The maximum number of regions in which 10 circle can divide a plane is

Let f(n) be the number of regions in which n coplanar circles can divide the plane. If it is known that each pair of circles intersect in two different points and no three of them have common points of intersection, then (i) f(20) = 382 (ii) f(n) is always an even number (iii) f^(-1)(92) = 10 (iv) f(n) can be odd

Let f(n) be the number of regions in which n coplanar circles can divide the plane. If it is known that each pair of circles intersect in two different points and no three of them have common points of intersection, then (i) f(20) = 382 (ii) f(n) is always an even number (iii) f^(-1)(92) = 10 (iv) f(n) can be odd

Let f(n) be the number of regions in which n coplanar circles can divide the plane.If it is known that each pair of circles intersect in two different points and no three of them have common points of intersection,then (i) f(20)=382( ii )f(n) is always an even number (iii) f^(-1)(92)=10(iv)f(n) can be odd

Find the maximum number of points into which 10 circls and 10 straight lines intersect.

Find the maximum number of points into which 10 circls and 10 straight lines intersect.

Total numbers of regions in which |'n:)' coplanar lines can divide the plane,if it is known that no two lines are parallel and no three of them are concurrent,is equal to

The maximum number of components into which a vector can be resolved in its own plane is

The maximum number of rectangualr components in which a vector can be resolved in a plane, is

What are the maximum number of rectangular component in which a vector can be resolved in a plane ?