click here to go to download section of all mdu btech download all 1st year notes and papers of mdu DOWNLOAD ALL CIVIL NOTES AND PAPERS HERE DOWNLOAD ALL MECHANICAL ENGG NOTES AND PAPERS DOWNLOAD ALL COMPUTER SCIENCE BTECH NOTES AND PAEPRS DOWNLOAD ALL INFORMATION TECHNOLOGY NOTES AND PAEPRS
UPDATED: 28 JUNE on the request of student applications MDU ordered to grant special chance to clear odd semester of BTECH 1, 3 and 5th semester re-appear examination which would held in july/august 2015 to only those such students who have appeared or passed 8th semester examinations and are registered from the year 2007.. mercy exams for mdu btech semester 1st, 3rd or 5th fees will be rs 15000 per semester for each student. last date to submit fees 13.07.2015 exams will held in JULY/ AUGUST 2015 pic of official mail from MDU BTECH (check below) thanks rusty
click here to download TRANSPORTATION 2 PREVIOUS YEAR PAPERS OF MDU BTECH Section A Unit 1 design of flexible pavements types of pavements flexible and rigid pavements components of a pavements and their functions Factor affecting design of pavements Design of thickness of flexible pavement by Group Index method CBR california bearing ratio test Triaxial method and Burmisters method Unit 2 Design of Rigid pavements Westrgaards theory critical location of loading load and temperature stresses critical combination of stresses IRC guidelines for determination of thickness of rigid pavement JOINTS: Requirements types patterns spacing of expansion and contraction joints function of dowel and tie bars SECTION B Unit 3: HIghway construction: Non Bituminous pavements Brief introduction to earthwork machinery: shovel, hoe, clamshell , dragline, bulldozer Princiles of field compaction of subgrade compacting equipments Grannular roads construction steps of WBM WMM construction of cement concrete pavements slip form pavers basic concept of the following: soil stabilized roads, use of geo synthetics, reinforced cement concrete pavements prestress convrete pavements roller compacted concrete pavements and fibre reinforced concrete pavements Unit 4: Construction of Bituminous Pavements Various types of bituminous construction. prime coat, tack coat, seal coat, surface dressing construction of BUSG Premix carpet BM, DBM and AC breif coverage fo machinery for construction of bituminous roads: Bitumen boiler, sprayer, pressure distributor, Hot mix plant, cold mix plant, tripper trucks, Mechanical pavers, or finisher rollers Mastic asphalt Introduction to various IRC and MOST specification SECTION C unit 5: Highway maintenance Pavement failures maintenance operations maintenance of WBM bituminous surfaces and cement concrete pavements Pavements evalution benkleman beam Introduction to various types of overlays Unit 6: HIghway drainage and hill roads surface drainage: Types brief design types of sub surface drainage special characteristics of hill roads, geometrics, hair pin bends construction of hill roads drainage of hill roads mainteneance problem of hill roads SECTION D Unit 7: Highway economics and finance need of economics evalution highway user benefits and costs methods of economics evalution benefits cost ration method net present value method internal rate of return method comparison highway finance Unit 8: Tunnels section of tunnels: advantages, limitation, suitability or each shaft pilot tunnel driving of tunnel in rock: sequence of construction operation full face method heading and bench method drift method driving tunnels in soft ground: sequence & construction operation needle beam method shield tunneling compressed air tunneling click here to download TRANSPORTATION 2 PREVIOUS YEAR PAPERS OF MDU BTECH
hi students!! please check this notification image from mdu bulletin board
MAHARSHI DAYANAND UNIVERSITY ROHTAK ENGINEERING NOTIFICATION It is hereby notified for information of all concerned that the Complaint Committee has been decided to re-examination the paper of B.E./B. Tech. 5th Semester (Civil Engg.) subject “Numerical Method & Computing Techniques, CE-309-E” Paper ID No. 2268 Examination will be held on 22.11.2013 (Friday) at 2.00 pm to 5.00 pm at Saini Co-Education College, Rohtak Examination Centre. CONTROLLER OF EXAMINATIONS Endst. No. AC-4/2013/13754-58 Dated 15.11.2013 official document issued by mdu :
hi guys!!! its time to study for btech students of mdu, because date sheet for university exams is out Date: 5th Dec. 2013:- BE/Btech 1st 3rd 5th 7th and 8th Semesters (Old Scheme) Dec 13 Date: 5th Dec. 2013:- Date Sheet of BE/BTech 1st Sem (New Scheme) Dec 13 Date: 5th Dec. 2013:- Date Sheet of BE/BTech 3rd Sem (New Scheme) Dec 13 Date: 5th Dec. 2013:- Date Sheet of BE/BTech 5th Sem (New Scheme) Dec 13 Date: 5th Dec. 2013:- Date Sheet of BE/BTech 7th Sem (New Scheme) Dec 13 Date: 5th Dec. 2013:- Date Sheet of BE/BTech 8th Sem (New Scheme) Dec 13 download your datesheet and go to study 😛 😛 😛 😛 😛 😛 😛 😛
According to maharshi dayanand university a special examination chance will be given to all ece students which is not conducted in last semester… at 15.07.2013 mdu declares that this exam will be taken next month at 03.08.2013 .. Message from MDU notice board directly:– MAHARSHI DAYANAND UNIVERSITY ROHTAK Special examination (B.E/Btech 5th semester ) engineering notification it is hereby notified for information of all concerned that the following paper which could not be mentioned in the main date sheet shall now be held as under:– subject: electronic measurement and instrumentation EE-303-f branch: Electronic and comm. engg. id no: 24236 date of exam: 03.08.2013 image of notice board :—–
HI STUDENTS!!!! In quantum mechanics, the Schrödinger equation is a partial differential equation that describes how the quantum state of some physical system changes with time. It was formulated in late 1925, and published in 1926, by the Austrian physicist Erwin Schrödinger. INDIAN BTECH students can download this pdf file for their study… this is detailed topic you can read almost every topic in this pdf CLICK HERE FOR DOWNLOAD THIS FILE
HI STUDENTS!!! ALL solved papers of IT branch 4th sem of MDU BTECH were uploaded to studentsuvidha forum so you can download all free without any cost…. so go to our forum and download all papers dont forget to register yourslef CLICK HERE TO DOWNLOAD PAPERS
CLICK HERE TO DOWNLOAD MATHS 3 SOLVED PAPERS QUESTION PAPER Subject with Code: Mathematics-IV(MATH-201-F) Time:- 3 hours Max Marks:- 100 Note: Q No-1 is compulsory. Attempt one question from each Section. All questions of Sections A, B,C and D carry equal marks. Q1 . Objective type/ short-answer type questions.(2.5 x 8 = 20 marks) Find the Fourier Series to represent f(x)=x^2-2,when-2≤x≤2. Find the Fourier sine transform of e^(-ax) Determine the analytic function whose real part is x3-3xy2+3×2-3y2+1 Expand f(x) = |x| as a fourier series-π<x<π. Suppose that X has a Poisson Distribution. If P(X=2)=2P(X=1) Find P(X=3) Taylor’s series expansion of 1/(z-2) in |z|<1 is……………… Show that log(6+8i)= log 10 + i〖 tan〗^(-1) 4/3 A Company Produce two type of model M1 and M2. Each M1 model require 4 hours of grinding and 2 hours of polishing where as each M2 model requires 2 hours of grinding and 5 hours of polishing. The company has 2 grinders and 3 polishers. Each grinder works for 40 hours a week and each polisher works for 60 hours a week. Profit on an M1 model is Rs. 3 and on an M2 model is Rs. 4. Whatever is produce in a week is sold in the market. How should the company allocate its production capacity to the two types of models so that it may make the maximum profit in a week? Formulate the problem as an LPP. SECTION-A Q2 (i) Show that for -π<x<π cos c x=sin(cπ)/π [1/c-(2c cosx)/(c^2-1^2 )+(2c cosx)/(c^2-2^2 )-………] Where c is non integral. Hence deduce that π cosec (cπ)=∑_(n=0)^∞▒〖〖(-1)〗^n [1/(n+c)+1/(n+1-c)] 〗 (ii)Expand f(x) = |cosx| as a fourier series-π<x<π. Q3 (i ) Find the Fourier Transform of the Function f(x)= e^(-x^2/2) ,-∞<x<∞ (ii) Solve the following integral equation ∫_0^∞▒〖f(x) cos〖λx dx =e^(-x) ,〗 〗 λ>0 SECTION-B Q4 (i) If u=logtan〖(π/4〗 +θ/2) , then prove that tanh〖u/2〗=tan〖θ/2〗 cosh〖u=secθ 〗 (ii) If f(z) is an analytic function of z , prove that ( ∂^(2 )/〖∂x〗^2 +∂^(2 )/〖∂y〗^2 )| f(z)|^2=4|f^’ (z)|^2 Q5 (i) Show that Evaluate the integral ∮_c▒(〖(cos〗〖πz^2 〗+sin〖πz^2 〗)dz)/((z-2)〖(z-1)〗^2 ) c: |z|=3 by Cauchy’s integral formula. (ii) If tan〖(θ+iφ)= tan〖α+i secα〗 〗 show e^(2φ )=∓cot〖α/2〗 and 2θ=(n+1/2)π+α SECTION-C Q6 (i) Evaluate the given integral ∫_0^2π▒〖cos3θ/(5-4cosθ) dθ〗 by Contour Integration. (ii)Evaluate the integral by Cauchy integral formula ∫_C▒(4-3z)/(z(z-1)(z-2)) dz where C is the Circle |z|=3/2. Q7 (i) In a bolt factory, there are four machines A, B, C and D manufacturing 20%, 15%, 25% and 40% of the total output respectively. Of their outputs 5%,4%,3% and 2% in the same order, are defective bolts. A bolt is chosen at random from the factory’s production and is found defective. What is the probability that the bolt was manufactured by machine A or machine D? (ii) If the variance of the Poisson distribution is 2, find the probabilities for r=1, 2, 3, 4 from the recurrence relation of the Poisson distribution. SECTION-D Q8(i) Using graphical method, solving the following LPP Maximize Z=2x_1+3x_2 x_1-x_2 ≤2 , x_1+x_2≤4, x_1,x_2≥0 (ii) Solve the LPP by simplex method: Maximize z = 10x_1+x_2+2x_3 Subject to the constraints x_1+x_2-2x_(3 ) ≤10 , 4x_1+x_2+x_3 ≤20 x_1,x_2,x_3≥0 Q9 (i)Solve the LPP by dual simplex method: Minimize z= 2x_(1 )+2x_2+ 4x_3 Subject to the constraints: 〖2x〗_1+3x_(2 )+5x_3 ≥2 , 3x_1+ x_2+7x_3≤3,〖 x〗_1+4x_2+6x_3 ≤5 〖 x〗_1,x_(2 , ) x_3≥0 (ii) Obtain the Dual of Maximize z = 20x_1+30x_2 Subject to the constraints 3x_1+3x_2 ≤36 , 5x_1+2x_2≤50, 〖2x〗_1+〖6x〗_2≤60 x_1,x_2≥0 CLICK HERE TO DOWNLOAD MATHS 3 SOLVED PAPERS