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Course: MIS 2005, Fall 2004School: Maryland
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2004 Fall - Average Walk-in Reference Transactions by Library by Day of the Week 377 400 350 316 300 Average Number of Transactions 246.5 250 200 152.5 343.5 91.5 73.5 73.5 100 82.5 97 60.5 60.5 55.5 43 55.5 121.5 150 125.5 15 1 6.5 4.5 28 31.5 4 Sunday 1 22.5 8.5 1.5 9 0 13 Monday Tuesday Wednesday Thursday Day of the Week Friday Saturday Architecture Art Chemistry EPSL Hornbake...
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2004 Fall - Average Walk-in Reference Transactions by Library by Day of the Week
377 400
350 316
300 Average Number of Transactions 246.5
250
200 152.5
343.5
91.5
73.5
73.5
100
82.5
97
60.5
60.5
55.5
43
55.5
121.5
150
125.5 15 1 6.5 4.5 28 31.5 4 Sunday 1
22.5 8.5
1.5 9
0 13 Monday Tuesday Wednesday Thursday Day of the Week Friday Saturday
Architecture
Art
Chemistry
EPSL
Hornbake
McKeldin
1 2.5 6
1.5 9 7
Non Print
PAL...
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Maryland - MIS - 5
Fall 2004 - Average Walk-in Reference Transactions by Library by Day of the Week377 400350 316300 Average Number of Transactions 246.5250200 152.5343.591.573.573.510082.59760.560.555.54355.5121.5150125.5 15 1 6.
Maryland - MIS - 2005
Reference Transaction Sampling Results: Summer 2004The tables below are an analysis of the reference transaction sampling results collected during Summer 2004.Total Summer Transactions by YearArchitecture Art Chemistry EPSL Hornbake McKeldin Nonp
Maryland - MIS - 1
Summer 2004 - Campus Total Reference Transactions by Sampling Date500 450 400 350 Number of Transactions 300 250 200 150 100 50 0 6/3 6/9 6/17 6/22 6/28 7/3 7/6 7/12 7/21 7/25 7/31 8/6 8/15 8/20 Sampling Date 41 93 142 145 199 299 386 395434 409 3
Maryland - MIS - 2005
Summer 2004 - Campus Total Reference Transactions by Sampling Date500 450 400 350 Number of Transactions 300 250 200 150 100 50 0 6/3 6/9 6/17 6/22 6/28 7/3 7/6 7/12 7/21 7/25 7/31 8/6 8/15 8/20 Sampling Date 41 93 142 145 199 299 386 395434 409 3
Maryland - MIS - 2
Summer 2004 - Total Reference Transactions by Library by Sampling Date300226236250252220226Number of Transactions200 161150201205947965727855546552921009345 4447514129 32 414038384034
Maryland - MIS - 2005
Summer 2004 - Total Reference Transactions by Library by Sampling Date300226236250252220226Number of Transactions200 161150201205947965727855546552921009345 4447514129 32 414038384034
Maryland - MIS - 2005
Number of Transactions 100 120 140 160 180 200 20 40 60 808 -9 am549 -1 0 am6 29 8 210 -1 1 am7 2 59 32 39 91 11 16 51 24 133 5 6 1 4811 am -1 2 pmArchitecture17812 -1 pm13 9 7 16 5 1 6 7 60Summer 2004 - Total Walk-in Reference
Maryland - MIS - 3
Number of Transactions 100 120 140 160 180 200 20 40 60 808 -9 am549 -1 0 am6 29 8 210 -1 1 am7 2 59 32 39 91 11 16 51 24 133 5 6 1 4811 am -1 2 pmArchitecture17812 -1 pm13 9 7 16 5 1 6 7 60Summer 2004 - Total Walk-in Reference
Maryland - MIS - 2005
Summer 2004 - Percentage of Reference Transactions by Type by Library100% 90% 80% 70% 60% 50% 88% 40% 30% 20% 10% 0% Architecture 0% Art 76% 57% 44% 75% 73% 79% 72% 1% 11% 21% 19% 26% 21% 22% 19% 28% 0% 7% 0%4%4%Percentage of Transactions21%
Maryland - MIS - 4
Summer 2004 - Percentage of Reference Transactions by Type by Library100% 90% 80% 70% 60% 50% 88% 40% 30% 20% 10% 0% Architecture 0% Art 76% 57% 44% 75% 73% 79% 72% 1% 11% 21% 19% 26% 21% 22% 19% 28% 0% 7% 0%4%4%Percentage of Transactions21%
Maryland - MIS - 2005
Summer 2004 - Average Walk-in Reference Transactions by Library by Day of the Week200.0 175.0160.0 Average Number of Transactions156.0165.5180.0140.0120.0100.0 69.5 81.0 80.0 57.0133.548.060.0 40.5 38.054.028.021.517.01
Maryland - MIS - 5
Summer 2004 - Average Walk-in Reference Transactions by Library by Day of the Week200.0 175.0160.0 Average Number of Transactions156.0165.5180.0140.0120.0100.0 69.5 81.0 80.0 57.0133.548.060.0 40.5 38.054.028.021.517.01
Maryland - UMIACS - 2007
2007 IEEE Workshop on Applications of Signal Processing to Audio and AcousticsOctober 21-24, 2007, New Paltz, NYREAL TIME CAPTURE OF AUDIO IMAGES AND THEIR USE WITH VIDEO Adam ODonovan, Ramani Duraiswami and Nail A.Gumerov Perceptual Interfaces a
Maryland - MATH - 461
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Maryland - MATH - 466
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Maryland - MATH - 667
AMSC 667 Numerical Analysis II Spring Term 2005 Instructor: Georg Dolzmann Homework set #4Problem 1: [Qualifying Exam January 2002] Suppose that f : Rn Rn is of class C 2 , suppose that f (x ) = 0, and suppose that the Jacobian Df (x ) is positive
Maryland - MATH - 667
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Maryland - MATH - 667
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Maryland - MATH - 667
AMSC 667 Numerical Analysis II Spring Term 2005 Instructor: Georg Dolzmann Homework set #9Problem 1: Suppose that the step size is constant. (a) Verify that AB3, the Adams-Bashforth formula of order three, is 16 5 23 fj fj1 + fj2 . 12 12 12 (b) Ve
Maryland - MATH - 667
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Maryland - MATH - 667
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Maryland - MATH - 246
Math 246 - ODE for Scientists and Engineers - Section 0101 Instructor: Prof. Dolzmann Fall Term 2003 How to use the event locator option It seems that the syntax for the event locator option is slightly dierent from the one outlined in CHLOS in recen
Maryland - MATH - 466
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Maryland - MATH - 466
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Maryland - MATH - 466
AMSC/CMCS 466 Introduction to Numerical Analysis I Spring Term 2006 Instructor: Georg Dolzmann Homework set #2Problem 1: a) Suppose that a, . . . , f are oating point numbers. Cramers rule for solving the linear system ax + by = e cx + dy = f gives
Maryland - MATH - 466
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Maryland - MATH - 466
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Maryland - MATH - 466
AMSC/CMCS 466 Introduction to Numerical Analysis I Spring Term 2006 Instructor: Georg Dolzmann Homework set #5Problem 1: Let A Rnn be a n n matrix, x Rn and ci , i = 0, . . . , n scalars. Consider the following product: y = (c0 I + c1 A + c2 A2
Maryland - MATH - 466
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Maryland - MATH - 466
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Maryland - MATH - 466
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Maryland - MATH - 466
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Maryland - MATH - 466
AMSC/CMCS 466 Introduction to Numerical Analysis I Spring Term 2006 Instructor: Georg Dolzmann Homework set #11Problem 1: Let P2 denote the space of all polynomials of degree less than or equal to two on the interval [1, 1]. Dene the inner product
Maryland - MATH - 612
AMSC 612 Numerical Methods for Partial Dierential Equations Spring Term 2004 Instructor: Georg Dolzmann Homework set #1Problem 1: [Morton&Meyers 2.1] (i) The function u0 (x) is dened on [0, 1] by u0 (x) = 2x 2 2x1 if 0 x 2 , 1 if 2 x 1.Show
Maryland - MATH - 612
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Maryland - MATH - 612
AMSC 612 Numerical Methods for Partial Dierential Equations Spring Term 2004 Instructor: Georg Dolzmann Homework set #2Problem 1: [Morton&Mayers 2.2] (i) Show that for every positive value of = t/(x)2 there exists a constant C() such that, for all
Maryland - MATH - 612
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Maryland - MATH - 612
AMSC 612 Numerical Methods for Partial Dierential Equations Spring Term 2004 Instructor: Georg Dolzmann Homework set #3Problem 1: [Morton&Meyers 2.7] Show that the leading order term in the truncation error of the explicit schemen+1 n n n n n Uj
Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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Maryland - MATH - 612
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