Maths Olympiad Daily Problems
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This channel is created for maths lovers and maths Olympiad aspirants who loves to solve daily some good level of thinking problems in maths.also we discuss those problems https://t.me/mathproblemsdiscussiongroup and we can send our doubts in maths.
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#Question17
If every point in the plane is colored either red, yellow, green, or blue, show that
some two points are a distance of either 1 or √3 apart and have the same color.
#Question14
Is there a positive integer which can be written as the sum of 2026 consecutive positive integers and which can be written as a sum of two or more consecutive positive integers in just 2026 ways?
Credits to Aryan,
A positive integer m has the property that m² Is expressible in the form
(4n² - 5n + 16) where n is an integer
(of any sign). Find the maximum possible value of |m - n|.
Credits to Aryan,
A positive integer m has the property that m² Is expressible in the form
(4n² - 5n + 16) where n is an integer
(of any sign). Find the maximum possible value of
|m - n|.
Credits to Aryan,
A positive integer m has the property that m² Is expressible in the form
(4n² - 5n + 16) where n is an integer (of any sign). Find the maximum possible value of
|m - n|.
Credits to Aryan,
A positive integer m has the property that m² Is expressible in the form (4n² - 5n + 16) where n is an integer (of any sign). Find the maximum possible value of
|m - n|.
Credits to Aryan,
A positive integer m has the property that m² Is expressible in the form
(4n² - 5n + 16) where n is an integer (of any sign). Find the maximum possible value of
|m - n|.
