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Civil Engineering (CE) Exam  >  Civil Engineering (CE) Tests  >  Engineering Mathematics  >  Test: Method of Parameter Variations - Civil Engineering (CE) MCQ

Test: Method of Parameter Variations - Civil Engineering (CE) MCQ


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9 Questions MCQ Test Engineering Mathematics - Test: Method of Parameter Variations

Test: Method of Parameter Variations for Civil Engineering (CE) 2024 is part of Engineering Mathematics preparation. The Test: Method of Parameter Variations questions and answers have been prepared according to the Civil Engineering (CE) exam syllabus.The Test: Method of Parameter Variations MCQs are made for Civil Engineering (CE) 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: Method of Parameter Variations below.
Solutions of Test: Method of Parameter Variations questions in English are available as part of our Engineering Mathematics for Civil Engineering (CE) & Test: Method of Parameter Variations solutions in Hindi for Engineering Mathematics course. Download more important topics, notes, lectures and mock test series for Civil Engineering (CE) Exam by signing up for free. Attempt Test: Method of Parameter Variations | 9 questions in 30 minutes | Mock test for Civil Engineering (CE) preparation | Free important questions MCQ to study Engineering Mathematics for Civil Engineering (CE) Exam | Download free PDF with solutions
Test: Method of Parameter Variations - Question 1
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Solve (x2 – y2) dx – xydy = 0

Detailed Solution for Test: Method of Parameter Variations - Question 1

(x2 – y2) dx – xydy = 0

This homogeneous in x & y

Separating the variables

Integrating on both side

⇒ 4logx + log⁡(1 − 2v2) = −4c

⇒ x2 (x2 – 2y2) = constant

Test: Method of Parameter Variations - Question 2
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The differential equationis solving by the method of variation of parameters, where the complementary function is given by- y = c1y1(x) + c2y2(x)

Detailed Solution for Test: Method of Parameter Variations - Question 2

Concept:

Calculation:

Given:

(D2 – 6D + 9)y = e3x/x2

Auxiliary equation is

(D2 – 6D + 9) = 0

⇒ (D – 3)2 = 0

C.F. = (C1 + C2x) e3x

C.F = C1(e3x) + C2(xe3x)

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Test: Method of Parameter Variations - Question 3
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The differential equation is solving by the method of variation of parameters, the Wronskian will be______

Detailed Solution for Test: Method of Parameter Variations - Question 3


Auxiliary equation, D2 – 1 = 0

⇒ D = ± 1

C.F. = C1ex + C2e−x

Here, y1 = ex

y2 = e-x

y1′ = ex
y2′ = −e−x


= -1 - 1 = -2

Test: Method of Parameter Variations - Question 4
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The Wronskian of the differential equation
Detailed Solution for Test: Method of Parameter Variations - Question 4

If the given differential equation is in the form, y'' + py' + qy = x

Where, p, q, x are functions of x.

Then Wronskian is,

Here, y1 and y2 are the solutions of y'' + py' + qy = 0

Given differential equation is,

Auxiliary equation is,

D2 – 3D + 2 = 0

⇒ D = 1, 2

C.F. = c1 e2x + cex

y1 = e2x, y2 = ex

Test: Method of Parameter Variations - Question 5
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Consider the following differential equation:

Which of the following is the solution of the above equation (is an arbitrary constant)?
Detailed Solution for Test: Method of Parameter Variations - Question 5

Given differential eqaution is,

Let, y = v × x

dy = vdx + xdv

By substituting values of Y and dY in equation 1, we get

Integrating both sides

2 log x = log |sec v| - log v + log c

Test: Method of Parameter Variations - Question 6
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The differential equationis solving by the method of variation of parameters, then Wronskian will be –

Wronskian for solution y = c1y1(t) + c2y2(t) is defined as
Detailed Solution for Test: Method of Parameter Variations - Question 6

Give equation is (D2 – 6D + 9)y = e3x/x2

Auxiliary equation is, (D2 – 6D + 9) = 0

⇒ (D – 3)2 = 0

C.F. = (C1 + C2x) e3x

Test: Method of Parameter Variations - Question 7
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Find the particular solution of the differential equation
Detailed Solution for Test: Method of Parameter Variations - Question 7

Given differential equation is

auxiliary equation is (D − 2)2 = 0 ⇒ D = 2, 2


This problem can be solved by using the method of variation of parameters. Then

Test: Method of Parameter Variations - Question 8
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Solution of the differential equation is 
Detailed Solution for Test: Method of Parameter Variations - Question 8


Test: Method of Parameter Variations - Question 9
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Solution of differential equation (D2 + 4)y = cosec 2x
Detailed Solution for Test: Method of Parameter Variations - Question 9

Auxiliary equation:

m2 + 4 = 0

m = ±2i


By wrongskion,

PI = A u(x) + B v(x)

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