You don’t get Nobel prizes for going to math class. What you do get is a basic understanding of math, which is more than sufficient to correct you on this. This was covered in Algebra, man. Review your notes.
They grow proportionately to ax^n . Correspondingly, for values of x < 1, they look very similar to a simple linear slope. For values of x > 1, they grow very rapidly. Both portions are part of the function, it doesn’t suddenly “become” exponential at the rapid increase, it’s exponential the whole time.
Lol. You’re so off base. DATA defines the curve. If the DATA does not exhibit exponential behavior it is not exponential. Simple as that.
Buddy, I can say with confidence I’ve taken math courses you’ve never even heard of. You do not know what you’re talking about.
Ooh you took a math class. When are they delivering your Nobel prize?
You don’t get Nobel prizes for going to math class. What you do get is a basic understanding of math, which is more than sufficient to correct you on this. This was covered in Algebra, man. Review your notes.
What was covered? That functions are used to describe data sets?
In algebra? The basic properties of exponential functions, for one.
Let’s start there then. What are the basic properties of exponential functions?
They grow proportionately to ax^n . Correspondingly, for values of x < 1, they look very similar to a simple linear slope. For values of x > 1, they grow very rapidly. Both portions are part of the function, it doesn’t suddenly “become” exponential at the rapid increase, it’s exponential the whole time.
Well there it is
What type of growth would you use to describe the advancement of AI?