Difference between revisions of "AMC 12C 2020 Problems"
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==Problem 9== | ==Problem 9== | ||
− | Let <math>R(x)</math> be a function satisfying <math>R(m + n) = R(m)R(n)</math> for all real numbers <math>n</math> and <math>m</math>. Let <math>R(1) = \frac{1}{2}</math>. What is R(1) + R(2) + R(3) | + | Let <math>R(x)</math> be a function satisfying <math>R(m + n) = R(m)R(n)</math> for all real numbers <math>n</math> and <math>m</math>. Let <math>R(1) = \frac{1}{2}</math>. What is <math>R(1) + R(2) + R(3) + … + R(1000)</math>? |
==Problem 10== | ==Problem 10== |
Revision as of 14:16, 7 July 2020
Contents
Problem 1
glass bowls hang on sides of a balance each having a weight of pounds, bowl having lemons and the other bowl having . If lemons weigh pounds each, how many lemons should be added to the lighter bowl to balance the scale?
Problem 2
has side lengths of , , and , and . What is the smallest possible measure of ?
Problem 3
In a bag are marbles consisting of blue marbles and red marbles. If each marble is pulled out at a time, what is the probability that the marble pulled out red?
Problem 4
A spaceship flies in space at a speed of miles/hour and the spaceship is paid dollars for each miles traveled. It’s only expense is fuel in which it pays dollars per gallon, while going at a rate of hours per gallon. Traveling miles, how much money would the spaceship have gained?
Problem 5
A plane flies at a speed of miles/hour north of west, while another plane flies directly in the east direction at a speed of miles/hour. How far are apart are the the planes after hours?
Problem 6
How many increasing(lower to higher numbered) subsets of contain no consecutive prime numbers?
Problem 7
The line has an equation is rotated clockwise by to obtain the line . What is the distance between the - intercepts of Lines and ?
Problem 8
The real value of that satisfies the equation can be written in the form where and are integers. What is ?
Problem 9
Let be a function satisfying for all real numbers and . Let . What is ?
Problem 10
In how many ways can candy canes and lollipops be split between children if each child must receive atleast candy but no child receives both types?
Problem 11
Let be an isosceles trapezoid with being parallel to and , , and . If is the intersection of and , and is the circumcenter of , what is the length of ?
Problem 12
An ant is lost inside a square with an unknown side length. The ant is units away from , units away from , and units away from . By how many units is the ant away from ?
Problem 13
In how many ways can the first positive integers; in red, blue, and green colors if no numbers , and are the same color with being even?
Problem 14
Let be the set of solutions to the equation on the complex plane, where . points from are chosen, such that a circle passes through both points. What is the least possible area of ?
Problem 15
Let . What is the remainder when is divided by ?
Problem 16
For some positive integer , let satisfy the equation
. What is the sum of the digits of ?
Problem 17
A by glass case of glass boxes are to be filled with purple balls and red balls such that each row and column contains exactly of each a red and purple ball. In how many ways can this arrangement be done?
Problem 18
lays flat on the ground and has side lengths , and . Vertex is then lifted up creating an elevation angle with the triangle and the ground of . A wooden pole is dropped from perpendicular to the ground, making an altitude of a Dimensional figure. Ropes are connected from the foot of the pole, , to form other segments, and . What is the volume of ?
Problem 19
Let be a cubic polynomial with integral coefficients and roots , , and . What is the least possible sum of the coefficients of ?
Problem 20
What is the maximum value of as varies through all real numbers to the nearest integer?
Problem 21
Let denote the greatest integer less than or equal to . How many positive integers , satisfy the equation
?
Problem 22
A convex hexagon is inscribed in a circle.