Numbers: The Perfectly Reasonable Effectiveness of Mathematics

THE FIRST TIME I EXPERIENCED THE DEEP CONNECTION BETWEEN MATH AND PHYSICAL REALITY was while performing a High School chemistry clatitration enhss experiment to discover whether the antacid Rolaids really did consume 47 times its weight in excess stomach acid. The experiment involved very precise weighing and an acid-base titration. I grew up in a small rural town on Maryland’s Eastern Shore, but there was a small NASA facility on the coast about twenty miles away, and since many parents worked there—including my father—we often got to borrow state of the art equipment. Our little chem lab had a high speed centrifuge, a sensitive electronic scale with an evacuation chamber—the scale was so accurate it could weigh the air inside the chamber—and elaborate titration equipment. We also had—wonder of wonders for that time—an electronic desk calculator that was about the same size and twice the thickness of an iPad.

By the time I had finished the experimental procedures and recorded the data there was already a waiting line at the calculator. So I performed the long string of calculations with pencil and paper. It was not complicated math; arithmetic and basic algebra were all I needed, but the significant figures for the data numbers went to three decimal places. The calculations, with all the side arithmetic and double-checking, filled my sheet of notebook paper. When I arrived at the bottom of the page, my answer, rounded to 46.9, seemed a bit lucky, so I went back over everything. The result was the same. I was surprised at the genuine link between my set of calculations and a little round antacid tablet. Numbers and equations in my head had reached out and touched something tangible.

God in the equations blackboard

I would like to say that right then and there I had an epiphany and saw God in the equations, but that’s not what happened. It did make a lasting impression, even though my math skills never advanced beyond High School. I got algebra and geometry, but trigonometry was a bit elusive, and calculus completely escaped me. Yet my captivation by mathematics has only deepened over the years. I contemplate higher mathematics like a very average young man might gaze at a supermodel—beautiful to behold yet beyond his grasp; but maybe with a little extra effort . . .

Wigner enhTHE HUNGARIAN MATHEMATICIAN, EUGENE WIGNER, wrote an article in 1960, “The Unreasonable Effectiveness of Mathematics in the Natural Sciences”, in which he marvels at the uncanny ability of pure mathematical systems, developed with no practical applications in mind, to later be used to accurately express and predict natural phenomena in wide-ranging scientific theories, including Newton’s law of gravitation and 20th century quantum mechanical theory. He argued that “the enormous usefulness of mathematics in the natural sciences is something bordering on the mysterious and … there is no rational
explanation for it.” Wigner was a “Formalist”—he believed that mathematics was strictly a human invention, and so we should have no expectation that something merely a product of the human mind would have any connection to external physical reality. But mathematics clearly does have such a connection, and Wigner could only conclude:  “the miracle of the appropriateness of the language of mathematics for the formulation of
the laws of physics is a wonderful gift which we neither understand nor deserve. We should be grateful for it …” But Wigner, an atheist, could only have been metaphorical. From where such a “miracle” or “gift” would have come or to whom we should be “grateful” he does not explain.

logarithmic spiral enh 1In the ethereal world of pure mathematics, the opposition party to the Formalists, who say mathematics is strictly a human invention, are the Platonists, who say mathematics is a discovery and that it has real existence apart from the human mind. Just where and how the numbers and equations exist outside human consciousness are seldom made clear and many Platonists are as much materialists and atheists as many Formalists.

Mario Livio, in his book, Is God a Mathematician?, takes a mediating position and says that mathematics is both invention and discovery. Mathematics, he offers, has its origin in the evolution of the human brain. Our ability to form mental mathematical models of external reality is a survival adaptation that nature has selected for.  But that just strikes me as odd. Of what practical use for the physical survival and reproduction of the “fittest” is knowing the law of gravity or quantum mechanical theory? Even Wigner shoves this evolutionary explanation aside when he says, “certainly it is hard to believe that our reasoning power was brought, by Darwin’s process of natural selection, to the perfection it seems to possess.”

logarithmic spiral enh 2The same sort of manufactured dilemma has been applied to the question of what “goodness” is. Is something good simply because God says so, which seems to make “goodness” arbitrary. Or does God call some things good because there is some standard of goodness independent of God, which seems to make God less than sovereign and ultimate. The dilemma is simply dissolved when we realize that goodness is an essential aspect of God’s nature and character as love. God is love, and he only ever acts out of love. Goodness is what conforms to the character of God.

LIKEWISE, NO DILEMMA ABOUT THE ORIGIN OF MATHEMATICS EXISTS if wenautilus shell enh realize that God indeed is, among other things, a mathematician. There really is an underlying regularity to the processes of the natural world, which we can express and predict mathematically, because the natural world is a creation. And the creation reflects the orderly and rational mind of its Creator. The best explanation for why we—and not aardvarks, apes, or dolphins—can use mathematics to discern the underlying regularities and structure of creation is that only we, among all of God’s creatures, are made in our Creator’s image, and our minds participate, in a finite way, in the order and rationality of the infinite mind of God. God matches our minds to his mind and to his creation.

nautilus live enhGod is also an artist, and mathematics is the under-sketch on which he paints the masterpiece of the physical universe. The formal beauty of mathematics may seem rigid and cold to some, but it is one real facet of a beautiful Mind. Math connects to the real world, and through that world connects to the Maker of heaven and earth. It is perfectly reasonable that it does so.

Advertisements

About Michael W Nicholson

I am a follower of Jesus Christ, a husband, father, and grandfather, a brother and a friend. My professional career has been in education. I taught Industrial Arts in Middle School for six years, four years as an adjunct professor in theology and philosophy, and fifteen years teaching classes in Old Testament, Apologetics, and Worldviews in a Christian High School. Like everyone else who breathes in American culture, I am infected with chronic postmodernity, but I am aware of this and regularly administer the treatment: Historic Christian Orthodoxy as contained in the Scriptures of the Old & New Testaments. I am fascinated by almost every subject imaginable, except economics. I have a Ph.D. in systematic theology from The Southern Baptist Theological Seminary. I believe in a God who wants to be found; who leaves signs and suggestions, trademarks, signatures, and signposts scattered throughout every aspect of our existence. And if we are truly looking, He will find us. God is the great Story-teller, and the story he is telling is the great drama of Reality, unfolding before us and of which we are all inescapably a part. And so I am collecting fragments, in Philosophy, in Science, and in Art and holding these fragments up to the light and turning them this way and that, and trying to see and say how the Story—the metanarrative, the Christian Worldview—is involved in, and makes sense of, every aspect of our being-in-the-world (to borrow a term from Heidegger and take it where perhaps he did not intend for it to go). And by doing this I hope I am helping to light the way Home; back to the sea, the ocean, the Ocean of Infinite Love. My blog covers a wide range of topics around this central theme that the transcendent realm surrounds and permeates our existence. I put up new posts periodically. I hope you enjoy them. I hope they help.
This entry was posted in Aesthetics, Mathematics, Natural Theology, Personal Narrative, Philosophy and tagged , , , , , , . Bookmark the permalink.

2 Responses to Numbers: The Perfectly Reasonable Effectiveness of Mathematics

  1. harryhebert says:

    I’m eternally grateful that my own evolutionary survival was not on the basis of my mathematical ability! I would truly have to abandon hope then, but like my promotion from calculus in high school, I rest my eternity on God’s grace. I have always wished that I spoke the language of numbers more fluently, so that I might see God’s perfect rationality with more clarity, but like gazing at the heavens, I simply take in with awe and wonder what I do not understand and say, ‘Thank You Lord.’

    Completely engaging post — thanks!

    • Thank you Harry! I too apparently passed High School calculus, like I have inherited the Kingdom of God, by grace. I am always impressed by people who can do the math, literally. But I am more impressed by the deep, even transcendent, rationality of God made evident in the mathematical structure of creation.

Let me know what you think

Fill in your details below or click an icon to log in:

WordPress.com Logo

You are commenting using your WordPress.com account. Log Out / Change )

Twitter picture

You are commenting using your Twitter account. Log Out / Change )

Facebook photo

You are commenting using your Facebook account. Log Out / Change )

Google+ photo

You are commenting using your Google+ account. Log Out / Change )

Connecting to %s