Manipal University 2007 A.M.I.E General Branch of Engineering Subjects FIRST SEMESTER B.E END SEMESTER - Question Paper

Engineering Mathematics

Reg.No

MANIPAL INSTITUTE OF TECHNOLOGY

(A constituent college of Manipal University, Manipal -576

FIRST SEMESTER BE DEGREE END SEMESTER EXAMINATIONS - 2007

SUB: ENGG.MATHEMATICS - I (MAT - 101)

(REVISED CREDIT SYSTEM)

Max.Marks : 50

& Note : Answer any FIVE full questions.

x 1 y 2 z 3 Find the image of the line-= --=- in the plane 2x + y + z = 6.

1

(4 + 3 + 3)

If y = tan ¹ x, show that

(1 + x )yn+2 + 2(n+1) xyn+1 + n (n +1) yn = 0

3 2

2B. Find the circle of curvature at the point (0, 1) on the curve y = x + 2x + x+ 1.

2C. Find the length of the parabola y = 4ax from the vertex to one extremity of the latus rectum

(3 + 3 + 4)

3A. Find the angle between two curves (in its simplest form) at the point of intersection given r² = a² cos20, r = a ( 1 + cos0).

3B. (i) State integral test

(ii) Test the nature of V, ⁿ xⁿ

^V '    i Vn +1

Find the percentage error in r if 2% error is made in measurement of ri and r₂

111     o

given - = i.    (4 + 3 + 3)

2 2

4A. Sketch and find the area of the loop of the curve y (a + x) = x ( a - x)

4B. Find first three non zero terms in Maclurins series expansion of f(x) = tanx

4C. (i) State Cacuhys root test.

(ii) Test the convergence of

1 + i + aiaiil + ^a (^a+'X;+²) +...    (if a, b > o.)

b b (b +1) b (b + l)(b + 2)

(3 + 3 + 4)

5A. (j) Obtain the reduction formula for J cosⁿ x dx hence evaluate J sinⁿx dx

x

o

¹ x⁹

⁽ⁱⁱ⁾ J /^x ₂ ^dx

o -\/1 - x

5B. (i) State Lagranges mean value theorem.

(ii) Verify Cauchys mean value theorem for f(x) = log_e x, g(x) = in [ 1, e]

x

22

5C. Trace with explanation r = a cos20 and find its area.

(4 + 3 + 3)

6A. Find the equation of the right circular cone generated when the straight line 2y + 3z = 6, x = 0 revolves about z - axis.

6B. Evaluate :

lt

(i)

lt

(ii)    (sin x)

x 0^V

6C. Find the points on the lines x - 6 = y - 7 = z - 4

3 = -1 = 1 x y + 9 z - 2

(-3) 2 4

which are nearest to each other. Hence find the shortest distance between the lines.    (3 + 4 + 3)

w

MANIPAL INSTITUTE OF TECHNOLOGY

(A constituent college of Manipal University, Manipal -576

FIRST SEMESTER BE DEGREE END SEMESTER EXAMINATIONS - 2007

SUB: ENGG.MATHEMATICS - I (MAT - 101)

(REVISED CREDIT SYSTEM)

Time : 3 Hrs.    Max.Marks : 50

& Note : Answer any FIVE full questions._

IA.    Find the n^th derivative of

4x

(i)-z--(ii) sinx. Sin2x.sin3x

(x -1)² (x + 1)

2/ 2/ 2/

IB.    Find the evolute of x³ + y³ = a'³, (a > 0).

IC.    Find the image of the point (1, 2, 3) in the plane x + 2y + 3z = 21.

1/ -1/

2A. If y^/m + y ^/m = 2x, prove that

(x² - 1) yn+2 + (2n+1)xyn+1 + (n² - m²)yn = 0

2B. If p be the radius of curvature at any point P on the parabola y = 4ax and S be

2    3

its focus, then show that p varies as (SP) .

23

2C. Find the volume of the solid formed by revolving the curve y (2a - x) = x about its asymptote.

(4 + 3 + 3)

3A. Find the angle of intersection of the curves r = ^a and r = ^b

1 + cos 9    1 - cos 9

(in its Simplest form).

3B. Define :

(i)    Absolute convergence

(ii)    Conditionally convergence Find the nature of the series

1    1.3 ₂ 1.3.5 ₃

x + -x² + -x³ + ...

2    2.4 2.4.6

(4 + 3+ 3)

Attachment: manipal-university-2007-a-m-i-e-general--branch-of--engineering-subjects-3463-1.pdf

Earning:   Approval pending.