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PROGRESSION (A.P., G.P., H.P.) (PART-II)

anuraagchandra
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anuraagchandra

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  1. Properties of \sum
    • \overset {j}{\underset {i=1}{\sum}}2=2+2+\cdots to \quad j \quad terms=2j

    • \overset {k}{\underset {j=1}{\sum}}2j =2 \overset {k}{\underset {j=1}{\sum}}j

    • \overset {n}{\underset {k=1}{\sum}}(k^2 + k)=\overset {n}{\underset {k=1}{\sum}}k ^2 + \overset {n}{\underset {k=1}{\sum}}k


    • Odd number of numbers in A.P. whose sum is known may be taken as
      \cdots \alpha -2\beta, \alpha -\beta, \underline \alpha \quad \alpha +\beta, \alpha +2\beta \cdots
      go on \leftarrow \qquad \qquad \qquad \qquad \qquad \rightarrow go on
      subtracting \quad \beta \qquad \qquad \qquad adding \quad \beta


    • Even number of numbers in A.P. whose sum is known may be taken as
      \cdots \alpha -5\beta, \alpha-3\beta, \underline{\alpha -\beta, \alpha +\beta}, \alpha +3\beta, \alpha +5\beta,\cdots

      go on \leftarrow \qquad \qquad \qquad \qquad \qquad \rightarrow go on
      subtracting \quad 2\beta \qquad \qquad \qquad adding \quad 2\beta


    • When sum is given:
      1. Three numbers in A.P. may be taken as \alpha -\beta, \alpha, \alpha +\beta
      2. Four numbers in A.P. may be taken as \alpha -3\beta, \alpha -\beta, a + \beta, \alpha +3\beta
      3. Five numbers in A.P. may be taken as \alpha -2\beta, \alpha -\beta, \alpha, \alpha +\beta, \alpha +2\beta

    • Odd number of numbers in G.P. whose product is known may be taken as\cdots \cdots ,\frac {a}{r^2}.\frac {a}{r}, \underline a, ar, ar^2,\cdots
      go on \leftarrow \qquad \qquad \qquad \qquad \qquad \rightarrow go on
      dividing \quad by \quad r \qquad \qquad \qquad multiplying \quad by \quad r


    • Even number of numbers in G.P. whose product is known may be taken as
      \cdots ,\frac {a}{r^5}, \frac {a}{r^3}, \frac {a}{r}, ar, ar^3, ar^5 \cdots

      go on \leftarrow \qquad \qquad \qquad \qquad \rightarrow go on
      dividing \quad by \quad r^2 \qquad \qquad multiplying \quad by \quad r^2


    • When product is given:
      1. Three numbers in G.P. may be taken as \frac {a}{r}, a, ar
      2. Four numbers in G.P. may be taken as\frac {a}{r^3}, \frac {a}{r}, ar, ar^3
      3. Five numbers in G.P. may be taken as \frac{a}{r^2},\frac{a}{r},a,ar,ar^2
    • For A.P. :
      1. a,a+d,a+2d, \cdots ,b-2d,b-d,b go on adding d \leftarrow \quad \rightarrow go on subtracting d is an A.P. whose first term is a, last term is b and common difference is d.
      2. Sum of equidistant terms from beginning and end = constant = a + b
        = first term + last term
      3. If the same number is added to or subtracted from all the terms of an A.P., then the resulting sequence is also an A.P. with the same common difference as before.
      4. If all the terms of an A.P. with common difference d be multiplied (or divided) by the same number k, then the resulting sequence is also an A.P. with common difference kd\Big( or \frac {d}{k} \Big)
      1. A sequence is an A.P. iff its nth term is of the form an + b, where a, b are constants. The common difference of this A.P. is a (coefficient of n.)
      2. A sequence is an A.P. iff the sum of its first n terms is of the form an^2 + bn + c, where a, b, c are constants. The common difference of this A.P. is 2a (two times the coefficient of x ^2)


    • For G.P. :
      1. a,ar,ar^2,\cdots \frac {b}{r^2}, \frac {b}{r}, b
        go on multiplying by r \leftarrow \qquad \rightarrowgo on dividing by r
        is a G.P. whose first term is a, last term is b and common ratio is r
      2. The product of equidistant terms from the beginning and the end
        =constant=ab
        =first terms * last term


  4. Sum of different types of series:
    If all the terms of a G.P. with common ratio r be multiplied (or divided) by the same number k then the resulting sequence is also a G.P. having common ratiokr \Big( or \frac {r}{k} \big)
    1. When difference of terms of a series are in A.P. or G.P. t_n(n^{th} term)=t_1+[sum \quad to (n-1) terms of the series formed by difference of terms]
      and S_n=\overset {n}{\underset {n=1}{\sum}}t_n
    2. To find the sum of n terms of a series whose n^{th} term
      t_n= \frac {1}{(an+b)(cn+d)(pn+q)}=f(n)say
      Write down t_n = \frac {value \quad of (an+b)f(n)at \quad n = - b/a} {an+b}+\frac {value \quad of (cn+d)f(n)at \quad n=- \frac {d}{c}}{cn+d}
      + \frac {value \quad of (pn+q)f(n)at \quad n = - \frac{q}{p}}{pn+q}
      Put n=1,2,3,\cdots ,n and add.
    3. Sum of arithmetico-geometric series
      Let a+(a+d)r+(a+2d)r^2 +\cdots +[a+(n-1)d]r^{n-1} be the given arithmetico-geometric series
      Let S=a+(a+d)r+(a+2d)r^2 + \cdots + [a+(n-1)d]r^{n-1} \qquad \cdots (1)
      then rS=ar+(a+d)r^2+ \cdots +[a+(n-2)d]r^{n-1}+[a+(n-1)d]r^n \qquad \cdots (2)
      Subtracting (2) from (1)
      S=\frac {a}{1-r}+ \Big( r-\frac {r^n}{1-r} \Big) d- \frac {[a+(n-1)d]r^n}{1-r}
      where r \not = 1
    • If an A.P. and an H.P. have the same first term a, the same last term b and the same number of terms, then any term (r ^{th} term) of A.P. from beginning Ã- corresponding term (r ^{th} term) of H.P. from end

      =\Big( \frac {an+(r-1)b-ra}{n-1}\Big) .\Big( \frac {(n-1)ab}{na+(r-1)b-ra}\Big) =first \quad term * last \quad term=ab

      Explanation
      Required \quad product =\Big[a+(r-1)\frac{b-a}{n-1}\Big]. \frac {1}{\frac {1}{b}-(r-1)\frac {a-b}{(n-1)ab}}=\Big(\frac {an-a+(r-1)b-ra+a}{n-1}\Big)

      \Big[\frac {(n-1)ab}{na-a-ra+a+(r-1)b}\Big]


    • If from three numbers in H.P., half the middle term is subtracted, the resulting numbers are in G.P.
      Thus if a, b, c are in H.P., then

      a- \frac {b}{2},\frac {b}{2},c- \frac {b}{2} are in H.P.

      Explanation:
      \Bigg(a-\frac {b}{2}\Bigg)\Bigg(c-\frac {b}{2}\Bigg)=\Bigg(a-\frac{ac}{a+c}\Bigg)\Bigg(c-\frac {ac}{a+c}\Bigg)=\frac{a^2}{a+c}.\frac {c^2}{a+c}=\Bigg( \frac {ac}{a+c}\Bigg)^2 =\Bigg( \frac {b}{2}\Bigg)^2


    • If a_1,a_2,a_3, \cdots ,a_n are in H.P., then
      a_1a_2+a_2a_3+\cdots \cdots +a_{n-1}a_n=(n-1)a_1a_n

      Explanation:
      a_1a_2=\frac {1}{d}(a_1-a_2) \qquad \Big[ \therefore \frac {1}{a^2}-\frac {1}{a_1}=d \Big]
      a_2a_3=\frac {1}{d}(a_2-a_3)
      a_{n-1}a_n=\frac {1}{d}(a_{n-1}-a_n)
      Add and put d=\frac {a_1-a_n}{(n-1)a_1a_n}


  6. Inequality:
    • A.M., G.M., and H.M. of n positive numbers a_1,a_2,a_3,\cdots ,a_n are given by
      A=\frac {a_1+a_2+\cdots +a_n}{n}, G=(a_1a_2\cdots a_n)^{1/n} , H=\frac {n}{\frac {1}{a_1}+\frac {1}{a_2}+\cdots +\frac {1}{a_n}}


    • A \underline > G \underline > H , equality holds only when a_1=a_2=\cdots =a_n
      This result should be used when
      • All the numbers involved are positive.

      • Inequality occurs or maximum or minimum value is to be involved

      • Any two of sum of numbers, product of numbers and sum of reciprocals are to be involved.



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8 Comments

  1. ganithguru saidThu, 11 Dec 2008 13:35:54 -0000 ( Link )

    Both part I, II covers total concept, formulae. Harendran

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  2. pch saidFri, 26 Dec 2008 07:08:30 -0000 ( Link )

    very good

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  3. sugansundar saidFri, 09 Jan 2009 07:37:01 -0000 ( Link )

    Very useful

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  4. Rousan saidSun, 11 Jan 2009 03:50:34 -0000 ( Link )

    very helpful and very well prepared and thanks.

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  5. snehasubhash saidWed, 28 Jan 2009 13:02:02 -0000 ( Link )

    goood

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  6. esh saidSun, 15 Feb 2009 16:49:02 -0000 ( Link )

    awesum yaa..!!

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  7. Chandan Kkumar saidMon, 30 Mar 2009 19:04:00 -0000 ( Link )

    really nice and handy

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  8. gulshan11 saidThu, 17 Sep 2009 02:28:15 -0000 ( Link )

    Thanq But…...........How many parts are there?

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