# Pythagorean theorem predates Pythagoras by 1,000 years, ancient tablet reveals

Brace yourselves for a trip down memory lane! Just the mention of “Pythagoras’s theorem” can bring back images of smudged pencils, frantic attempts to copy from classmates, and a whole lot of dread.

But hold on to your protractors, because it turns out this notorious name is as accurate as this writer’s geometry skills. While we’ve all been led to believe that the legendary Greek philosopher Pythagoras was the mastermind behind the equation a2 + b2 = c2, it’s time for a plot twist.

#### Pythagorean Twist in History

As luck would have it, this mathematical gem was already making waves a cool 1,000 years before Pythagoras even stepped onto the scene. Archaeologists have unearthed tablets from Babylon dating back to a mind-boggling 1770 BCE – centuries before Pythagoras left a single footprint on this Earth (around 570 BC). But that’s not all! Another remarkable tablet, spanning from 1800 to 1600 BC, boasts symmetric squares embellished with meticulously labeled triangles.

Translations of these ancient Babylonian markings, cleverly constructed using their base 60 counting system, have stunned researchers. Yes, you guessed it – these mathematical pioneers were way ahead of their time!

#### Unveiling Ancient Secrets

Prepare to have your mind blown by the astounding discoveries of data scientist Bruce Ratner. In a paper dedicated to this astonishing revelation, Ratner boldly declares an inescapable conclusion that challenges the very foundations of mathematics as we know them.

According to Ratner, the Babylonians possessed a profound understanding of the relation between the length of a square’s diagonal and its side – an extraordinary feat given the nature of this relationship as the square root of 2, which in itself is an irrational number.

Remarkably, this indicates their familiarity with the Pythagorean theorem, or at the very least, its special case for the diagonal of a square. What’s more, they possessed this knowledge a whopping thousand years prior to the renowned sage for whom it was later named.

But here lies a perplexing mystery: Why, you may wonder, did this equation eventually become synonymous with the famous Greek mathematician? The answer, it appears, lies within the intentions of Pythagoras himself.

Rumor has it that Pythagoras yearned for mathematical immortality and sought to leave an indelible mark on the annals of history. It is likely that he purposely aligned his name with this equation, forever intertwining his legacy with the geometric gem in question. A clever maneuver to secure his place in the mathematical pantheon, wouldn’t you say?

#### Tracing the Footsteps of Mathematical Giants

Ratner reveals that due to the scarcity of written records, Pythagoras’ actual work remains shrouded in uncertainty. The Pythagoreans practiced an ideology of collectivism, blurring the lines between Pythagoras’ personal contributions and those of his devoted disciples. As a result, discerning the true genesis of a particular Pythagorean discovery becomes an elusive endeavor.

In the realm of Pythagoreanism, credit and recognition find a complex dance. Ratner emphasizes that while Pythagoras may not have been the mastermind behind the most famous formula in mathematics, his influence cannot be disregarded. By putting this geometric gem on the map and garnering reverence and respect, Pythagoras played a vital role in shaping its widespread recognition.