Problem 57=== | ||
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| + | ===Problem 58=== | ||
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| + | ===Problem 59=== | ||
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| + | ===Problem 60=== | ||
{{incomplete|problem page}} | {{incomplete|problem page}} | ||
Revision as of 12:00, 13 May 2009
Contents
- 1 Multiple Choice Section
- 1.1 Problem 1
- 1.2 Problem 2
- 1.3 Problem 3
- 1.4 Problem 4
- 1.5 Problem 5
- 1.6 Problem 6
- 1.7 Problem 7
- 1.8 Problem 8
- 1.9 Problem 9
- 1.10 Problem 10
- 1.11 Problem 11
- 1.12 Problem 12
- 1.13 Problem 13
- 1.14 Problem 14
- 1.15 Problem 15
- 1.16 Problem 16
- 1.17 Problem 17
- 1.18 Problem 18
- 1.19 Problem 19
- 1.20 Problem 20
- 1.21 Problem 21
- 1.22 Problem 22
- 1.23 Problem 23
- 1.24 Problem 24
- 1.25 Problem 25
- 2 Short Answer Section
- 2.1 Problem 26
- 2.2 Problem 27
- 2.3 Problem 28
- 2.4 Problem 29
- 2.5 Problem 30
- 2.6 Problem 31
- 2.7 Problem 32
- 2.8 Problem 33
- 2.9 Problem 34
- 2.10 Problem 35
- 2.11 Problem 36
- 2.12 Problem 37
- 2.13 Problem 38
- 2.14 Problem 39
- 2.15 Problem 40
- 2.16 Problem 41
- 2.17 Problem 42
- 2.18 Problem 43
- 2.19 Problem 44
- 2.20 Problem 45
- 2.21 Problem 46
- 2.22 Problem 47
- 2.23 Problem 48
- 2.24 Problem 49
- 2.25 Problem 50
- 3 Ultimate Question
Multiple Choice Section
Problem 1
A twin prime pair is a set of two primes 
such that 
is 
greater than 
. What is the arithmetic mean of the two primes in the smallest twin prime pair?
Problem 2
Find 
if 
and 
satisfy
and 
.
Problem 3
An abundant number is a natural number that's proper divisors sum is greater than the number. Which one of the following natural numbers is an abundant number?
Problem 4
Star flips a quarter four times. Find the probability that the quarter lands heads exactly twice.
Problem 5
Compute the sum of all twenty-one terms of the geometric series
![\[1 + 2 + 4 + 8 + \ldots + 1048576\]](http://latex.artofproblemsolving.com/c/c/1/cc1b6f284c8465d2e1aa0af729878c3a9ab4fdbf.png)
.
Problem 6
Find the units digit of the sum
![\[\sum_{i=1}^{100}(i!)^{2}\]](http://latex.artofproblemsolving.com/4/6/d/46d3c9f38511a89b99e238905fb6f3747dfd6176.png)
Problem 7
An equilateral triangle with side length 
has the same area as a square with side length 
.
Find .
![$\mathrm{(A)}\,\frac{\sqrt[4]{3}}{2}\quad\mathrm{(B)}\,\frac{\sqrt[4]{3}}{\sqrt{2}}\quad\mathrm{(C)}\,1\quad\mathrm{(D)}\,\frac{3}{4}\quad\mathrm{(E)}\,\frac{4}{3}\quad\mathrm{(F)}\,\sqrt{3}\quad\mathrm{(G)}\,\frac{\sqrt6}{2}$](http://latex.artofproblemsolving.com/0/f/d/0fd9825fdc1605c6a9bd15b665c79728f942f87c.png)
Problem 8
Joe is right at the middle of a train tunnel and he realizes that a train is coming. The train travels at a speed of 50 miles per hour, and Joe can run at a speed of 10 miles per hour. Joe hears the train whistle when the train is a half mile from the point where it will enter the tunnel. At that point in time, Joe can run toward the train and just exit the tunnel as the train meets him. Instead, Joe runs away from the train when he hears the whistle. How many seconds does he have to spare (before the train is upon him) when he gets to the tunnel entrance?
Problem 9
Suppose that 
and 
are positive integers such that 
, the geometric mean of and is greater than 
, and the arithmetic mean of and is less than . How many pairs 
satisfy these conditions?
Problem 10
My grandparents are Arthur, Bertha, Christoph, and Dolores. My oldest grandparent is only 
years older than my youngest grandparent. Each grandfather is two years older than his wife. If Bertha is younger than Dolores, what is the difference between Bertha’s age and the mean of my grandparents’ ages?
