Suppose we define $A= (8+\sqrt{x})^{1/3} + (8-\sqrt{x})^{1/3}$. How can we find, algebraically, all values of x for which $A$ is an integer?
I was not able this problem save for with Mathematica. How can we solve this using the tool of our brains?
Suppose we define $A= (8+\sqrt{x})^{1/3} + (8-\sqrt{x})^{1/3}$. How can we find, algebraically, all values of x for which $A$ is an integer?
I was not able this problem save for with Mathematica. How can we solve this using the tool of our brains?