Answer: [tex]\frac{40}{49}[/tex]
Step-by-step explanation:
Given: The radius of the larger circle = 14 cm
The area of a circle is given by :-
[tex]A=\pi r^2[/tex]
The area of the larger circle will be :-
[tex]A=\pi (14)^2=196\pi cm^2[/tex]
The radius of the smaller circle = 6 cm
The area of the smaller circle will be :-
[tex]A=\pi (6)^2=36\pi cm^2[/tex]
The area of the part which belongs to the the larger circle and outside the smaller circle =Area of larger circle- Area of smaller circle
[tex]=196\pi-36\pi=160\pi cm^2[/tex]
Now, the probability that a point chosen at random in the given figure will be inside the larger circle and outside the smaller circle is given by:-
[tex]\frac{160\pi}{196\pi}=\frac{40}{49}[/tex]
