Generalised Hamming Numbers

Problem Statement

A Hamming number is a positive number which has no prime factor larger than $5$.
So the first few Hamming numbers are $1, 2, 3, 4, 5, 6, 8, 9, 10, 12, 15$.
There are $1105$ Hamming numbers not exceeding $10^8$.

We will call a positive number a generalised Hamming number of type $n$, if it has no prime factor larger than $n$.
Hence the Hamming numbers are the generalised Hamming numbers of type $5$.

How many generalised Hamming numbers of type $100$ are there which don't exceed $100 \times 2^N$?

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$g(100)$, $14$ digits 1 day, 8 hours ago
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