2024年4月11日发(作者:家有儿女数学试卷)
USA AMC 10 2000
1
In the year , the United States will host the International
Mathematical Olympiad. Let , , and be distinct positive integers
such that the product . What\'s the largest possible
value of the sum ?
Solution
The sum is the highest if two factors are the lowest.
So,
2
and .
Solution
.
3
Each day, Jenny ate of the jellybeans that were in her jar at the
beginning of the day. At the end of the second day, remained. How
many jellybeans were in the jar originally?
Solution
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4
Chandra pays an online service provider a fixed monthly fee plus an
hourly charge for connect time. Her December bill was , but in
January her bill was because she used twice as much connect
time as in December. What is the fixxed monthly fee?
Solution
Let be the fixed fee, and be the amount she pays for the minutes
she used in the first month.
We want the fixed fee, which is
5
Points and are the midpoints of sides
moves along a line that is parallel to side
quantities listed below change?
(a) the length of the segment
(b) the perimeter of
(c) the area of
and of . As
, how many of the four
(d) the area of trapezoid
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Solution
(a) Clearly does not change, and , so doesn\'t
change either.
(b) Obviously, the perimeter changes.
(c) The area clearly doesn\'t change, as both the base
corresponding height remain the same.
and its
(d) The bases and do not change, and neither does the height,
so the trapezoid remains the same.
Only quantity changes, so the correct answer is .
6
The Fibonacci Sequence starts with two 1s and
each term afterwards is the sum of its predecessors. Which one of the
ten digits is the last to appear in thet units position of a number in the
Fibonacci Sequence?
Solution
The pattern of the units digits are
In order of appearance:
.
is the last.
7
In rectangle , , is on , and
. What is the perimeter of ?
and trisect
- 3 -
Solution
.
Since
Thus,
.
Adding,
8
At Olympic High School, of the freshmen and of the sophomores
took the AMC-10. Given that the number of freshmen and sophomore
contestants was the same, which of the following must be true?
There are five times as many sophomores as freshmen.
There are twice as many sophomores as freshmen.
There are as many freshmen as sophomores.
There are twice as many freshmen as sophomores.
There are five times as many freshmen as sophomores.
Solution
.
is trisected,
.
- 4 -
Let be the number of freshman and be the number of sophomores.
There are twice as many freshmen as sophomores.
9
If
, where , then
Solution
, so
.
.
.
10
The sides of a triangle with positive area have lengths , , and .
The sides of a second triangle with positive area have lengths , ,
and . What is the smallest positive number that is not a possible
value of ?
Solution
From the triangle inequality,
positive number not possible is
and
, which is .
. The smallest
11
Two different prime numbers between and are chosen. When their
sum is subtracted from their product, which of the following numbers
could be obtained?
Solution
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Two prime numbers between and are both odd.
Thus, we can discard the even choices.
Both and
of four.
are even, so one more than is a multiple
is the only possible choice.
satisfy this,
12
Figures , , , and consist of , , , and nonoverlapping unit
squares, respectively. If the pattern were continued, how many
nonoverlapping unit squares would there be in figure 100?
.
Solution
Solution 1
We have a recursion:
.
I.E. we add increasing multiples of each time we go up a figure.
So, to go from Figure 0 to 100, we add
.
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Solution 2
We can divide up figure to get the sum of the sum of the first
odd numbers and the sum of the first odd numbers. If you do not see
this, here is the example for :
The sum of the first odd numbers is
unit squares. We plug in
choice
13
There are 5 yellow pegs, 4 red pegs, 3 green pegs, 2 blue pegs, and 1
orange peg to be placed on a triangular peg board. In how many ways
can the pegs be placed so that no (horizontal) row or (vertical) column
contains two pegs of the same color?
, so for figure , there are
to get , which is
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Solution
In each column there must be one yellow peg. In particular, in the
rightmost column, there is only one peg spot, therefore a yellow peg
must go there.
In the second column from the right, there are two spaces for pegs.
One of them is in the same row as the corner peg, so there is only one
remaining choice left for the yellow peg in this column.
By similar logic, we can fill in the yellow pegs as shown:
After this we can proceed to fill in the whole pegboard, so there is only
arrangement of the pegs. The answer is
14
Mrs. Walter gave an exam in a mathematics class of five students.
She entered the scores in random order into a spreadsheet, which
recalculated the class average after each score was entered. Mrs.
Walter noticed that after each score was entered, the average was
always an integer. The scores (listed in ascending order) were , ,
, , and . What was the last score Mrs. Walter entered?
Solution
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The sum of the first scores must be even, so we must choose evens
or the odds to be the first two scores.
Let us look at the numbers in mod .
If we choose the two odds, the next number must be a multiple of ,
of which there is none.
Similarly, if we choose or , the next number must be a
multiple of , of which there is none.
So we choose first.
remains. The next number must be 1 in mod 3, of which only
The sum of the first three scores is
.
. This is equivalent to in mod
is the only Thus, we need to choose one number that is in mod .
one that works.
Thus, is the last score entered.
15
Two non-zero real numbers, and , satisfy
following is a possible value of
?
. Which of the
Solution
Substituting , we get
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16
The diagram shows lattice points, each one unit from its nearest
neighbors. Segment meets segment at . Find the length of
segment .
Solution
Solution 1
Let be the line containing and and let be the line containing
and . If we set the bottom left point at
, , and .
. The -intercept is
, then ,
The line is given by the equation
, so . We are given two points on , hence we can
to be , so is the line
. The slope in this case is
gives us
,
compute the slope,
Similarly, is given by
so
line
. Plugging in the point
.
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, so is the
At , the intersection point, both of the equations must be true, so
We have the coordinates of
formula here:
which is answer choice
Solution 2
and , so we can use the distance
Draw the perpendiculars from and to , respectively. As it turns
out, . Let be the point on for which .
, and
By the Pythagorean Theorem, we have
, and . Let
,
, so
, so by AA similarity,
, then
This is answer choice
Also, you could extend CD to the end of the box and create two similar
triangles. Then use ratios and find that the distance is 5/9 of the
diagonal AB. Thus, the answer is B.
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17
Boris has an incredible coin changing machine. When he puts in a
quarter, it returns five nickels; when he puts in a nickel, it returns five
pennies; and when he puts in a penny, it returns five quarters. Boris
starts with just one penny. Which of the following amounts could Boris
have after using the machine repeatedly?
Solution
Consider what happens each time he puts a coin in. If he puts in a
quarter, he gets five nickels back, so the amount of money he has
doesn\'t change. Similarly, if he puts a nickel in the machine, he gets
five pennies back and the money value doesn\'t change. However, if he
puts a penny in, he gets five quarters back, increasing the amount of
money he has by cents.
This implies that the only possible values, in cents, he can have are
the ones one more than a multiple of . Of the choices given, the
only one is
18
Charlyn walks completely around the boundary of a square whose
sides are each km long. From any point on her path she can see
exactly km horizontally in all directions. What is the area of the
region consisting of all points Charlyn can see during her walk,
expressed in square kilometers and rounded to the nearest whole
number?
Solution
The area she sees looks at follows:
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The part inside the walk has area . The part outside the
walk consists of four rectangles, and four arcs. Each of the rectangles
has area . The four arcs together form a circle with radius .
Therefore
is .
the total area she can see is
, which rounded to the nearest integer
19
Through a point on the hypotenuse of a right triangle, lines are drawn
parallel to the legs of the triangle so that the trangle is divided into a
square and two smaller right triangles. The area of one of the two
small right triangles is times the area of the square. The ratio of the
area of the other small right triangle to the area of the square is
Solution
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Let the square have area , then it follows that the altitude of one of
the triangles is . The area of the other triangle is .
By similar triangles, we have
This is choice
(Note that this approach is enough to get the correct answer in the
contest. However, if we wanted a completely correct solution, we
should also note that scaling the given triangle times changes each
of the areas times, and therefore it does not influence the ratio of
any two areas. This is why we can pick the side of the square.)
20
Let , , and be nonnegative integers such that
What is the maximum value of
Solution
The trick is to realize that the sum
to the product
If we multiply
.
We know that ,
.
Therefore the maximum value of
the maximum value of
this maximum.
Suppose that some two of ,
triple
, and differ by at least . Then this
is equal to
. Now we will find
therefore
.
, we get
is similar
.
?
is surely not optimal.
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Proof: WLOG let . We can then increase the value of
by changing and .
is a Therefore the maximum is achieved in the cases where
rotation of . The value of in this case is
is . And thus the maximum of
.
21
If all alligators are ferocious creatures and some creepy crawlers are
alligators, which statement(s) must be true?
I. All alligators are creepy crawlers.
II. Some ferocious creatures are creepy crawlers.
III. Some alligators are not creepy crawlers.
Solution
We interpret the problem statement as a query about three abstract
concepts denoted as \"alligators\", \"creepy crawlers\" and \"ferocious
creatures\". In answering the question, we may NOT refer to reality --
for example to the fact that alligators do exist.
To make more clear that we are not using anything outside the
problem statement, let\'s rename the three concepts as , , and .
We got the following information:
▪
▪
If is an , then is an .
There is some that is a and at the same time an .
We CAN NOT conclude that the first statement is true. For example,
the situation \"Johnny and Freddy are s, but only Johnny is a \"
meets both conditions, but the first statement is false.
We CAN conclude that the second statement is true. We know that
there is some that is a and at the same time an . Pick one such
and call it Bobby. Additionally, we know that if is an , then is an
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. Bobby is an , therefore Bobby is an . And this is enough to
prove the second statement -- Bobby is an that is also a .
We CAN NOT conclude that the third statement is true. For example,
consider the situation when , and are equivalent (represent the
same set of objects). In such case both conditions are satisfied, but
the third statement is false.
Therefore the answer is .
22
One morning each member of Angela\'s family drank an -ounce
mixture of coffee with milk. The amounts of coffee and milk varied
from cup to cup, but were never zero. Angela drank a quarter of the
total amount of milk and a sixth of the total amount of coffee. How
many people are in the family?
Solution
The exact value \"8 ounces\" is not important. We will only use the fact
that each member of the family drank the same amount.
Let be the total number of ounces of milk drank by the family and
the total number of ounces of coffee. Thus the whole family drank a
total of ounces of fluids.
Let be the number of family members. Then each family member
drank ounces of fluids.
ounces of fluids.
.
.
.
.
We know that Angela drank
As Angela is a family member, we have
Multiply both sides by to get
If
If
, we have
, we have
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Therefore the only remaining option is .
23
When the mean, median, and mode of the list are
arranged in increasing order, they form a non-constant arithmetic
progression. What is the sum of all possible real values of ?
Solution
As occurs three times and each of the three other values just once,
regardless of what we choose the mode will always be .
The sum of all numbers is , therefore the mean is .
The six known values, in sorted order, are . From this
sequence we conclude: If , the median will be . If , the
median will be . Finally, if , the median will be .
We will now examine each of these three cases separately.
In the case , both the median and the mode are 2, therefore we
can not get any non-constant arithmetic progression.
In the case we have , because
. Therefore our three values in
order are
third term must be
. We want this to be an arithmetic progression.
. Therefore the
.
From the first two terms the difference must be
Solving
The case
we get the only solution for this case:
remains. Once again, we have
. The only solution is when
.
,
, therefore the order is
i. e., .
The sum of all solutions is therefore
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.
24
Let be a function for which
values of for which
Solution
In the definition of , let
we have
.
One can now either explicitly compute the roots, or use Vieta\'s
formulas. According to them, the sum of the roots of
is . In our case this is .
. We get: . As
, in other words
.
. Find the sum of all
, we must have
(Note that for the above approach to be completely correct, we should
additionally verify that there actually are two distinct real roots. This
is, for example, obvious from the facts that and .)
25
In year , the day of the year is a Tuesday. In year , the
day is also a Tuesday. On what day of the week did the of
year occur?
Solution
Clearly, identifying what of these years may/must/may not be a leap
year will be key in solving the problem.
Let be the day of year
the day of year .
If year
, the day of year and
is not a leap year, the day will be
, that would be a Monday.
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days after . As
Therefore year must be a leap year. (Then is days after .)
As there can not be two leap years after each other, is not a leap
year. Therefore day is days after . We have
. Therefore is weekdays before , i.e., is a
.
(Note that the situation described by the problem statement indeed
occurs in our calendar. For example, for we have
=Tuesday, October 26th 2004, =Tuesday, July 19th, 2005 and
=Thursday, April 10th 2003.)
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