Find the minimum value of m such that any m-element subset of the set of integers {1,2,3...,2016} contains at least 2 numbers a and b such that |a-b| is smaller than or equal to 3.
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Step-by-step explanation:
Newton's second law of motion pertains to the behavior of objects for which all existing forces are not balanced. The second law states that the acceleration of an object is dependent upon two variables - the net force acting upon the object and the mass of the object. The acceleration of an object depends directly upon the net force acting upon the object, and inversely upon the mass of the object. As the force acting upon an object is increased, the acceleration of the object is increased. As the mass of an object is increased, the acceleration of the object is decreased.
Answer:
Your search - () -5 +(-3)+(-11)+(-22 3. In an AP given a = 5,4 = 3.4. - 50, find and s. (6) given a = 7,4, -35 ... - did not match any documents.
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