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Question -

(i) How many terms are in A.P. 7, 10, 13,…43?

(ii) How many terms are there in the A.P. -1, -5/6, -2/3, -1/2, …, 10/3 ?



Answer -

(i) Given:

AP: 7, 10, 13,…

Here, a1 =a = 7, a2 = 10

Common difference, d =a2 – a1 = 10 – 7 = 3

We know, an =a + (n – 1) d [where a is first term or a1 and d is commondifference and n is any natural number]

an = 7+ (n – 1)3

= 7 + 3n – 3

= 3n + 4

To find total terms ofthe A.P., put an = 43 as 43 is last term of A.P.

3n + 4 = 43

3n = 43 – 4

3n = 39

n = 39/3

= 13

Hence, total 13 termsexists in the given A.P.

(ii) Given:

AP: -1, -5/6, -2/3,-1/2, …

Here, a1 =a = -1, a2 = -5/6

Common difference, d =a2 – a1

= -5/6 – (-1)

= -5/6 + 1

= (-5+6)/6

= 1/6

We know, an =a + (n – 1) d [where a is first term or a1 and d is commondifference and n is any natural number]

an =-1 + (n – 1) 1/6

= -1 + 1/6n – 1/6

= (-6-1)/6 + 1/6n

= -7/6 + 1/6n

To find total terms ofthe AP,

Put an =10/3 [Since, 10/3 is the last term of AP]

an =-7/6 + 1/6n = 10/3

1/6n = 10/3 + 7/6

1/6n = (20+7)/6

1/6n = 27/6

n = 27

Hence, total 27 termsexists in the given A.P.

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