data:image/png;base64,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

true

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true

Reports the greatest common divisor of its inputs. If the inputs are values in {0,1} then this is equivalent to the logical OR of the values, with 0=False, 1=True. Hence the APL symbol ∨. Also accepts Snap! Booleans as inputs.

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