- Messages
- 96
- Reaction score
- 27
- Points
- 28
q1) If x, y and z are the first three terms of a geometric sequence, show that x^2, y^2 and z^2 form another geometric sequence.
q2)Different numbers x,y and z are the first three terms of a geometric progression with the common ratio r, and also the first, second and forth terms of an arithmetic progression.
(a)Find the value of r.(ans=2)
(b)Find which term of the arithmetic progression will next be equal to a term of the geometric progression.(ans=8th)
q3) Consider the geometric progression
q^n-1 + q^n-2p + q^n-3p^2+.....+qp^n-2+p^n-1
(a) Find the common ratio and the numbers of terms.(ans=p/q , n)
(b) Show that the sum of the series is equal to ((q^n-p^n)/q-p) (ans= np^n-1)
(c) By considering the limit as q→p deduce expressions for f'(p) in the case (f inverse of p) in this cases
(i) f(x)=x^n (ans= np^n-1), (ii) f(x)=x^-n (ans= -np^-(n+1) ), for all positive integers n.
THANK YOU FOR HELPING!
q2)Different numbers x,y and z are the first three terms of a geometric progression with the common ratio r, and also the first, second and forth terms of an arithmetic progression.
(a)Find the value of r.(ans=2)
(b)Find which term of the arithmetic progression will next be equal to a term of the geometric progression.(ans=8th)
q3) Consider the geometric progression
q^n-1 + q^n-2p + q^n-3p^2+.....+qp^n-2+p^n-1
(a) Find the common ratio and the numbers of terms.(ans=p/q , n)
(b) Show that the sum of the series is equal to ((q^n-p^n)/q-p) (ans= np^n-1)
(c) By considering the limit as q→p deduce expressions for f'(p) in the case (f inverse of p) in this cases
(i) f(x)=x^n (ans= np^n-1), (ii) f(x)=x^-n (ans= -np^-(n+1) ), for all positive integers n.
THANK YOU FOR HELPING!
