Respuesta :
Answer:
1.67% approx
Step-by-step explanation:
To determine the experimental probability of landing on a number less than two when a number cube is tossed 60 times, we need to count the number of times the number on the cube is less than two and divide it by the total number of tosses.
Let's denote the event of landing on a number less than two as "A." We'll count the number of successful outcomes, where the number on the cube is less than two.
Assuming the number cube is fair and unbiased, it has six sides numbered from 1 to 6. Out of these, only one side has a number less than two, which is one.
Now, we can calculate the experimental probability using the formula:
Experimental Probability (P(A)) = Number of successful outcomes / Total number of tosses
In this case, the number of successful outcomes is the number of times the cube lands on a number less than two, which is one. The total number of tosses is given as 60.
Therefore, the experimental probability of landing on a number less than two is:
P(A) = 1 (successful outcomes) / 60 (total number of tosses)
= 1/60
≈ 0.0167 or 1.67%
So, the experimental probability of landing on a number less than two is approximately 0.0167 or 1.67%.
