407006: GYM102680 A Passing Bills
Description
The Bi-Cameral Progress Committee loves making progress by passing bills. Since the committee is determined to make as much progress as possible, all votes are required to be of unanimous approval of the bill at hand. That is, if the committee votes on whether to pass a bill, it will definitely be passed.
Because these committee members are all political science majors (instead of computer science majors), they much prefer reading the flavortext of unnecessarily convoluted problem statements to using logic or algebra, and assume you prefer the same. They could have asked you for the shortest path of a bill to touch each member given the position of all committee members. Or they could have asked you the maximum value of any passable combination of bills, given the total political capital of the committee and political cost and value of each potential bill. Or they could have asked whether there exists any bill whose text is of the complexity that can be read in polynomial time but cannot be written in polynomial time.
Instead, they need your help figuring out how many bills the committee will pass given the number of bills the committee will vote on. Help them figure out how many bills will be passed given the number of bills that will be voted on and the total number of french fries eaten since 1970.
InputThe input will contain two, space-separated integers: $$$n$$$, the number of bills to be voted on this session, and $$$f$$$, the total number of french fries eaten since 1970 (in billions of fries, rounded to the nearest integer).
$$$0 \leq n \leq 99$$$
$$$0 \leq f \leq 20$$$
OutputOutput a single integer: the number of bills that will be passed this session.
ExamplesInput61 19Output
61Input
36 10Output
36