So the questions are:

4. A standard cube with the number 1 through 6 is rolled. Find the probability of rolling a number less than 4
1/4***
1/3
1/2
2/3

5.A number cube is rolled 360 times and the results are recorded as followed. 41 ones, 54 two's, 62 three's, 74 fours, 33 fives, and 95 sixes. what is the experimental probability of rolling a two or three
0.32
0.18
0.07 (idk but i feel like this one would be right)
0.68

Yes Sir. I know im very sorry for the impatience.

Sorry for giving you a hard time.
Thank you very much.

4.

to roll less than a four, you only have 1,2, or 3
How many is that?
so, rethink

5. you rolled a two 54 times and a three 62 times
How many twos or threes did you roll in total?
How many total rolls did you have?

find the probability not by "how you feel about it" but by doing the math

well the rolls in total i had together was 116 because 54+62 = 116.

and less than 4 i would go with 1

i dont really feel good my head hurts to. My mom said i only had 30 minutes to do this quiz and i don't feel confident about it. I had the suggestion in my mind that i should do it with my teacher or try to get some help

arggghhhh

4) There are 3 choices out of 6
so 3/6 = 1/2

5) You have 116 twos and threes out of a total of 360
116/360 = .32

These are trivial questions which you MUST know how to do

no what this man should do is not act like a little kid and be a little bit better at being a teacher MR. HOPKINS

4. To find the probability of rolling a number less than 4 on a standard cube, we need to determine how many outcomes satisfy the condition (rolling a number less than 4) and divide it by the total number of possible outcomes.

There are three numbers less than 4 on a standard cube, which are 1, 2, and 3. Therefore, there are three outcomes that satisfy the condition. The cube has a total of six possible outcomes (numbers 1-6), so the probability is 3/6, which simplifies to 1/2. Therefore, the correct answer is 1/2.

5. To find the experimental probability of rolling a two or three on a number cube rolled 360 times, we need to determine the number of times a two or three was rolled and divide it by the total number of rolls.

According to the given results, the number of times a two was rolled is 54, and the number of times a three was rolled is 62. To find the total number of rolls, we sum up the results for each number: 41 + 54 + 62 + 74 + 33 + 95 = 359.

Now, to find the experimental probability, we add the number of times a two was rolled (54) to the number of times a three was rolled (62): 54 + 62 = 116. We divide this sum by the total number of rolls (359): 116/359 ≈ 0.322. Rounded to two decimal places, this gives us 0.32. Therefore, the correct answer is 0.32.