2021 GMC 12
Contents
[hide]Problem 1
Compute the number of ways to arrange distinguishable apples and
indistinguishable books such that all five books must be adjacent.
Problem 2
In square with side length
, point
and
are on side
and
respectively, such that
is perpendicular to
and
. Find the area enclosed by the quadrilateral
.
Problem 3
Lucas wants to choose a seat to sit in a row of ten seats marked , respectively. Given that Michael595 is an even-preferer and he would sit in any even seat. Find the probability that Lucas would not sit next to Michael595 (because he hates him).
Problem 4
If , find
(Note that
means logarithmic function that has a base of
, and
is the natural logarithm.).
Problem 5
Let be a sequence of positive integers with
and
and
for all integers
such that
. Find
.
Problem 6
Compute the remainder when the summation
is divided by .
Problem 7
The answer of this problem can be expressed as
which
are not necessarily distinct positive integers, and all of
are not divisible by any square number. Find
.
Problem 8
Let be a
term sequence of positive integers such that
,
,
,
,
. Find the number of such sequences
such that all of
.
Problem 9
Find the largest possible such that
is divisible by
Problem 10
Let be the sequence of positive integers such that all of the elements in the sequence only includes either a combination of digits of
and
, or only
. For example:
and
are examples, but not
. The first several terms of the sequence is
. The
th term of the sequence is
. What is
?
Problem 11
Given that the two roots of polynomial are
and
which
represents an angle. Find
Problem 12
Find the number of nonempty subsets of such that the product of all the numbers in the subset is NOT divisible by
.
Problem 13
If , find the maximum possible value of
such that both of
and
are integers and
Problem 14
A square with side length is rotated
about its center. The square would externally swept out
identical small regions as it rotates. Find the area of one of the small region.
Problem 15
In a circle with a radius of , four arcs are drawn inside the circle. Smaller circles are inscribed inside the eye-shape diagrams. Let
denote the area of the greatest circle that can be inscribed inside the unshaded region. and let
denote the total area of unshaded region. Find
Problem 21
The exact value of can be expressed as
which the fraction is in the most simplified form,
and
,
,
,
and
are not necessary distinct positive integers. Find
Problem 22
Given that on a complex plane, there is a polar coordinate . The point
is rotated
clockwise to form the new point
,
to form
, and
to form
degrees around the origin. Evaluate: