Only denominator can be factorized Explanation: Given that \displaystyle{\frac{{{\sqrt[{{3}}]{{{x}+{7}}}}-\sqrt{{{x}+{3}}}}}{{{x}^{{2}}-{3}{x}+{2}}}} \displaystyle={\frac{{{\sqrt[{{3}}]{{{x}+{7}}}}-\sqrt{{{x}+{3}}}}}{{{x}^{{2}}-{x}-{2}{x}+{2}}}} ...

we have \sqrt{x+4+2\sqrt{x+3}}-(x^2+4x+3)^{1/3}=1 let us make a change of variable u = x + 3 \ge 0, x = u - 3. with that we have \sqrt{u+1+2\sqrt u}-(u(u-2))^{1/3}=1 \to 1+\sqrt u=(u(u-2))^{1/3}+1 ...

Please see below. Explanation: Let \displaystyle{y}=\frac{{x}^{{2}}}{{\sqrt{{{x}+{2}}}}}-\frac{\sqrt{{{x}+{2}}}}{{x}^{{2}}} Note that with \displaystyle{u}=\frac{{x}^{{2}}}{\sqrt{{{x}+{2}}}} ...

Multiply by (2+\sqrt 3)^{x/2} we get (2+\sqrt 3)^x+1=2^x(2+\sqrt 3)^{x/2}=2^x((\sqrt2+\sqrt6)/2)^x=(\sqrt2+\sqrt 6)^x but (\sqrt 2+\sqrt 6)>(2+\sqrt 3) then if the equality is true for x=2 ...

The first part is correct. The inequality holds iff (x+1)\sqrt{x^2+4}>(x+2)\sqrt{x^2+1}\ \ (*) Hence (squaring), provided x+1>0 (and hence x+2>0) we have (x+1)^2(x^2+4)>(x+2)^2(x^2+1) which ...

First, note that the denominator is ALWAYS positive when it exists, because it's inside a square root. So now if you look at the numerator, for -(2x+3) , for (-2,-1) , we see that it's positive ...