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Assume that a sequence in satisfies,, and.
Moreover if a sequence in satisfies, then.
Given the sequences and in satisfies the following conditions.
If a sequence in satisfies, then is a Cauchy sequence.
In fact, in satisfies the functional equation of quadratic type.
Moreover, for, as the function is continuous in, satisfies condition (2.10).
Similar(40)
"Come in; satisfy your curiosity," he said.
Only the appetites being satisfied in there are different.
the functions in satisfy.
If and are analytic in, satisfy (2.6).
where,,,,,,, and in satisfy certain conditions.
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