LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034
B.Sc. DEGREE EXAMINATION – MATHEMATICS
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FIRST SEMESTER – APRIL 2008
MT 1500 – ALG.,ANAL.GEOMET. CAL. & TRIGN. – I
Date : 07/05/2008 Dept. No. Max. : 100 Marks
Time : 1:00 – 4:00
PART – A
Answer ALL the questions. (10 x 2 = 20 marks)
- Find the nth derivative of eax.
- Prove that the subtangent to the curve is of constant length.
- Find the coordinates of the center of curvature of the curve at .
- What is the curvature of a (i) circle (ii) straight line.
- Determine the quadratic equation having (3-2i) as a root.
- If are the roots of the equatim . Show that .
- Prove that .
- Prove that .
- Find the pole of the line with respect to the parabola y2=4ax.
- If are the eccentricities of a hyperbola and its conjugate,
prove that .
PART – B
Answer any FIVE questions. (5 x 8 = 40 marks)
- At which point is the tangent to the curve parallel to the line
- Final the angle at which the radius vector cuts the curve .
- Prove that the radius of curvature at any point of the cycloid
and is .
- Show that if the roots of the equation are in arithmetic progression then .
- If show that .
- If prove that
- i)
- ii)
- Find the locus of poles of chords of the parabola which subtend a right angle at the focus.
- Find the equation of a rectangular hyperbola referred to its asymptotes as axes.
PART – C
Answer any TWO questions. (2 x 20 = 40 marks)
- a) If prove that and
.
- b) Find the (p,r) –equation of the curve and hence show that the radius of curvature at any point varies as the cube of the focal distance.
- a) Find the equation of the evolute of the parabola .
- b) Solve .
- a) Find the real root of to two places of decimals using Horner’s method.
- b) Evaluate .
- a) Prove that .
- b) Derive the equation of the tangent at the point whose rectorial angle is on the conic .
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