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757. Stealthy Numbers

A positive integer $N$ is stealthy, if there exist positive integers $a$, $b$, $c$, $d$ such that $ab = cd = N$ and $a+b = c+d+1$.
For example, $36 = 4\times 9 = 6\times 6$ is stealthy.

You are also given that there are 2851 stealthy numbers not exceeding $10^6$.

How many stealthy numbers are there that don't exceed $10^{14}$?