101061: [AtCoder]ABC106 B - 105

Problem Statement

The number $105$ is quite special - it is odd but still it has eight divisors. Now, your task is this: how many odd numbers with exactly eight positive divisors are there between $1$ and $N$ (inclusive)?

Constraints

• $N$ is an integer between $1$ and $200$ (inclusive).

Input

Input is given from Standard Input in the following format:

$N$

Output

Print the count.

Sample Input 1

105

Sample Output 1

1

Among the numbers between $1$ and $105$, the only number that is odd and has exactly eight divisors is $105$.

Sample Input 2

7

Sample Output 2

0

$1$ has one divisor. $3$, $5$ and $7$ are all prime and have two divisors. Thus, there is no number that satisfies the condition.