28. Insert five numbers between 8 and 26 such that the resulting sequence is an A.P.

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Payal Gupta | Contributor-Level 10

9 months ago

28. Let A₁, A₂, A₃, A₄and A₅ be five numbers between 8 and 26.

So, the A.P is 8, A₁, A₂, A₃, A₄, A₅, 26. with n=7 terms.

Also, a = 8.

l=26, last term.

a+ (7 – 1)d=26

8+6d=26

6d=26 – 8

d= $\frac{18}{6}$

d=3

So,

A₁=a+d=8+3=11

A₂=a+2d=8+2 * 3=8+6=14

A₃=a+3d=8+3 * 3=8+9=17.

A₄=a+9d=8+4 * 3=8+12=20

A₅=a+5d=8+5 * 3=8+15=23.

Hence t

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1In an increasing arithmetic progression a₁, a₂,....a_n if a₅ = 2 and product of a₁, a₅ and a₄ is greatest, then the value of dis equal to

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a, ar, ar², ….ar⁶³

a+ar+ar² +….+ar⁶³ = 7 [a + ar² + ar⁴ +.+ar⁶²]

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$S_{15} - S_{5} = \frac{15}{2} [2 a + 14 d] - \frac{5}{2} [2 a + 4 d]$

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3, 7, 11, 15, 19, 23, 27, . 403 = AP₁

2, 5, 8, 11, 14, 17, 20, 23, . 401 = AP₂

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11, 23, 35, ., 395

->395 = 11 + (n – 1) 12

->395 – 11 = 12 (n – 1)

$\frac{384}{12} = n - 1$

32 = n – 1

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Sum = $\frac{33}{2}$ [2×11+ (32)12]

= $\frac{33}{2}$ [22 + 384]

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3, a, b, c are in A.P.

a – 3 = b – a

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