1. Prove with the usual notations that: (b) A + V =- (a) EV = VE = A (c) A= SEZ

Advanced Engineering Mathematics
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Chapter2: Second-order Linear Odes
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Chapter-1: Interpolation
1. Prove with the usual notations that:
(b) A + V =
(a) EV = VE = A
(c) A= SE
2. Apply the suitable formula for the set of values given by the following table to estimate
the value of y = f(x) at x = 0.4 and x = 3.5
0 1 2 3 4
y = f(x) -1 0 13 50 123
3. Find the interpolating polynomial for the following, using Lagrange's Method.
x 0 1 2 5
f(x) 2 3 12 147
4. Develop the Divided Difference Table from the data given below and obtain the
interpolating polynomial f(x)
-4-1 0 2 5
f(x) 1245 33 5 9 1335
Chapter-2: Numerical Integration and Differentiation
5. Approximate the integral x cos(x²) dx using
(a) Trapezoidal rule with n = 5
(b) Simpson's 3/8 rule with n = 5
6. Evaluate the integral fo4(e* + sin x + log, x) dx by using Simpson's one third rule
with n = 6.
Dr Hashim Khan, Jazan University
1 Page
Transcribed Image Text:Chapter-1: Interpolation 1. Prove with the usual notations that: (b) A + V = (a) EV = VE = A (c) A= SE 2. Apply the suitable formula for the set of values given by the following table to estimate the value of y = f(x) at x = 0.4 and x = 3.5 0 1 2 3 4 y = f(x) -1 0 13 50 123 3. Find the interpolating polynomial for the following, using Lagrange's Method. x 0 1 2 5 f(x) 2 3 12 147 4. Develop the Divided Difference Table from the data given below and obtain the interpolating polynomial f(x) -4-1 0 2 5 f(x) 1245 33 5 9 1335 Chapter-2: Numerical Integration and Differentiation 5. Approximate the integral x cos(x²) dx using (a) Trapezoidal rule with n = 5 (b) Simpson's 3/8 rule with n = 5 6. Evaluate the integral fo4(e* + sin x + log, x) dx by using Simpson's one third rule with n = 6. Dr Hashim Khan, Jazan University 1 Page
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