Description:
Cardbluff is popular sport game in Telegram. Each Cardbluff player has ever dreamed about entrance in the professional layer. There are $$$n$$$ judges now in the layer and you are trying to pass the entrance exam. You have a number $$$k$$$ — your skill in Cardbluff.
Each judge has a number $$$a_i$$$ — an indicator of uncertainty about your entrance to the professional layer and a number $$$e_i$$$ — an experience playing Cardbluff. To pass the exam you need to convince all judges by playing with them. You can play only one game with each judge. As a result of a particular game, you can divide the uncertainty of $$$i$$$-th judge by any natural divisor of $$$a_i$$$ which is at most $$$k$$$. If GCD of all indicators is equal to $$$1$$$, you will enter to the professional layer and become a judge.
Also, you want to minimize the total amount of spent time. So, if you play with $$$x$$$ judges with total experience $$$y$$$ you will spend $$$x \cdot y$$$ seconds.
Print minimal time to enter to the professional layer or $$$-1$$$ if it's impossible.
Input Format:
There are two numbers in the first line $$$n$$$ and $$$k$$$ ($$$1 \leq n \leq 10^6$$$, $$$1 \leq k \leq 10^{12}$$$) — the number of judges and your skill in Cardbluff.
The second line contains $$$n$$$ integers, where $$$i$$$-th number $$$a_i$$$ ($$$1 \leq a_i \leq 10^{12}$$$) — the uncertainty of $$$i$$$-th judge
The third line contains $$$n$$$ integers in the same format ($$$1 \leq e_i \leq 10^9$$$), $$$e_i$$$ — the experience of $$$i$$$-th judge.
Output Format:
Print the single integer — minimal number of seconds to pass exam, or $$$-1$$$ if it's impossible
Note:
None