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Some engineers got tired of dealing with all the different ways of encoding
status messages, so they decided to invent their own. In their new scheme, an
encoded status message consists of a sequence of integers representing the
characters in the message, separated by spaces. Each integer is between 1 and
**M**, inclusive. The integers do not have leading zeroes. Unfortunately they
decided to compress the encoded status messages by removing all the spaces!
Your task is to figure out how many different encoded status messages a given
compressed status message could have originally been. Because this number can
be very large, you should return the answer modulo 4207849484 (0xfaceb00c in
hex).
For example, if the compressed status message is "12" it might have originally
been "1 2", or it might have originally been "12". The compressed status
messages are between 1 and 1000 characters long, inclusive. Due to database
corruption, a compressed status may contain sequences of digits that could not
result from removing the spaces in an encoded status message.
### Input
The input begins with a single integer, **N**, the number of compressed status
messages you must analyze. This will be followed by **N** compressed status
messages, each consisting of an integer **M**, the highest character code for
that database, then the compressed status message, which will be a string of
digits each in the range '0' to '9', inclusive. All tokens in the input will
be separated by some whitespace.
### Output
For each of the test cases numbered in order from 1 to **N**, output "Case
#**i**: " followed by a single integer containing the number of different
encoded status messages that could be represented by the corresponding
compressed sequence modulo 4207849484. If none are possible, output a 0.
### Constraints
5 ≤ **N** ≤ 25
2 ≤ **M** ≤ 255
1 ≤ length of encoded status ≤ 1000
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