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AMC 12 2002 A

Question 1

Compute the sum of all the roots of

Solution

  
  2020-07-09 06:38:53

Question 2

Cindy was asked by her teacher to subtract 3 from a certain number and then divide the result by 9. Instead, she subtracted 9 and then divided the result by 3, giving an answer of 43. What would her answer have been had she worked the problem correctly?

Solution

  
  2020-07-09 06:38:53

Question 3

According to the standard convention for exponentiation,

If the order in which the exponentiations are performed is changed, how many other values are possible?

Solution

  
  2020-07-09 06:38:53

Question 4

Find the degree measure of an angle whose complement is 25% of its supplement.

Solution

  
  2020-07-09 06:38:53

Question 5

Each of the small circles in the figure has radius one. The innermost circle is tangent to the six circles that surround it, and each of those circles is tangent to the large circle and to its small-circle neighbors. Find the area of the shaded region.

Solution

  
  2020-07-09 06:38:53

Question 6

For how many positive integers does there exist at least one positive integer such that ?

infinitely many

Solution

  
  2020-07-09 06:38:54

Question 7

A arc of circle A is equal in length to a arc of circle B. What is the ratio of circle A's area and circle B's area?

Solution

  
  2020-07-09 06:38:54

Question 8

Betsy designed a flag using blue triangles, small white squares, and a red center square, as shown. Let be the total area of the blue triangles, the total area of the white squares, and the area of the red square. Which of the following is correct?

Solution

  
  2020-07-09 06:38:54

Question 9

Jamal wants to save 30 files onto disks, each with 1.44 MB space. 3 of the files take up 0.8 MB, 12 of the files take up 0.7 MB, and the rest take up 0.4 MB. It is not possible to split a file onto 2 different disks. What is the smallest number of disks needed to store all 30 files?

Solution

  
  2020-07-09 06:38:54

Question 10

Sarah places four ounces of coffee into an eight-ounce cup and four ounces of cream into a second cup of the same size. She then pours half the coffee from the first cup to the second and, after stirring thoroughly, pours half the liquid in the second cup back to the first. What fraction of the liquid in the first cup is now cream?

Solution

  
  2020-07-09 06:38:54

Question 11

Mr. Earl E. Bird gets up every day at 8:00 AM to go to work. If he drives at an average speed of 40 miles per hour, he will be late by 3 minutes. If he drives at an average speed of 60 miles per hour, he will be early by 3 minutes. How many miles per hour does Mr. Bird need to drive to get to work exactly on time?

Solution

  
  2020-07-09 06:38:54

Question 12

Both roots of the quadratic equation are prime numbers. The number of possible values of is

Solution

  
  2020-07-09 06:38:54

Question 13

Two different positive numbers and each differ from their reciprocals by . What is ?

Solution

  
  2020-07-09 06:38:54

Question 14

For all positive integers , let . Let . Which of the following relations is true?

Solution

  
  2020-07-09 06:38:54

Question 15

The mean, median, unique mode, and range of a collection of eight integers are all equal to 8. The largest integer that can be an element of this collection is

Solution

  
  2020-07-09 06:38:54

Question 16

Tina randomly selects two distinct numbers from the set , and Sergio randomly selects a number from the set . What is the probability that Sergio's number is larger than the sum of the two numbers chosen by Tina?

Solution

  
  2020-07-09 06:38:54

Question 17

Several sets of prime numbers, such as use each of the nine nonzero digits exactly once. What is the smallest possible sum such a set of primes could have?

Solution

  
  2020-07-09 06:38:54

Question 18

Let and be circles defined by and respectively. What is the length of the shortest line segment that is tangent to at and to at ?

Solution

  
  2020-07-09 06:38:54

Question 19

The graph of the function is shown below. How many solutions does the equation have?

Solution

  
  2020-07-09 06:38:54

Question 20

Suppose that and are digits, not both nine and not both zero, and the repeating decimal is expressed as a fraction in lowest terms. How many different denominators are possible?

Solution

  
  2020-07-09 06:38:54

Question 21

Consider the sequence of numbers: For , the -th term of the sequence is the units digit of the sum of the two previous terms. Let denote the sum of the first terms of this sequence. The smallest value of for which is:

Solution

  
  2020-07-09 06:38:54

Question 22

Triangle is a right triangle with as its right angle, , and . Let be randomly chosen inside , and extend to meet at . What is the probability that ?

Solution

  
  2020-07-09 06:38:54

Question 23

In triangle , side and the perpendicular bisector of meet in point , and bisects . If and , what is the area of triangle ?

Solution

  
  2020-07-09 06:38:54

Question 24

Find the number of ordered pairs of real numbers such that .

Solution

  
  2020-07-09 06:38:54

Question 25

The nonzero coefficients of a polynomial with real coefficients are all replaced by their mean to form a polynomial . Which of the following could be a graph of and over the interval ?

Solution

  
  2020-07-09 06:38:54

Answer Keys


Question 1: A
Question 2: A
Question 3: B
Question 4: B
Question 5: C
Question 6: E
Question 7: A
Question 8: A
Question 9: B
Question 10: D
Question 11: B
Question 12: B
Question 13: C
Question 14: D
Question 15: D
Question 16: A
Question 17: B
Question 18: C
Question 19: D
Question 20: C
Question 21: B
Question 22: C
Question 23: D
Question 24: E
Question 25: B