Also we can have : logx(4) = 1/2 x^1/2 = 4 [ raise by 2 on each sides below x^1/2×2 = 4^2 x = 16 log2(x) Implies log2(16) = y 2^y = 16 2^y = 2^4 y = 4 Therefore log2(16) = 4
Yeah it can be solve this way too but the topic is change of base in logarithm and I have to strictly be on that line of change in base of logarithm. So it's best you follow instructions.
![Noob To Max With DRAGON REWORK In Blox Fruits [FULL MOVIE]](http://i.ytimg.com/vi/LnBMOinoOvA/mqdefault.jpg)
Where are you watching from??
Also we can have :
logx(4) = 1/2
x^1/2 = 4 [ raise by 2 on each sides below
x^1/2×2 = 4^2
x = 16
log2(x)
Implies log2(16) = y
2^y = 16
2^y = 2^4
y = 4
Therefore log2(16) = 4
Yeah it can be solve this way too but the topic is change of base in logarithm and I have to strictly be on that line of change in base of logarithm. So it's best you follow instructions.
You even got a board. I don't have that 😅
You are very funny😄
Am only managing it too
@@sunkymathsclass No. I am being truthful here. Really, I don't have. Keep making more videos brother!
@@singyestudio608okay bro