Roll No. [T Total No. of Pages : 02
Total No. of Questions : 09
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B.Tech. (ME) (Sem.-4)
MATHEMATICS-III
Subject Code : AM-201
M.Code : 54035
Time : 3 Hrs. Max. Marks : 60
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INSTRUCTIONS TO CANDIDATES :
- SECTION-A is COMPULSORY consisting of TEN questions carrying TWO marks each.
- SECTION-B contains FIVE questions carrying FIVE marks each and students have to attempt any FOUR questions.
- SECTION-C contains THREE questions carrying TEN marks each and students have to attempt any TWO questions.
SECTION-A
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- Write briefly :
- Give Dirichlet’s conditions for the Fourier series expansion of f'(x).
- Find the value of a0, in the Fourier series expansion of f(x) = x, -p < x < p.
- Find Laplace transform of f(t) = t
- Write the definition of unit step function.
- Write the Laplace transform of periodic function f(t) with period T.
- Find the complementary function of PDE : (2D² + 5DD’ + 2D’²) z = 0.
- Form the partial differential equation from z = ax + a² y² + b.
- Give definition of singular point.
- Give definition of conformal mapping.
- Evaluate ?[(x² + 2y) dx + (3x — y)dy] along the curve x = 2t, y = t² + 3 between (0, 3), (2, 4).
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SECTION-B
- Find the Fourier series expansion of f(x) =
-1, 0 < x < p
2, p < x < 2p - 1) Find L{t sin t} 1) L[ (s²-3s+4) / s ]
- Prove the recurrence relation xJ'?(x) = xnJ?1(x) for Bessel function.
- Solve the linear partial differential equation (mz — ny) p + (nx — lz)q = ly — mx.
- Check if the function f(z) = 2xy + i (x² - y²) is analytic ?
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SECTION-C
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- a) Find the half range Fourier cosine series expansion of f(x) = x, 0 < x < p.
b) Find L?¹{ 1 / [(s+2)(s-1)] } using convolution theorem. - a) Solve the differential equation y'' + 2y' = e?³?, y(0) = 1 using Laplace transform.
b) Solve (D² + 4DD’ —5D’²) z = sin (2x + 3y). - a) Find the analytic function, whose real part is u = sin2x / (cosh2y - cos2x)
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b) Find the Taylor’s series expansion of f(z) = 1 / [(z+1)(z+3)] for the region | z | < 1.
NOTE : Disclosure of Identity by writing Mobile No. or Making of passing request on any page of Answer Sheet will lead to UMC against the Student.
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This download link is referred from the post: PTU B.Tech Question Papers 2020 March (All Branches)