Let's call some positive integer classy if its decimal representation contains no more than $$$3$$$ non-zero digits. For example, numbers $$$4$$$, $$$200000$$$, $$$10203$$$ are classy and numbers $$$4231$$$, $$$102306$$$, $$$7277420000$$$ are not.
You are given a segment $$$[L; R]$$$. Count the number of classy integers $$$x$$$ such that $$$L \le x \le R$$$.
Each testcase contains several segments, for each of them you are required to solve the problem separately.
The first line contains a single integer $$$T$$$ ($$$1 \le T \le 10^4$$$) — the number of segments in a testcase.
Each of the next $$$T$$$ lines contains two integers $$$L_i$$$ and $$$R_i$$$ ($$$1 \le L_i \le R_i \le 10^{18}$$$).
Print $$$T$$$ lines — the $$$i$$$-th line should contain the number of classy integers on a segment $$$[L_i; R_i]$$$.
4
1 1000
1024 1024
65536 65536
999999 1000001
1000
1
0
2
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