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Provide me question paper for MCA 5th semester examination of Punjab technical university ? Hello, I am providing you some questions here, from the old papers, which will help you: 1. (a) Explain the steps for installing windows applications. Or (b) Explain the different types of tabs? 2. (a) Differentiate between footnotes and end notes? Or (b) Explain the various ways of formatting a paragraph in a document? 3. (a) How do you create columns in a document?Or (b) How do you move and copy text in a word document? 4.(a) What do you mean by Templates and wizards?Or (b) What is Autosummarize? Explain its use? 5.(a) What are the various types of data that can be entered in a cell? Or (b) What are the various components of a chart? 6.(a) What are the steps involved in moving and copying? Or (b) Explain the various date and time functions in Excel. 7. (a) What are the various presentation options? Or (b) How do you send and receive an E-mail? 8. (a) How are Toolbox controls used in designing a form? Or (b) How do you create a Macro? 9. (a) Discuss the various Built-in applications available in windows. Or (b) Explain the following: 10.(a) Explain the basic procedure for creating and applying a style in word. Or (b) Write short notes on Auto correct option with an example. 11.(a) Explain how to format a worksheet. Or (b) List out some additional formatting commands in Excel. 12.(a) What is Boot Virus? Explain how it can be eliminated to cure the system. Or (b) Explain how movies and sounds are inserted in a power point presentation. Here I am also providing some more papers for your help: Punjab technical university, MCA, 5th semester, sample papers: Semester-Exam-1.jpg[/IMG] ![]() ![]() Last edited by Gunjan; July 1st, 2019 at 11:54 AM. |
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Here I am giving you question paper for MCA 5th semester examination of Punjab technical university.. PART ---A Answer ALL questions. (8 x 5 = 40 marks) 1. (a) Define artificial intelligence. Explain how do AI problems differ from normal problems. Or (b) What is an AI technique? Discuss. 2. (a) Define a problem. Explain the state space representation method of a problem with an example. Or (b) Discuss A * algorithm. 3. (a) Discuss mini-max search procedure with examples. Or (b) Explain the following: (i) Futility cut off (ii) Horizon effect. 4. (a) Describe the steps involved in translating a wff to clause form. Or (b) Write short notes on Non-monotonic Reasoning. 5. (a) Give a brief discussion on frames. Or (b) Describe the components of an Expert system. 6. (a) Explain case grammars Or (b) Give a brief note on understanding 7. (a) Write a note on procedural representation Or (b) Describe concept learning. 8. (a) Explain discovery as learning. Or (b) Discuss learning by analogy. PART B (5 x 12 = 60 marks) 9. (a) Discuss in detail the areas of AI. Or (b) Explain the organization of AI systems. 10. (a) Elaborate the characteristics of a problem. Or (b) Discuss the following: (i) Production systems (ii) Means ends analysis. 11. (a) Briefly discuss the alpha beta algorithm with suitable examples illustrating the cutoffs clearly. Or (b) Give a detailed account on scripts. 12. (a) Write a note on natural understanding language in general. Or (b) Explain the use of frames and scripts in understanding. 13. (a) Describe Rote learning. Or (b) Explain learning in GPS 1. (a) State and prove fundamental theorem for homomorphism of rings. (b) Show that an ideal M of a ring R is maximal if and only if ~ is a field. 2. (a) Show that any two elements a and b in a Euclidean ring R have a greatest common divisor. (b) Let F be a field. Prove that the ring of polynomials F over F is an Euclidean ring. 3. (a) State and prove Eisenstein irreducibility criterion. (b) If R is a unique factorization domain, then show that R is also a unique factorization domain. 4. (a) Define a generating set in a vector space. Show that {VI'V2'''. vn} is a minimal generating set of a vector space V if and only ifit is a basis of V . (b) If VI and V2 are subspaces of a vector space V , then prove that dim {VI+V2) =dim VI + dim V2 - dim (VI n V2). 5. (a) If V and Ware vector spaces of dimensions m and n respectively over F, then show that Horn (V, W) is of dimension mn over F . (b) If V is a finite dimensional vector space and v =I:0 is in V , prove that there is an element rEV (V is the dual of V), such that r(v) =I:O. 6. (a) Show that m an M =MI E9M2 E9... E9Mn if and only if R -module, (i) M =MI +M2 +... +Mn (ii) Mi n(MI +M2 +... Mi-I +Mi+1 + .., +M n) =(0) for alIi, 1 S;is; n. (b) Let M be a finitely generated module over a principal ideal domain R. Show that M can be expressed as M = F EBt(M), where F is free. 7. (a) Let Fe K c L be field extensions slow the K/F and L/K are finite. Then prove that L/F is finit, and [L: F] =[L: K] [K: F]. (b) Let K be an extension of a field Fane a EK . Then show that a is algebraic over F if anc only if F(a) is a finite extension of F . 8. (a) Let f(x) be any polynomial of degree n ~1 over a field F . Prove that there is an extension K of F of degree at most n! in which f(x) has n roots. . (b) Obtain a splitting field of X4 - 2 over Q. ,I 9. State and prove the fundamental theorem of Galois theory. ~ 10. (a) Prove that the field of complex numbers' algebraically dosed. (b) Show that for every prime number p ani! n ~ 1, there exists a field with p' element.. - I
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