Question

@student_basil @Luigi0210 @johnweldon1993 Help with some Statistics questions

Answer 1

here is the first question

Answer 2

@student_basil

Answer 3

anyone who can help it would be great tahnks :)

Answer 4

im here :3

Answer 5

Ok, so you know that \(\LARGE\color{blue}{ \bf Log_ab=c }\) translates into

\(\LARGE\color{blue}{ \bf a^c=b }\)

Look at your function, you see that it says \(\LARGE\color{blue}{ \bf 5^{f(x)}=x }\)
in other words
\(\LARGE\color{blue}{ \bf 5^{2}=25 }\)
\(\LARGE\color{blue}{ \bf 5^{3}=125 }\)
\(\LARGE\color{blue}{ \bf 5^{4}=625 }\)

So this relation would therefore be,
\(\LARGE\color{blue}{ \bf Log_{5}x=f(x) }\)

makes sense ?

Answer 6

yes kind of

Answer 7

ohh wow sorry that was the wrong question lol

Answer 8

it's OK

Answer 9

can i post teh correct question im sorry

Answer 10

sure, if I will know how to do it...

Answer 11

k here @student_basil

Answer 12

Well, you can definitely see that bobby is not right, b/c rolling a dice is not showing anything, it's luck. So C and D are eliminated.

Answer 13

okay

Answer 14

b maybe?

Answer 15

Does every student have an equal chance to arrive to class?
well, some people might live farther from school then others... also, if we forsake say that all do have an equal chance of arriving first, saying that they all can get to class before and wait before the earliest entry time, but they all have an equal chance to roll a dice with the highest sum, so equality of the chances is not the deciding factor here....

Answer 16

I want to say B.

Answer 17

okay can u help me with some other i only have 4 left ?

Answer 18

But don't post all in 1 question... it makes it load very slowly for me each time.

Answer 19

okay ill amke a new question

Answer 20

How about you do number 3 ?

Answer 21

(senior is a 12-grader )