The distance traveled by a particle from a fixed point is given as s = (t\(^3\) - t\(^2\) - t + 5)cm. Find the minimum distance that the particle can cover from the fixed point?
Evaluate ∫sec\(^2\)θ dθ?
| No. of Days | 1 | 2 | 3 | 4 | 5 | 6 |
| No. of students | 20 | 2x | 60 | 40 | x | 50 |
The distribution above shows the number of days a group of 260 students were absent from school in a particular term. How many students were absent for at least four days in the term?
The pie chart above represents 400 fruits on display in a grocery store. How many apples are in the store?
The probability of a student passing any examination is 2/3. If the students takes three examination, what is the probability that he will not pass any of them?
