OPM Medical Retirement: Differential Calculus Derivatives of concavity & convexity in comic circumlocutions

Last Updated on March 3, 2016 by FERS Disability Attorney

There are things in life which we cannot understand; others, that though we may engage the subject, invest the necessary time and beyond, and yet there seems always to remain a component which continues to escape; and yet, the ease with which others seem to comprehend that which cannot be grasped.  People often mistake wisdom for knowledge, when in fact the latter is merely the capacity to accumulate, whereas the former is the ability to recognize that which is relevant for successful living and to separate it from the abyss of insignificance.

Physicists and mathematicians view the world through a myopic perspective of numbers and calculations; the rest of us remain in the throes of Kantian preconditions, forever condemned to limited knowledge and constrained boundaries.  Or, perhaps we merely envy the greener grass on the south side of the fence.  At some point in life, we all come to a realization that greater minds than our own must be accessed in order to move forward.  Expertise is a rare commodity; value for such a product must be weighed as against the return of an investment.

For Federal employees and U.S. Postal workers who must consider preparing, formulating and filing for Federal Disability Retirement benefits through the U.S. Office of Personnel Management, whether the Federal or Postal employee is under FERS, CSRS or CSRS Offset, it is important to understand that, while the laws governing Federal Disability Retirement may not be as complex or complicated as differential calculus equations or even attempting to understand the concepts of concavity or convexity, the primary point of significance to recognize it in terms of endangering one’s chances for success by overlooking that which others may already know by experience or learned expertise.

The laws governing Federal Disability Retirement will never rise to the level of complexity when attempting to tackle a calculus problem; but it is never the complexity which defeats, but rather, the complications which ensue by failing to comprehend the differentiation not between derivatives of comic circumlocutions, but of wisdom as opposed to mere knowledge.

Sincerely,

Robert R. McGill, Esquire