Application in approved file format? N Y Y Y Y Y Y Y Application with more than one inconsistency? N Y N N N N N N Does Application already exists N N N N N Y N Y Does Application contain 15 desired keywords? N N N Y Y N Y Y Does Application contain valid phone numbers N N N N Y N Y Y Does Applicant selected in top 10? N N N N Y N Y Y Does Anyone selected? N N N N Y N Y N Actions Application discarded Y Y Y Y N N N N Application is checked against database N N N N Y Y Y Y Older Application purged and New
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≤x≤1 | y=4 | y=4 | CD | 1 ≤x ≤10 | y=1 | y=1 | DE | 10 ≤x ≤17 | 1 ≤y ≤4.5 | y= 0.5x-4 | The functions AB and CD were found to be constants. AB was found to be y=4 from 0 ≤x ≥1 CD was found to be y=1 from 1 ≤x≥10 DE was found to be y=0.5x-4 from 1≤x≥4.5 Working for DE Points are (10‚ 1) and (17‚ 4.5) m= y2-y1x2-x1 m= 4.5-117-10 m= 3.57 m=.5 y= .5x+c Substitute in (10‚ 1) 1= .5 ×10+c 1= 5+c -4=c c=-4 y= .5x-4 KAP Q2 Functions used for the base of the wine glass were y=4
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number[3][3]; int x‚ y; printf("Enter 9 integer values: "); for(x=0; x<3; x++) { for(y=0; y<3; y++) scanf("%d"‚ &number[x][y]); } printf("\n"); printf("3 x 3 array: \n\n"); for(x=0; x<3; x++) { for(y=0; y<3; y++) printf("%d "‚ number[x][y]); printf("\n"); } getch(); } Sorting 2-dim Array Values #include<stdio.h> #include<conio.h> main() { int number[3][3] ; int x‚ y‚ temp‚ i‚ j; printf("Unsorted values: \n"); for(x=0; x<3; x++) { for(y=0; y<3; y++) scanf("%d"
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10 MAT 21 Dr. V. Lokesha 2012 Engineering Mathematics – II (10 MAT21) LECTURE NOTES (FOR II SEMESTER B E OF VTU) VTU-EDUSAT Programme-16 Dr. V. Lokesha Professor of Mathematics DEPARTMENT OF MATHEMATICS ACHARYA INSTITUTE OF TECNOLOGY Soldevanahalli‚ Bangalore – 90 Partial Differential Equation 1 10 MAT 21 Dr. V. Lokesha 2012 ENGNEERING MATHEMATICS – II Content CHAPTER UNIT IV PARTIAL DIFFERENTIAL EQUATIONS
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MANAGEMENT SCIENCE informs Vol. 50‚ No. 1‚ January 2004‚ pp. 48–63 issn 0025-1909 eissn 1526-5501 04 5001 0048 ® doi 10.1287/mnsc.1030.0154 © 2004 INFORMS Coordinating Contracts for Decentralized Supply Chains with Retailer Promotional Effort Harish Krishnan Sauder School of Business‚ University of British Columbia‚ Vancouver‚ British Columbia‚ Canada V6T 1Z2‚ harish.krishnan@sauder.ubc.ca Roman Kapuscinski University of Michigan Business School‚ Ann Arbor‚ Michigan 48109
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Wibamanto 1. The graphs y= and y= intersect at the origin. 2. The graphs intersect at the origin. 3. As the degree of the polynomial increases‚ the graphs are approaching y=sin (x). 4. As the degree of the polynomial increases‚ the graphs are moving away from y=cos (x). 5a. When y = sin (1)‚ y = 0.841. Using the Taylor series with two terms‚ y = 0.830. When y = sin (5)‚ y = -0.958. Using the Taylor series with two terms‚ y = - 15.8. When y = cos (1)‚ y = 0.540. Using the
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8517 7263 8368 7232 7309 8362 7240 8407 5428 0577 7226 0606 7324 5250 5285 0585 AU QTY 3 3 1 4 2 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 2 3 1 1 1 2 OH QTY 3 0 1 4 2 1 1 2 1 1 1 1 1 1 1 1 1 1 1 1 1 2 3 1 1 1 2 PCS TRANS Y Y Y Y Y Y Y Y Y Y Y Y Y N N Y Y N Y Y Y N Y Y Y N Y ETS TRANS Y Y N N N Y N N N N N N N N N N N N N N N N N N N N N
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3-4 Find the double integral over the rectangular region R with the given boundaries. R 0 ≤ x ≤ 2‚ 0 ≤ y ≤ 7 Student Response Value Correct Answer A. 8 ln 3 B. ln 24 C. ln 3 D. ln3 ∙ ln 8 100% Score: 1/1 6. CALC9L 9.6.3-2 Find the double integral over the rectangular region R with the given boundaries. R 0 ≤ x ≤ 3‚ 0 ≤ y ≤ 2 Student Response Value Correct Answer A. 9 B. 90 C. 45 100% D.
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NOT gate. x y AND gate x·y x y OR gate x+y x NOT gate x In the case of logic gates‚ a different notation is used: x ∧ y‚ the logical AND operation‚ is replaced by x · y‚ or xy. x ∨ y‚ the logical OR operation‚ is replaced by x + y. ¬x‚ the logical NEGATION operation‚ is replaced by x or x. The truth value TRUE is written as 1 (and corresponds to a high voltage)‚ and FALSE is written as 0 (low voltage). Section 2: Truth Tables 4 2. Truth Tables x y x·y x 0 0 1 1 Summary y x·y 0 0 1
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A: Linear Equations - Straight lines Please remember that when you are drawing graphs you should always label your axes and that y is always shown on the vertical axis. A linear equation between two variables x and y can be represented by y = a + bx where “a” and “b” are any two constants. For example‚ suppose we wish to plot the straight line If x = -2‚ say‚ then y = 3 + 2(-2) = 3 - 4 = -1 If x= -2 -1 -1 1 0 3 1 5 2 7 As you can see‚ we have plotted the five points on the graph. They do indeed
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