Asked by helpmepls123
                Let P(x) be a nonconstant polynomial, where all the coefficients are nonnegative integers. Prove that there exist infinitely many positive integers n such that P(n) is composite.    
Remember that if a and b are distinct integers, then P(a) - P(b) is divisible by a - b.
            
            
        Remember that if a and b are distinct integers, then P(a) - P(b) is divisible by a - b.
Answers
                    Answered by
            helpmepls123
            
    HELP HELP HELP HLEP HLEP HELP
    
                    Answered by
            oobleck
            
    a few seconds with google led me to
https://math.stackexchange.com/questions/304330/proof-of-lack-of-pure-prime-producing-polynomials
that should get you started.
    
https://math.stackexchange.com/questions/304330/proof-of-lack-of-pure-prime-producing-polynomials
that should get you started.
                    Answered by
            helpmepls123
            
    uh ok ill check tat
    
                    Answered by
            helpmepls123
            
    tahkn s i tihkn i got it ok bye
    
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