Can anyone kindly tell me if there is a method (other than trial and error) to solve equations of the form below:
$$x^2 + x - 35 - 35[(x^2)/35] = 0$$
where $x$ is an integer and $[y]$ denotes the integer nearest to $y$?
Can anyone kindly tell me if there is a method (other than trial and error) to solve equations of the form below:
$$x^2 + x - 35 - 35[(x^2)/35] = 0$$
where $x$ is an integer and $[y]$ denotes the integer nearest to $y$?