Asked by JAMIE
You mix the letters M,A,T,H,E,M,A,T,I,C,A and L, thoroughly, Without looking , you draw one letter. Find the probability P(A). Write the probability as:
A) fraction in simplest form
B) a decimal
C) a percent
there are 3 letter A"s, so my answers are
A)1/4
B).25
C) 25%
can you check my answer?
Thanks
A) fraction in simplest form
B) a decimal
C) a percent
there are 3 letter A"s, so my answers are
A)1/4
B).25
C) 25%
can you check my answer?
Thanks
Answers
Answered by
Ms. Sue
You are right.
Answered by
Loading...
what is the equation idk if i spelt it right or how did you figure it out
Answered by
NANI!?!??!
お、オは、日本語の音節の1つであり.
Answered by
お、オは、日本語の音節の1つであり
Oh, one of the Japanese syllables
Answered by
Sliverstream
Oh, is one of the Japanese syllables. Thats what he said XD
Answered by
ew
this is the last question at connexus for math in 6th grade!!!!!!!!!!!!!
Answered by
😂
Ew yep
@NANI!?!??!
おい、あなたは今真剣ですか?私たちは答えが必要です。しかし、私たちはここでエイトします。
Translation:
Dude, are you serious right now? WE NEED ANSWERS. But we aight here.
おい、あなたは今真剣ですか?私たちは答えが必要です。しかし、私たちはここでエイトします。
Translation:
Dude, are you serious right now? WE NEED ANSWERS. But we aight here.
Answered by
by the way
迷子にしないでください
Answered by
"reeeeeee😝- nothing mom😶"
hey ~"😂" your emoji ain't cool anymore...
Answered by
"reeeeeee😝- nothing mom😶"
and~ 迷子に 真剣ですか?私たち節の1つであり日本語の音節?
あなたは今真剣ですか!!!
あなたは今真剣ですか!!!
Answered by
"reeeeeee😝- nothing mom😶"
<&> ^<&> J K I D E K W T S (my secret wording)
but it pretty easy to figure out &^& >O< if you have done it before. reeeeeeeeeeeeeeeeeeeeeenoooooooooooooooooooooooooooo IK right!
but it pretty easy to figure out &^& >O< if you have done it before. reeeeeeeeeeeeeeeeeeeeeenoooooooooooooooooooooooooooo IK right!
Answered by
confused Conexus gal 6thgrade
wow, whoa, holy moly, holy cow, oh my stars, what is all of this?!
thanks for the right answer tho gal you awesome!!
thanks for the right answer tho gal you awesome!!
Answered by
Lesley
Man, y'all have to much fun on this website. lmfao
Answered by
"reeeeeee😝- nothing mom😶"
so i got some of it? not all of it right?
Answered by
the wording know one knows hehe
yea i got some of it good job dude.
Answered by
the wording know one knows hehe
sorry, I meant yea you got some of it not me.
Answered by
WhyAmIHere
*Visible Confusion*
Answered by
I'm going to be 12 this year
EXPLAIN PLEASE I AM SO LOST
Answered by
Galixx(yes thats my name)
I would like if someone would just tell me the dang answer
Answered by
gogy.com
I- y'all are having too much fun ( ̄y▽, ̄)╭
- gogy.com
- gogy.com
Answered by
DENKI X SHINSO
I JUST WASNTED ANSWERS -.-
Answered by
(-_-)
Hey guys the answer should be
A. 3/12 = 1/4
B. 0.25
C. 25%
Let me know if I made a mistake somewhere!
A. 3/12 = 1/4
B. 0.25
C. 25%
Let me know if I made a mistake somewhere!
Answered by
SantanaDifferent
pinche maricon wey
Answered by
Anonymous
No voy desir nada @SantanaDiffrente
Answered by
Anonymous
夢のsmp伝承を見ている人
Answered by
NEZUKO CHAN!!!!!!!
5 years and no one has answered this question
Answered by
heavy from tf2
at least this is faster than our game updates its been 6 years senes our last update
Answered by
Anonymous
JAMIE 5 years later reading the answers: 👁👄👁.
Answered by
私は夏です
何してるの?
Answered by
bro 2023 my year fr
ENOUGH WITH THE JAPANESE
Answered by
bro 2023 my year fr
this is the last d@mn math question for the year, im not trying to go through heII rn..
Answered by
cool shoes
You mix the letters M, A, T, H, E, M, A, T, I, C, A, and L thoroughly. Without looking, you draw one letter. Find the probability P(A). Write the probability as:
a. a fraction in simplest form
b. a decimal
c. a percent
a. a fraction in simplest form
b. a decimal
c. a percent
Answered by
cool shoes
Note: Enter your answer and show all the steps that you use to solve this problem in the space provided.
You roll a number cube twice. Find P(even, then not 2). Write the probability as a fraction in simplest form.
Answered by
cool shoes
shorter
Answered by
cool shoes
shorter
Answered by
cool shoes
Note: Enter your answer and show all the steps that you use to solve this problem in the space provided.
Marissa is researching information about martial arts students. She found that 7 out of 12 martial artists practice every day. There are 144 martial arts students at a school.
a. Predict how many students practice every day.
b. What is the sample size?
Answer
You mix the letters M, A, T, H, E, M, A, T, I, C, A, and L thoroughly. Without looking, you draw one letter. Find the probability P(A). Write the probability as:
a. a fraction in simplest form
b. a decimal
c. a percent
a. a fraction in simplest form
b. a decimal
c. a percent
Answer
Note: Enter your answer and show all the steps that you use to solve this problem in the space provided.
You mix the letters M, A, T, H, E, M, A, T, I, C, A, and L thoroughly. Without looking, you draw one letter.
Find the probability P(A). Write the probability as:
a. a fraction in simplest form
b. a decimal
c. a percent
You mix the letters M, A, T, H, E, M, A, T, I, C, A, and L thoroughly. Without looking, you draw one letter.
Find the probability P(A). Write the probability as:
a. a fraction in simplest form
b. a decimal
c. a percent
Answered by
Bot
The given set of letters in the word is "MATHMATICAL."
There are two "A"s in the given word.
a. The probability of selecting "A" is 2/12, which simplifies to 1/6.
b. The probability is 0.1667.
c. The probability is 16.67%.
There are two "A"s in the given word.
a. The probability of selecting "A" is 2/12, which simplifies to 1/6.
b. The probability is 0.1667.
c. The probability is 16.67%.
Answered by
Bot
There are six possible outcomes when rolling a number cube, which are {1, 2, 3, 4, 5, 6}. Since we are rolling the number cube twice, the total number of possible outcomes is 6 × 6 = 36.
The events "even" and "not 2" are independent and can occur in either order. Thus, we can calculate the probability of rolling an even number on the first roll and a non-2 number on the second roll as:
P(even, then not 2) = P(even) × P(not 2)
P(even) = favorable outcomes / total outcomes = 3 / 6 = 1/2 (since there are three even numbers: 2, 4, 6)
P(not 2) = favorable outcomes / total outcomes = 5 / 6 (since there are five non-2 numbers: 1, 3, 4, 5, 6)
So, P(even, then not 2) = (1/2) × (5/6) = 5/12. Therefore, the probability of rolling an even number on the first roll and a non-2 number on the second roll is 5/12 when rolling a number cube twice.
The events "even" and "not 2" are independent and can occur in either order. Thus, we can calculate the probability of rolling an even number on the first roll and a non-2 number on the second roll as:
P(even, then not 2) = P(even) × P(not 2)
P(even) = favorable outcomes / total outcomes = 3 / 6 = 1/2 (since there are three even numbers: 2, 4, 6)
P(not 2) = favorable outcomes / total outcomes = 5 / 6 (since there are five non-2 numbers: 1, 3, 4, 5, 6)
So, P(even, then not 2) = (1/2) × (5/6) = 5/12. Therefore, the probability of rolling an even number on the first roll and a non-2 number on the second roll is 5/12 when rolling a number cube twice.
Answered by
Bot
The probability of rolling an even number on the first roll is 1/2 (since there are three even numbers out of six total). The probability of rolling a non-2 number on the second roll is 5/6 (since there are five non-2 numbers out of six total). So, the probability of rolling an even number first, then not 2 is (1/2) × (5/6) = 5/12.
Answered by
Bot
The probability of rolling an even number first and a non-2 number second is 5/12.
Answered by
Bot
a. If 7 out of 12 martial artists practice every day, we can predict that the same proportion of students in the school would practice every day.
The number of martial arts students who practice every day can be calculated as:
7/12 * 144 = 84
Therefore, we can predict that 84 martial arts students practice every day.
b. The sample size is the total number of martial arts students in the school, which is 144.
The number of martial arts students who practice every day can be calculated as:
7/12 * 144 = 84
Therefore, we can predict that 84 martial arts students practice every day.
b. The sample size is the total number of martial arts students in the school, which is 144.
Answered by
Bot
To find the probability of drawing the letter "A" from the given set of letters, we need to first count the number of "A"s in the set.
There are three "A"s in the set: one at the second position, one at the seventh position, and one at the eleventh position.
a. The probability of drawing an "A" from the set is the number of "A"s in the set divided by the total number of letters in the set:
P(A) = 3/12 = 1/4 (simplified to lowest terms)
b. The decimal equivalent of 1/4 is 0.25.
c. The percentage equivalent of 1/4 is 25%.
There are three "A"s in the set: one at the second position, one at the seventh position, and one at the eleventh position.
a. The probability of drawing an "A" from the set is the number of "A"s in the set divided by the total number of letters in the set:
P(A) = 3/12 = 1/4 (simplified to lowest terms)
b. The decimal equivalent of 1/4 is 0.25.
c. The percentage equivalent of 1/4 is 25%.
Answered by
Bot
There are 12 letters in the given set, out of which 3 are "A"s.
a. The probability of drawing an "A" is the ratio of the number of "A"s in the set to the total number of letters in the set.
So, P(A) = number of "A"s/total number of letters = 3/12
We can reduce the fraction 3/12 to its simplest form by dividing the numerator and denominator by their greatest common factor, which is 3.
Therefore, P(A) = 3/12 = 1/4 (fraction in simplest form).
b. The decimal value of 1/4 is 0.25.
c. The percentage value of 1/4 is 25%.
a. The probability of drawing an "A" is the ratio of the number of "A"s in the set to the total number of letters in the set.
So, P(A) = number of "A"s/total number of letters = 3/12
We can reduce the fraction 3/12 to its simplest form by dividing the numerator and denominator by their greatest common factor, which is 3.
Therefore, P(A) = 3/12 = 1/4 (fraction in simplest form).
b. The decimal value of 1/4 is 0.25.
c. The percentage value of 1/4 is 25%.
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.