Hey i just got a couple of questions,
1. Of the three roots of the cubic equation x^3 - 15x + 4 = 0, two are reciprocals.
(i) Find the other root. (i got -4)
(ii) Find all the roots and verify that two of them are reciprocals.
2. A solid cylinder, radius r and height h, is to be constructed under the condition that the sum of its height and circumference is S, where S is constant.
Prove that
(i) if it is given its maximum possible volume, h = S/3
(ii) if it is given its maximum possible total surface area, r+ h = S/2
3. (i) Express sinx - cosx in the form Asin(x-y), with A > 0 and 0 < y < pi/2. (i got (rt2)sin(x-pi/4).)
(ii) Determine lim x->pi/4 (sinx-cosx)/(x-pi/4)
4. AB is a chord of a circle of radius 1 metre that subtends an angle x at the centre, where 0<x<pi. the perimeter of the minor segment cut off by AB is equal to the diameter of the circle.
(i) Show that x +2sin(0.5x) - 2 = 0
(ii) Show that the value of x is such that 1<x<2.
5. (i) Write down the binomial expression of (1+x)^n in ascending powers of x.
(ii) Show that n(sigma)r+1 nCr = 2^n -1 (i thought that you will use induction but its only 1 mark).
(iii) Use integration and the answer to part (i) to show that
(1/n+1)(n+1 sigma r=1) n+1Cr = n sigma r=0 (nCr/r+1)
Sorry for the setting out especially for the last question but any help will be greatly appreciated.
Thanks in advanced.
1. Of the three roots of the cubic equation x^3 - 15x + 4 = 0, two are reciprocals.
(i) Find the other root. (i got -4)
(ii) Find all the roots and verify that two of them are reciprocals.
2. A solid cylinder, radius r and height h, is to be constructed under the condition that the sum of its height and circumference is S, where S is constant.
Prove that
(i) if it is given its maximum possible volume, h = S/3
(ii) if it is given its maximum possible total surface area, r+ h = S/2
3. (i) Express sinx - cosx in the form Asin(x-y), with A > 0 and 0 < y < pi/2. (i got (rt2)sin(x-pi/4).)
(ii) Determine lim x->pi/4 (sinx-cosx)/(x-pi/4)
4. AB is a chord of a circle of radius 1 metre that subtends an angle x at the centre, where 0<x<pi. the perimeter of the minor segment cut off by AB is equal to the diameter of the circle.
(i) Show that x +2sin(0.5x) - 2 = 0
(ii) Show that the value of x is such that 1<x<2.
5. (i) Write down the binomial expression of (1+x)^n in ascending powers of x.
(ii) Show that n(sigma)r+1 nCr = 2^n -1 (i thought that you will use induction but its only 1 mark).
(iii) Use integration and the answer to part (i) to show that
(1/n+1)(n+1 sigma r=1) n+1Cr = n sigma r=0 (nCr/r+1)
Sorry for the setting out especially for the last question but any help will be greatly appreciated.
Thanks in advanced.
