OpenStudy (anonymous):
Medal for best answer 4n=1/64
hartnn (hartnn):
is it \(\Large 4^n = \dfrac{1}{64}\) ?
geerky42 (geerky42):
IS IT?!?!?!
OpenStudy (milkncookies):
I think he meant for you just to solve for N....
geerky42 (geerky42):
Yeah, but we can't tell if it's \(4^n = \dfrac{1}{64}\) or \(4n = \dfrac{1}{64}\)
OpenStudy (milkncookies):
What number times 4 = 1/64?
OpenStudy (milkncookies):
Oh...
OpenStudy (milkncookies):
Pretty sure it's 4n...
geerky42 (geerky42):
yeah, but you know some of users here forgot or don't know "^" and in your case, answer will be a little ugly so that's why we assumed he meant to say 4^n
geerky42 (geerky42):
@noneyabusiness please say something...
OpenStudy (milkncookies):
Maybe he left?
OpenStudy (anonymous):
sorry had to do something...
geerky42 (geerky42):
ok, we just want to make sure, do you mean 4n or 4^n?
OpenStudy (anonymous):
\[4n\]=1/64
OpenStudy (anonymous):
I am sorry for leaving and I am a girl
geerky42 (geerky42):
ok, in case, just divide both side by 4. do you need help with that?
OpenStudy (anonymous):
ok so I divide 1/64 by 4? and get... 1/256
OpenStudy (anonymous):
lol cool names
geerky42 (geerky42):
Yeah, that it.
geerky42 (geerky42):
n = 1/256
OpenStudy (anonymous):
YAY THANK YOU!!!
geerky42 (geerky42):
when you need to find x or anything, all you have to do is to "isolate" it. You get 4 to other side.
geerky42 (geerky42):
you are welcome.
OpenStudy (anonymous):
Okeedokee
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