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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Let P be a point outside a circle omega. Let A and B be points on the omega such that PA and PB are tangents to omega on the minor arc AB lies in an arbitrary point C. Let D, E, F be the feet of perpendicular from C to AB, PA, and PB respectively, so that CD square is equal to CE into CF.
If f(x) is a polynomial with integer coefficients and suppose that f(1) and f(2) both are odd, then prove that there exists no integer n for which f(n) = 0 .
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A fun problem beyond just theory. Find a pattern. I have found one. If nobody replies by tonight I will send once. Experts may verify if that can give us our desired result or not
Let AC be line segment in a plane and B is point between A and C construct isosceles triangle PAB and QBC on one side of the segment AC such that
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