SAI International School

                                                         Class X

               Mathematics – Lesson Notes
               Chapter-5: Arithmetic Progression



                                th
               Sub topics: n  term of A.P.

               GENERAL FORM-

               Let us denote the first term of an AP by a 1 , second term by a 2 , . . ., nth term by a n and
               the common difference by d.

               Then the AP becomes a 1 , a 2 , a 3 , . . ., a n .

               So, a 2 – a 1 = a 3 – a 2 = . . . = a n – a n–1 = d

               a, a + d, a + 2d, a + 3d, . . . represents an arithmetic progression where a is the first
               term and d the common difference. This is called the general form of an AP.

               For example-

               a = – 7, d = – 2, the AP is – 7, – 9, – 11, – 13, . . .

               a = 1.0, d = 0.1, the AP is 1.0, 1.1, 1.2, 1.3, . . .

               a = 0, d =   , the AP is 0,    , 3,    , 6, . . .


               a = 2, d = 0, the AP is 2, 2, 2, 2, . . .



               In an AP, every succeeding term is obtained by adding d to the preceding term. So, d
               found by subtracting any term from its succeeding term, i.e., the term which immediately
               follows it should be same for an AP.



               For the list of numbers :

                                                       6, 3, 0, – 3, . . .,

                                                       a 2 – a 1 = 3 – 6 = – 3
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