* Here the language is being used which allows a maximum to be infinite. And unless both the neighbouring maxima are infinite, or in crude phrase unless there are no maxima at all, the reversed series can not be convergent for all values of y. That this obvious necessary condition is not sufficient is shown by the case of y = x ² + x ⁴, for which the reversed series are not convergent for y > ¼. But in the case when y > ¼ we can get a convergent series for x in ascending powers of y ^-½ (all multiplied by y ^¼) by writing the equation in the form y ⁴(l+x^-2) and taking p = -¼ and q = ½ For any parabola of even, finite degree a series for x, convergent for large values of y, can always be obtained in this manner; the two series may, however, leave a large intermediate region of y in which neither of them is convergent.