How does a 'higher compare size' "needs more time to compare"?
Posted: 12 Feb 2022, 16:45
I don't grok the following. Is it flawed?
2. Why does a lower Comparison Size — e.g. 8 × 8 — find more similar pictures, and need LESS time?
3. Why does a higher Comparison Size — e.g. 24 × 24 — need MORE time?
Please explain like I'm 5. English ISN'T my first language. I'm computer challenged.
1. How can a higher compare size find "more identical pictures and less similar pictures"? The set of identical pictures ⊆ set of similar pictures. Thus the more identical pictures you find, the more similar pictures you find!Compare Size
Here you can specify the maximum width and height of the pictures to be compared. A lower compare size finds more similar pictures and speeds up the comparison time. A higher compare size finds more identical pictures and less similar pictures and of course needs more time to compare them.
2. Why does a lower Comparison Size — e.g. 8 × 8 — find more similar pictures, and need LESS time?
3. Why does a higher Comparison Size — e.g. 24 × 24 — need MORE time?
Please explain like I'm 5. English ISN'T my first language. I'm computer challenged.