A Quote by Thomas Perry

If you'll think about various series you've read, can you think of any instance in which, say, the tenth volume of the series is notably better than the first nine? I can't.
Today I said to the calculus students, "I know, you're looking at this series and you don't see what I'm warning you about. You look and it and you think, 'I trust this series. I would take candy from this series. I would get in a car with this series.' But I'm going to warn you, this series is out to get you. Always remember: The harmonic series diverges. Never forget it."
You tell me, why would I make 'Housefull 4' if I had any doubts about the popularity of the series? In fact, the collections are better than the earlier films in the series.
When doing a series, I look for something that has an idea you can think about, something that I'm noticing and aware of and thinking about, because when you're doing a series, you think about more than just jokes... you know, when you're doing a comedy, you think about what's going to reflect people's experiences, in a way.
A lot of series tend to go on for one series too many, especially with comedies, and I think people say 'ooh, it's gone off, that.'
In the mini-series area, we are going to have a regular year-round, weekly presence on Encore of classic mini-series and a new mini-series that we are bringing. For the time being, I think the home of mini-series will be on Encore.
As someone who grew up in Europe, I don't look at TV and automatically think of a primetime network series, created by a staff of writers. I think of 90-minute movies that can break talents out or a three 90-minutes-an-episode mini series that can introduce a fantastic new series like 'The Blechtley Circle.'
I've recently rediscovered Anthony Trollope. I used to read him back in college, and a friend turned me on to a whole new series of his work, 'The Palliser Series.' It's a series of seven or eight books.
I've read the whole 'Divergent' series, the 'Pretty' series. I just read it because I find this stuff interesting to read.
Until now the theory of infinite series in general has been very badly grounded. One applies all the operations to infinite series as if they were finite; but is that permissible? I think not. Where is it demonstrated that one obtains the differential of an infinite series by taking the differential of each term? Nothing is easier than to give instances where this is not so.
I have been in the series for over 3 years - 3 series. There will be a fourth series next year which of course I won't be in because I'm now dead. So in total I appeared in 25 episodes.
'Rescue Me' is the first book in a three-book series. Although, like all my series, the books are purposely written so that readers do not have to read them in order.
Rescue Me' is the first book in a three-book series. Although, like all my series, the books are purposely written so that readers do not have to read them in order.
The work with which we embark on this first volume of a series of theological studies is a work with which the philosophical person does not begin, but rather concludes.
Notable enough, however, are the controversies over the series 1 - 1 + 1 - 1 + 1 - ... whose sum was given by Leibniz as 1/2, although others disagree. ... Understanding of this question is to be sought in the word "sum"; this idea, if thus conceived - namely, the sum of a series is said to be that quantity to which it is brought closer as more terms of the series are taken - has relevance only for convergent series, and we should in general give up the idea of sum for divergent series.
From the onset of the 'Live-Read' series, we wanted to hit all the major writers and Woody Allen is simply one of the greatest screenwriters of all time. He has ability to match pathos and comedy and drama and then turn it all on a dime. If you're going to make a series based on dialogue, you can't find much better than Woody Allen.
I think we're tremendously different than the series, if they were to tune in to the series after seeing the movie they might be disappointed. That there was, you know, that they might have some kind of adverse reaction.
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