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Roll No. Total No. of Pages : 02
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Total No. of Questions : 18
B.Tech (Civil Engg.) (2018 & Onwards) (Sem.-2)
MATHEMATICS-II
Subject Code : BTAM-201-18
M.Code : 76254
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Time : 3 Hrs. Max. Marks : 60
INSTRUCTIONS TO CANDIDATES :
- SECTION-A is COMPULSORY consisting of TEN questions carrying TWO marks each.
- SECTION -B & C have FOUR questions each.
- Attempt any FIVE questions from SECTION B & C carrying EIGHT marks each.
- Select atleast TWO questions from SECTION - B & C.
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SECTION-A
Answer briefly :
- Is this differential equation $z''x - \frac{2}{y} + a^2x = 0$ linear?
- Is this differential equation $x^2 ydx - (x^3 + y^3) dy = 0$ exact?
- Write the solution of the Clairaut’s equation $y= px + sin^{-1} p$.
- Find the wronskian from $\frac{d^2y}{dx^2} + 4y = \tan 2x$.
- Find complementary function of $\frac{\partial^2 z}{\partial x^2} - 2\frac{\partial^2 z}{\partial x \partial y} + \frac{\partial^2 z}{\partial y^2} = \sin x$.
- Find particular integral of $(D_x^2 - a^2) Z = x^2 \sin pt$.
- Write one dimensional wave equation.
- Classify the equation $(x + 1) u_{xx} - 2(x + 2)u_{xy} + (x + 3) u_{yy} = 0$.
- What is a boundary value problem?
- Write Laplace equation in cylindrical coordinates.
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SECTION-B
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- Solve a) $[1+\log(xy)]dx+\{1+\frac{x}{y}\}dy =0$. b) $x[\frac{dy}{dx}+y]=1-y$.
- a) Solve $(D^2 - 6D + 9)y=6e^{3x}+7e^{-2x} - \log 2$. b) Find the power series solution of the differential equation $(4x^2 D^2+ 2D + 1) y = 0$.
- Solve a) $p\sqrt{x} +q\sqrt{y} =z$ b) $xp+yq=z(x+y)$.
- a) Solve the PDE $(D^2 - 2DD’ + D'^2)z =e^{x+y}$. b) Solve the PDE $(D + D') (D — 2D’ +2) z = \sin (2x + y)$.
SECTION-C
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- Solve $4\frac{\partial u}{\partial x} + \frac{\partial u}{\partial y} =3u$ by method of separation of variables. Given that $u = 3e^{-y} - e^{-5x}$ when $x = 0$.
- Solve the BVP $\frac{\partial^2 u}{\partial t^2} =c^2 \frac{\partial^2 u}{\partial x^2}$ using D’ “Alembert’s technique subject to the conditions $u=P_y \cos pt$ when $x =l$ and $u = 0$ when $x =0$.
- Solve the BVP $\frac{\partial^2 u}{\partial t^2} =c^2 \frac{\partial^2 u}{\partial x^2}$ using separation of variables method subject to the conditions $u (0, t) = u (l, t) =0$, $u (x, 0) =x$ where $l > 0$.
- The diameter of a semi-circular plate of radius a is kept at 0°C and the temperature at the semicircular boundary is T°C. Estimate the steady state temperature in the plate using the Laplace equation $r^2\frac{\partial^2 u}{\partial r^2} + r\frac{\partial u}{\partial r} + \frac{\partial^2 u}{\partial \theta^2} =0$.
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 December (All Branches)
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