Question

help pleasee\
iwill medal and fan

Answer 1

One of your friends sends you an email asking you to explain how all of the following expressions have the same answer.
the cube root of x cubed

:x to the one–third power • :x to the one–third power • x to the one–third power

1 over x to the –1 power

the eleventh root of the quantity of x to the fifth times x to the fourth times x squared

Answer 2

http://postimg.org/image/6t6iuo2k1/

Answer 3

I just saw Spiderman on this post.. @Night-Watcher :)

Answer 4

lol

Answer 5

@waterineyes Lol

Answer 6

Indices Rules:

\[\large \sqrt[n]{a} = (a)^{\frac{1}{n}}\]
\[x^a \cdot x^b \cdot x^c = x^{(a+b+c)}\]
\[x^{-a} = \frac{1}{x^a}\]
\[\frac{1}{x^{-a}} = x^a\]

Answer 7

thankyou

Answer 8

Try to implement it in those expression, that all will come out to be same.. :)

Answer 9

is that it for the proplem

Answer 10

ok

Answer 11

Like first one I do for you:

\[\sqrt[3]{x^3} = (x^3)^{\frac{1}{3}} \implies (x)^{\cancel{3} \times \frac{1}{\cancel{3}}} \implies x\]

Answer 12

One more rules there, I forget to write above, which I have used in solving first expression..

\[\large \color{green}{(x^a)^{b} = (x)^{a \times b}}\]

Answer 13

*rule not rules.. :)

Answer 14

Likewise try to solve other three expressions, you will get x in all the expressions as your final result.. :) Just try, you will get it..

Answer 15

ok thx have a wonderfull day

Answer 16

Day?? I have spent the day, it is Night-Watcher here.. :P

Answer 17

really do you get paid for doing this lol

Answer 18

For doing what??

Answer 19

wow

Answer 20

nvm

Answer 21

time to make a hasty retreat on that comment

Answer 22

@mathmath333 Wow..!!

Answer 23

u refreshed me with that post

Answer 24

lol me

Answer 25

Whom are you talking to??

Answer 26

the confusion is real 0,o

Answer 27

@kfullwood1

Answer 28

Confusion is always real, have you seen confusion as Complex or like : \(a + ib\) ?? :P

Answer 29

i have 1 more question could i get help

Answer 30

yes

Answer 31

my mind has been blown

Answer 32

Compose an email back assisting your friend and highlight the names of the properties of exponents when you use them.

Answer 33

yes, @mathmath333 is here to continue with.

Answer 34

it kind of goes along with the other question

Answer 35

is this the question ?



Compose an email back assisting your friend and highlight the names of the properties of exponents when you use them

Answer 36

yep

Answer 37

im back sorry my wifi dropped