AMC 12C 2020 Problems
Contents
Problem 1
What is the the sum of the solutions of the equation ?
Problem 2
What is the numerical value of the sum
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
cows can consume kilograms of grass in days. How many more cows are required such that all the cows together can consume kilograms of grass in days?
Problem 5
Lambu the Lamb is tied to a post at the origin on the real plane with a rope that measures units. wolves are tied with ropes of length as well, both of them being at points , and . What is the area that the lamb can run around without being in the range of the wolves?
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 denote the number of trailing s in the numerical value of the expression , for example, since which has trailing zero. What is the sum
?
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
Rajbhog, Aditya, and Suman are racing a meter race. Aditya beats Rajbhog by seconds and beats Suman by meters. Given that Rajbhog beat Suman by seconds, by how many meters would Aditya beat Rajbhog if they both were having a meter race?
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
A function (Function along Complex Numbers) is defined by , where and are positive real numbers. The function has the property that there are complex numbers such that , and form a triangle with an area of . Given that and , there is a certain complex number where is minimized as much as possible satisfying this condition. What is ?
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
How many ordered pairs satisfy
where denotes the greatest common divisor and denotes the least common multiple?
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 25
Let denote the greatest integer less than or equal to and let denote the factional part of or $x - \lfloor\ x \floor$ (Error compiling LaTeX. Unknown error_msg). How many real numbers satisfy the equation
?