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Questions without answers in Numerical Methods
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1
Numerical Method Analysis : Help...
Use Secant method to find roots of: $x^3-2x^2+3x-5=0$ $x+1 = 4sinx$ $e^x = x + 2$
kidussss
asked
in
Numerical Methods
Mar 7, 2023
by
kidussss
259
views
numerical-methods
out-of-gate-syllabus
0
votes
0
answers
2
Numerical Method Analysis : Help....
Use NR method to find a root of the equation with tolerance x=0.00001. $x^3-2x-5=0$ $e^x-3x^2=0$
kidussss
asked
in
Numerical Methods
Mar 7, 2023
by
kidussss
196
views
numerical-methods
out-of-gate-syllabus
0
votes
0
answers
3
Numerical Method Analysis : Help...
Use Bisection method to find all roots of $x^3 – 5x + 3 = 0$
kidussss
asked
in
Numerical Methods
Mar 7, 2023
by
kidussss
110
views
numerical-methods
out-of-gate-syllabus
0
votes
0
answers
4
Numerical Method Analysis : Help...
Use Bisection method to find the root of the following equation with tolerance 0.001. $x^4 - 2x^3 - 4x^2 + 4x + 4 = 0$ $x^3 – e^x + sin(x) = 0$
kidussss
asked
in
Numerical Methods
Mar 7, 2023
by
kidussss
265
views
numerical-methods
out-of-gate-syllabus
0
votes
0
answers
5
NIELIT 2021 Dec Scientist B - Section B: 60
One root of $x^{3} – x – 4 = 0$ lies in $(1, 2).$ In bisection method, after first iteration the root lies in the interval ___________ . $(1, 1.5)$ $(1.5, 2)$ $(1.25, 1.75)$ $(1.75, 2)$
admin
asked
in
Numerical Methods
Jul 21, 2022
by
admin
223
views
nielit-2021-it-dec-scientistb
numerical-methods
1
vote
0
answers
6
NIELIT 2016 MAR Scientist C - Section B: 1
Choose the most appropriate option. The Newton-Raphson iteration $x_{n+1}=\dfrac{x_{n}}{2}+\dfrac{3}{2x_{n}}$ can be used to solve the equation $x^{2}=3$ $x^{3}=3$ $x^{2}=2$ $x^{3}=2$
admin
asked
in
Numerical Methods
Apr 2, 2020
by
admin
391
views
nielit2016mar-scientistc
non-gate
numerical-methods
0
votes
0
answers
7
2012 numerical methed
Nisha kumari
asked
in
Numerical Methods
Jan 29, 2015
by
Nisha kumari
289
views
numerical-methods
out-of-syllabus-now
non-gate
2
votes
0
answers
8
GATE IT 2004 | Question: 39
Consider the following iterative root finding methods and convergence properties: Iterative root finding methods Convergence properties Q. False Position I. Order of convergence = 1.62 R. Newton Raphson II. Order of convergence = 2 S. Secant III. Order of convergence = 1 with guarantee of convergence T. ... R-II, S-I, T-IV Q-II, R-I, S-IV, T-III Q-I, R-IV, S-II, T-III
Ishrat Jahan
asked
in
Numerical Methods
Nov 2, 2014
by
Ishrat Jahan
1.7k
views
gateit-2004
numerical-methods
normal
0
votes
0
answers
9
GATE IT 2006 | Question: 27
Match the following iterative methods for solving algebraic equations and their orders of convergence. Method Order of Convergence 1. Bisection P. 2 or more 2. Newton-Raphson Q. 1.62 3. Secant R. 1 4. Regula falsi S. 1 bit per iteration I-R, II-S, III-P, IV-Q I-S, II-R, III-Q, IV-P I-S, II-Q, III-R, IV-P I-S, II-P, III-Q, IV-R
Ishrat Jahan
asked
in
Numerical Methods
Oct 31, 2014
by
Ishrat Jahan
1.4k
views
gateit-2006
numerical-methods
normal
out-of-gate-syllabus
0
votes
0
answers
10
GATE CSE 1994 | Question: 1.3
Backward Euler method for solving the differential equation $\frac{dy}{dx}=f(x, y)$ is specified by, (choose one of the following). $y_{n+1}=y_n+hf(x_n, y_n)$ $y_{n+1}=y_n+hf(x_{n+1}, y_{n+1})$ $y_{n+1}=y_{n-1}+2hf(x_n, y_n)$ $y_{n+1}= (1+h)f(x_{n+1}, y_{n+1})$
Kathleen
asked
in
Numerical Methods
Oct 4, 2014
by
Kathleen
1.1k
views
gate1994
numerical-methods
backward-euler-method
out-of-gate-syllabus
0
votes
0
answers
11
GATE CSE 1997 | Question: 4.3
Using the forward Euler method to solve $y’'(t) = f(t), y’(0)=0$ with a step size of $h$, we obtain the following values of $y$ in the first four iterations: $0, hf (0), h(f(0) + f(h)) \text{ and }h(f(0) - f(h) + f(2h))$ $0, 0, h^2f(0)\text{ and } 2h^2 f(0) + f(h)$ $0, 0, h^2f(0) \text{ and } 3h^2f(0)$ $0, 0, hf(0) + h^2f(0) \text{ and }hf (0) + h^2f(0) + hf(h)$
Kathleen
asked
in
Numerical Methods
Sep 29, 2014
by
Kathleen
668
views
gate1997
numerical-methods
non-gate
out-of-gate-syllabus
0
votes
0
answers
12
GATE CSE 1993 | Question: 02.4
Kathleen
asked
in
Numerical Methods
Sep 13, 2014
by
Kathleen
372
views
gate1993
numerical-methods
runga-kutta-method
out-of-gate-syllabus
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