Ever get a hint of confusion about what an exponent was doing? I sure have.| betterexplained.com
Logarithms are everywhere. Ever use the following phrases?| betterexplained.com
We’re taught that exponents are repeated multiplication. This is a good introduction, but it breaks down on 3^1.5 and the brain-twisting 0^0. How do you repeat zero zero times and get 1?| betterexplained.com
There are two types of exponential growth, and it's easy to mix them up:| betterexplained.com
Here’s a trick for thinking through problems involving exponents and logs. Just ask two questions:| betterexplained.com
A common question is why e (2.71828...) is so special. Why not 2, 3.7 or some other number as the base of growth?| betterexplained.com
Seeing the same math concept from a few perspectives helps build intuition. Seeing that e is my favorite constant (sorry, pi), a while back I put the definitions of e together to visualize their connection:| betterexplained.com
e has always bothered me — not the letter, but the mathematical constant. What does it really mean?| betterexplained.com
Interest rates are confusing, despite their ubiquity. This post takes an in-depth look at why interest rates behave as they do.| betterexplained.com
Euler's identity seems baffling:| betterexplained.com
After understanding the exponential function, our next target is the natural logarithm.| betterexplained.com