In a circular dartboard of radius 20 cm, there are 5 concentric circles. The radius of each successive inner concentric circle is 4 cm less than the preceding the outer concentric circle. What is the probability that the dart hits the smallest circle?
Given,
Difference in radius between 2 circles = 4cm
Let, radius of small circle be x.
⇒ x + 4 + 4 + 4 + 4 = 20 (from the diagram)
⇒x = 4cm
Probability of an event, P(E)=number of favourable outcomestotal number of outcomes
Probability that the dart hits anywhere in the small circle = ar(innermost circle)ar(outermost circle)
=π×42π×202
=125
Therefore, the probability that the dart hits anywhere in the small circle is 125.