True or false?

@Rainmaker1973 Exponents are right associative. 2^2^2=2^(2^2)=2^4 So, the question boils down to: is 2⁰=2². Which boils down to: is 0=2. Which is false. It's way longer to break down than do ^^

@programaths @Rainmaker1973 2 to the power zero is 1 but otherwise spot on

@programaths @Rainmaker1973 You know how you get partial credit for having the right answer but the wrong work? That’s what happened here.

@programaths @Rainmaker1973 No

@programaths @Rainmaker1973 What maths have u learned bro. 2^0 is not 0 its 1.

@programaths @Rainmaker1973 I resolve the nested exponents as follows: 2^(2^0) = 2^(0^2) 2^1 = 2^0 2 = 1 False What am I missing?

@programaths @Rainmaker1973 2^0 is 1, not 0. 2^2 is 4, not 2. So the correct solution is: 2^(2^0)=2^(0^2) 2^1=2^0 2=1 False.

@programaths @Rainmaker1973 But that's the wrong answer... The answer is B

@programaths @Rainmaker1973 I thought x raised to 0 is 1?

@Rainmaker1973 Lol, two people not understanding that when you've the same base (different from 0 and 1), you can directly compare the exponents 😂 x.com/liberal_outcas… x.com/Zbales23/statu…

@programaths @Rainmaker1973 If society ever has a “Math Shark Tank” show with @mcuban and others, I’m nominating @programaths to appear and win! 🥇 😊

@programaths @Rainmaker1973 Christian spent way too much of his time justifying his answer. 🤦 And his logic was false. 🤣

@programaths @Rainmaker1973 You're your own worst enemy. Unclear shortcut solution. 2⁰=2². Doesn't boil down to: 0=2.