Previous Year Very Short Questions of NMCE (B-TECH civil engineering 6th)

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NUMERICAL METHODS IN CIVIL ENGINEERING

Previous year question paper with solutions for NUMERICAL METHODS IN CIVIL ENGINEERING

Our website provides solved previous year question paper for NUMERICAL METHODS IN CIVIL ENGINEERING . Doing preparation from the previous year question paper helps you to get good marks in exams. From our NMCE question paper bank, students can download solved previous year question paper. The solutions to these previous year question paper are very easy to understand.

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Very short questions
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  1. Write a short note on Initial value problems
  2. Find the interval in which the root of equation x 3 – x – 11 = 0 lies.
  3. Write a short note on Bisection method.
  4. Find the polynomial which takes following data (0, 1), (1, 2) and (2, 1)
  5. Write a short note on Galerkin's method of least squares.
  6. Write an example of civil engineering related real life problem
  7. Write various techniques for approximating interpolating polynomials.
  8. Define transcendental equation.
  9. Write normal equations for fitting straight line.
  10. Give any two differences between Galerkins method and Collocation method.
  11. Write formula of Modified Euler’s method for the solution of ordinary differential equation.
  12. Give SOR method for the solution of partial differential equation
  13. Write relation between forward operator and shift operator
  14. Write Newton-Raphson formula for the solution of Non-linear equations
  15. Define Interpolation & Extrapolation.
  16. Write three different techniques for the solution of Boundary value problem
  17. Write a short note on initial value problem
  18. Find the Eigenvalues and Eigenvector of the matrix
  19. Write a short note on Galerkin's method of least square.
  20. Find the interval on which the root of the equation x3 − 2x − 5 = 0 lies
  21. Write Newton Raphson formula for the solution of non-linear equation.
  22. What is meant by saying that Runga-Kutta formula is of the fourth order?
  23. Fit a polynomial of second degree to the data prints (x, y) given by (0, 1), (1,6) and (2, 17).