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p(2018)= p(2019)

Source: MEMO 2018 I4

September 7, 2018

number theoryalgebrafloor function

Problem Statement

(a) Prove that for every positive integer

m

there exists an integer

n\ge m

such that

\left \lfloor \frac{n}{1} \right \rfloor \cdot \left \lfloor \frac{n}{2} \right \rfloor \cdots \left \lfloor \frac{n}{m} \right \rfloor =\binom{n}{m} \\\\\\\\\\\\\\\ (*)

(b) Denote by

p(m)

the smallest integer

n \geq m

such that the equation

x.

holds. Prove that

p(2018) = p(2019).

Remark: For a real number

x,

we denote by

\left \lfloor x \right \rfloor

the largest integer not larger than

x.

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