u = "log a when a 0, n being positive. = (34) and therefore by the last example u = x2 log x = 0, when a = 0. Differentiating three times, we find the real value to be 2 = π-2 which is the sum of the reciprocals of the squares of the natural which is therefore the sum of the squares of the reciprocals of the odd numbers. The reader will find other examples of a similar kind relating to the summation of series in Euler's Cale. Diff p. 760, seq. Sometimes the value of an indeterminate function may be most readily found by throwing it into a form in which its real nature is more easily scen. Functions which for a for a particular value of the variable take the form 0° ∞° 1∞, may be reduced to a shape in which the preceding methods are applicable. Let x and y be functions of a and u = , then if for x = a Now since = €1ogz, u = & log; and these three cases are reduced to the determination of y log ≈, which takes the form (42) Find the value of = when a 0, a being positive. This is equivalent to log, and we have to find the value of We may arrive at the value of this function by the consideration that, when a is indefinitely diminished, or sin x = x : therefore when x = 0, sina = x2 (42). In the same way it would appear that : 0. = 1 when x = log a sin = 1 when x = 0, Also, since sin2 = € it appears that sin a. log x = 0 when a = 0; sin a = 1, 1, by Ex. and similarly that sin a. log (sin x) = 0 when a = 0. u = (1 + nx)2 = 6" when a = 0. This result may be verified by expanding u by the binomial theorem that gives : Functions which for a particular value of the variable take the form 0', have been used by Libri to introduce discontinuity into ordinary functions. Thus, if it be desired to express a function f (x) which shall be equal to (x) from x = - ∞ to x = n, and to √(x) from an to ac, he writes f (2) = (1 – 0") ¢ (2) +0 y (2). See his Mémoires de Mathématique et de Physique, Vol. 1. p. 44, and Crelle's Journal, Vol. x. p. 303. In the same Journal, Vol. xI. p. 134 and p. 292, the reader will find some discussion on the real value of this indeterminate expression. |