AT_abc433_a [ABC433A] Happy Birthday! 4

You are given positive integers $ X,Y,Z $ . Takahashi and Aoki are currently $ X $ years old and $ Y $ years old, respectively. Takahashi and Aoki age by $ 1 $ year simultaneously on every January $ 1 $ st. Determine whether there is a moment in the future (including this year) when Takahashi's age becomes exactly $ Z $ times Aoki's age.

The input is given from Standard Input in the following format: > $ X $ $ Y $ $ Z $

Output `Yes` if there is a moment in the future when Takahashi's age becomes exactly $ Z $ times Aoki's age, and `No` otherwise.

### Sample Explanation 1 Four years from now, Takahashi will be $ 48 $ years old and Aoki will be $ 24 $ years old, so Takahashi's age will be exactly twice Aoki's age. Thus, output `Yes`. ### Sample Explanation 2 There will never be a moment when Takahashi's age becomes exactly three times Aoki's age. Thus, output `No`. ### Sample Explanation 3 Currently, Takahashi's age is exactly $ 10 $ times Aoki's age. Note that you need to determine whether there will be such a moment in the future including this year. ### Constraints - $ 1\le X,Y \le 100 $ - $ 2\le Z\le 10 $ - All input values are integers.