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Please, help me.

Consider the functions $f$ and $g$: $f(x)=2^x$ and $g(x)=x^{(\sqrt{15})}$. Set the minor whole value of $x$ that satisfies the conditions: $f(x)-g(x)>10^6$.

So, I don't know how I can simplify this $x^{\sqrt{15}}$ in a way that I can work with the other two terms of the inequality.

I would be glad if any of you guys just gave me a hint.

Jan
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GiuR
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  • Are you looking for integer $x$ such that $2^x>10^6+x^{\sqrt{15}}$? Can you increase $15$ to $16$ and then work with $x^4$? – Jan Feb 07 '17 at 15:11
  • Sorry, I have no idea of how I can do that. – GiuR Feb 07 '17 at 15:25
  • I have no idea what you are trying to do. What is 'minor whole value of $x$'? Your 'set' means 'find'? In general $2^x$ grows much faster than $x^n$. – Jan Feb 07 '17 at 15:28
  • The minor whole is like 1, 2, 3... And by "set" I mean "find". – GiuR Feb 07 '17 at 15:30
  • English is not my first language... – GiuR Feb 07 '17 at 15:30
  • Your answer is here https://goo.gl/ilGjcb. But you if you are interested in exploring relationship between exponential and power growth, see this https://goo.gl/ZNuXb8 – Jan Feb 07 '17 at 15:43

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