S n. = n. Sum of first n terms of an A. P is

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Lawrence Stewart
5 years ago
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1 PROGREION I his secio we discuss hree impora series amely ) Arihmeic Progressio (A.P), ) Geomeric Progressio (G.P), ad 3) Harmoic Progressio (H.P) Which are very widely used i biological scieces ad humaiies. Arihmeic Progressios Cosider he sequece of umbers of he form, 4, 7,0. I his sequece he ex erm is formed by addig a cosa 3 wih he curre erm. A arihmeic progressio is a sequece i which each erm (excep he firs erm) is obaied from he previous erm by addig a cosa kow as he commo differece. A arihmeic series is formed by he addiio of he erms i a arihmeic progressio. Le he firs erm o a A. P. be a ad commo differece d. The, geeral form of a A. P is a, a + d, a + d, a + 3d,... h erm of a A. P is a + ( - ) d um of firs erms of a A. P is / [a + ( - ) d] or / [ firs erm + las erm] Example : Fid (i) The h erm ad (ii) um o erms of he A.P whose firs erm is ad commo differece is 3. Aswer: ) + ( )3 3 ) ( + ( ) 3) ( 3 ) Example : Fid he sum of he firs aural umbers. oluio The sum of he aural umbers is give by This is a A.P whose firs erm is ad commo differece is also oe ad he las erm is. ( Firs erm + las erm) ( + ) Example 3 Fid he h erm of he A.P 7, 7, 7,

2 oluio I he A.P 7, 7, 7, a 7, d ad a + ( ) d a + ( ) d a + 4d 7 + 4(0) 47. Geomeric Progressio Cosider he sequece of umbers a),, 4, 8, 6 b),,, I he above sequeces each erm is formed by muliplyig cosa wih he precedig erm. For example, i he firs sequece each erm is formed by muliplyig a cosa wih he precedig erm. imilarly he secod sequece is formed by muliplyig each erm by 4 o obai he ex erm. uch a sequece of umbers is called Geomeric progressio (G.P). A geomeric progressio is a sequece i which each erm (excep he firs erm) is derived from he precedig erm by he muliplicaio of a o-zero cosa, which is he commo raio. The geeral form of G.P is a, ar, ar, ar 3, Here a is called he firs erm ad r is called commo raio. The h erm of he G.P is deoed by is give by ar The sum of he firs erms of a G.P is give by he formula ( r ) a if r> r ( r ) a if r< r. Fid he commo raio of he G.P 6, 4, 36, 4. oluio 4 3 The commo raio is 6

3 8 3. Fid he 0 h erm of he G.P,, 3, oluio: 8 4 Here a ad r 8 ice 0 ar we ge ( ) 0 um o ifiiy of a G.P 9 0 Cosider he followig G.P s ).,,, ).,,,, I he firs sequece, which is a G.P he commo raio is r.i he secod G.P he commo raio is r. I boh hese cases he umerical value of r r <.(For he firs sequece 3 r ad he secod sequece r ad boh are less ha. I hese equaios, ie. r < 3 we ca fid he um o ifiiy ad i is give by he form a provided -<r< r. Fid he sum of he ifiie geomeric series wih firs erm ad commo raio. oluio Here a ad r 4

4 . Fid he sum of he ifiie geomeric series / + /4 + /8 + /6 + oluio: I is a geomeric series whose firs erm is / ad whose commo raio is /, so is sum is Harmoic Progressio ( ) Cosider he sequece,,,,....this sequece is formed by a a + d a + d a + 3d akig he reciprocals of he A.P a, a+d, a+d, For example, cosider he sequece,,,,... 8 Now his sequece is formed by akig he reciprocals of he erms of he A.P,, 8,. uch a sequece formed by akig he reciprocals of he erms of he A.P is called Harmoic Progressio (H.P). The geeral form of he harmoic progressio is,,,,... a a + d a + d a + 3d The h erm of he H.P is give by a + ( ) d Noe There is o formula o fid he sum o erms of a H.P.. The firs ad secod erms of H.P are 3 ad respecively, fid he 9 h erm. oluio a + ( ) d Give a 3 ad d (9 )

5 3 + (8) 9 Arihmeic mea, Geomeric mea ad Harmoic mea The arihmeic mea (A.M) of wo umbers a & b is defied as A.M (. ) Noe: Arihmeic mea. Give x, y ad z are cosecuive erms of a A. P., he y - x z - y y x + z y is kow as he arihmeic mea of he hree cosecuive erms of a A. P. The Geomeric mea (G.M) is defied by G.M ab (. ) The Harmoic mea (H.M) is defied as he reciprocal of he A.M of he reciprocals ie. H.M + a b ab H.M (. 3)

6 .Fid he A.M, G.M ad H.M of he umbers 9 & 4 oluio: A.M 6. G.M H.M Fid he A.M,G.M ad H.M bewee 7 ad 3 oluio: A.M 0 G.M H.M If he A.M bewee wo umbers is, prove ha heir H.M is he square of heir G.M. oluio Arihmeic mea bewee wo umbers is. ie. Now H.M ab ab G.M ab ( G.M ) ab H.M ( G.M)

Chapter 6. Progressions

Chapter 6. Progressions Chapter 6 Progressios Evidece is foud that Babyloias some 400 years ago, kew of arithmetic ad geometric progressios. Amog the Idia mathematicias, Aryabhata (470 AD) was the first to give formula for the