7.1. / 6.5 Prove that out of any six people there will always be three pairs of acquaintances or three pairs of strangers.
7.2 Given a circle O and a square K, as well as a line L. Construct a segment of given length parallel to L and such that its ends lie on O and K respectively
7.3 The three-digit number abc is divisible by 37. Prove that the sum of the numbers bca and cab is also divisible by 37. (typo corrected)
7.4. Point C is the midpoint of segment AB. On an arbitrary ray drawn from point C and not lying on line AB, three consecutive points P, M and Q so that PM=MQ. Prove that AP+BQ>2CM.
https://cdn.artofproblemsolving.com/attachments/f/3/a8031007f5afc31a8b5cef98dd025474ac0351.png7.5. Given 2n+1 different objects. Prove that you can choose an odd number of objects from them in as many ways as an even number.
PS. You should use hide for answers. Collected [url=https://artofproblemsolving.com/community/c3983442_1961_leningrad_math_olympiad]here. algebrageometrycombinatoricsnumber theoryleningrad math olympiad