LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034
B.Sc. DEGREE EXAMINATION – MATHEMATICS
FIRST SEMESTER – NOVEMBER 2012
MT 1502 – ALGEBRA AND CALCULUS – I
Date : 08/11/2012 Dept. No. Max. : 100 Marks
Time : 1:00 – 4:00
PART – A
ANSWER ALL QUESTIONS: (10×2=20)
- Find the nth derivative of
- Show that, in the curve, the polar sub tangent varies as the square of the
radius vector and the polar subnormal is a constant.
- Write the conditions for maxima and minima of two variables.
- What is the radius of curvature of the curve at the point (1, 1)?
- Find the co-ordinates of the centre of curvature of the curve at the point
(2, 1).
- Form a rational cubic equation which shall have the roots 1,
- If are the roots of the biquadratic equation
find
- State Newton’s theorem on the sum of the powers of the roots.
- State Descartes’ rule of signs for negative roots.
- Determine if Cardon’s method can be applied to solve the equation
PART – B
ANSWER ANY FIVE QUESTIONS: (5×8=40)
- a) Find the angle at which the radius vector cuts the curve
- b) Find the slope of the tangent with the initial line for the cardioid
at (4 + 4)
- Discuss the maxima and minima of the function
- Prove that the (p-r) equation of the cardioid is and hence
prove that its radius of curvature is
- Show that the evolute of the cycloid ; is another
cycloid.
- Solve the equation
- Show that the sum of the eleventh powers of the roots of is zero.
- a) If are the roots of the equation find the value of
- b) Determine completely the nature of the roots of the equation
(5 + 3)
- If be a real root of the cubic equation of which the coefficients
are real, show that the other two roots of the equation are real, if
PART – C
ANSWER ANY TWO QUESTIONS: (2 x 20 = 40)
- a) Find the nth differential coefficient of .
- b) If, prove that (10 +10)
- A tent having the form of a cylinder surmounted by a cone is to contain a given
volume. If the canvass required is minimum, show that the altitude of the cone is
twice that of the cylinder.
- a) Find the asymptotes of
- b) Show that the roots of the equation are in Arithmetical
progression if Show that the above condition is satisfied by the
equation and hence solve it. (10 + 10)
- Determine the root of the equation which lies between 1 and 2
correct to three places of decimals by Horner’s method.
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