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Civil Engineering (CE) Exam  >  Civil Engineering (CE) Tests  >  Engineering Mathematics  >  Test: Newton-Gregory Forward Interpolation Formula - Civil Engineering (CE) MCQ

Test: Newton-Gregory Forward Interpolation Formula - Civil Engineering (CE) MCQ


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10 Questions MCQ Test Engineering Mathematics - Test: Newton-Gregory Forward Interpolation Formula

Test: Newton-Gregory Forward Interpolation Formula for Civil Engineering (CE) 2024 is part of Engineering Mathematics preparation. The Test: Newton-Gregory Forward Interpolation Formula questions and answers have been prepared according to the Civil Engineering (CE) exam syllabus.The Test: Newton-Gregory Forward Interpolation Formula MCQs are made for Civil Engineering (CE) 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Newton-Gregory Forward Interpolation Formula below.
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Test: Newton-Gregory Forward Interpolation Formula - Question 1
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Find n for the following data if f(0.2) is asked.

Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 1

The formula is
x = x0 + nh.
Here x0 is 0 as 0 is the first element and h is 1.
Since in the question it is given that we have to find f(0.2), x= 0.2.
So, substituting the values in the formula we get,
0.2 = 0 + n(1) .
Hence, n= 0.2.

Test: Newton-Gregory Forward Interpolation Formula - Question 2
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Newton- Gregory Forward interpolation formula can be used _______

Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 2

Newton – Gregory Forward Interpolation formula is given by
f(x) = y0 + nΔy0 + n(n-1)Δ2y0/2! + n(n-1)(n-2) Δ3y0 /3! + …..
This formula is obtained by the Newton’s Divided difference formula by substituting the intervals as h. This is done because we assume the intervals to be constant, that is, equally spaced.

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Test: Newton-Gregory Forward Interpolation Formula - Question 3
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Find the polynomial for the following data.

Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 3

Here,

y0 is 1 since it is forward interpolation formula.
Δy0 = 2
Δ2y0 = 3
Δ3y0 = 0
x = x0 + nh,
x = 4 + n(2)
Hence
n = (x-4)/2
Substituting these values in the formula,
f(x) = y0 + nΔy0 + n(n-1)Δ2y0/2! + n(n-1)(n-2) Δ3y0 /3!,

Test: Newton-Gregory Forward Interpolation Formula - Question 4
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Find n for the following data if f(1.8) is asked.
Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 4

Here, x0 is 0, h is 0.5, x is 1.8.
Substituting the values in the formula
x = x0 + nh,
1.8 = 0 + n(0.5)
n = 3.6.

Test: Newton-Gregory Forward Interpolation Formula - Question 5
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Find f(5) using Newton’s Forward interpolation formula from the following table.
Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 5

Here,
x0 = 0
x = 5
h = 2
x = x0 + nh,
5 = 0 + n(2)
n = 2.5

y0 is 4 since it is forward interpolation formula.
Δy0 = 22
Δ2y0 = 10
Δ3y0 = 12
Δ4y0 = 266
Substituting in the formula,

Test: Newton-Gregory Forward Interpolation Formula - Question 6
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Using Newton’s Forward formula, find sin(0.1604) from the following table.
Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 6

Here,
x0 = 0.160
x = 0.1604
h = 0.001
x = x0 + nh,
0.1604 = 0.160 + n(0.001)
n = 0.4

y0 is 0.1593182066 since it is forward interpolation formula.
Δy0 = 9.871475*10-4
Δ2y0 = -1.604*10-7
Substituting in the formula,
f(x) = y0 + nΔy0 + n(n-1)Δ2y0/2! + n(n-1)(n-2) Δ3y0 /3! ,
f(0.1604) = 0.1593182066+(0.4)(9.871475*10-4)+(0.4)(-0.6) 
= 0.159713084.

Test: Newton-Gregory Forward Interpolation Formula - Question 7
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Find f(2.75) using Newton’s Forward interpolation formula from the following table.
Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 7

Here,
x0 = 1.5
x = 2.75
h = 0.5
x = x0 + nh,
2.75 = 1.5 + n(0.5)
n = 2.5

y0 is 3.375 since it is forward interpolation formula.
Δy0 = 3.625
Δ2y0 = 3
Δ3y0 = 0.75
Δ4y0 = 0
Δ5y0 = 0
Substituting in the formula,

Test: Newton-Gregory Forward Interpolation Formula - Question 8
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Find f(0.18) from the following table using Newton’s Forward interpolation formula.
Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 8

Here,
x0 = 0
x = 0.18
h = 0.1
x = x0 + nh,
0.18 = 0 + n(0.1)
n = 1.8

y0 is 1 since it is forward interpolation formula.
Δy0 = 0.052
Δ2y0 = 0.1174
Δ3y0 = -0.1583
Δ4y0 = 0.2126
Substituting in the formula,

Test: Newton-Gregory Forward Interpolation Formula - Question 9
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Find x if x0 = 0.6, n = 2.6 and h = 0.2.
Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 9

Given
x0 = 0.6
n = 2.6
h = 0.2
Substituting in the formula,
x = x0 + nh
x = 0.6+(0.2)(2.6)
x = 1.12.

Test: Newton-Gregory Forward Interpolation Formula - Question 10
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Find n if x0 = 0.75825, x = 0.759 and h = 0.00005.
Detailed Solution for Test: Newton-Gregory Forward Interpolation Formula - Question 10

Given
x0 = 0.75825
x = 0.759
h = 0.00005
Substituting in the formula,
x = x0 + nh,
0.759 = 0.75825 + n(0.00005)
Therefore, n = 15.

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