Let b1, b2, ................ be a geometric sequence such that b1 + b2 = a and Σ bi = 2. Given that b? < 0, then the value of b1 is :
Let b1, b2, ................ be a geometric sequence such that b1 + b2 = a and Σ bi = 2. Given that b? < 0, then the value of b1 is :
Option 1 -
2-√2
Option 2 -
1+√2
Option 3 -
2+√2
Option 4 -
4+√2
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1 Answer
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Correct Option - 3
Detailed Solution:b? , b? , b?
a, ar, ar².
a + ar = 1 ⇒ a = 1 / (1+r)Σ (from k=1 to ∞) b? = 2 ⇒ a / (1-r) = 2
(1 / (1+r) / (1-r) = 2
1 / (1-r²) = 2
1/2 = 1 - r²
r² = 1/2 ⇒ r = ±1/√2b? < 0 ⇒ r = -1/√2
⇒ a = b? = 2 + √2
Similar Questions for you
First term = a
Common difference = d
Given: a + 5d = 2 . (1)
Product (P) = (a1a5a4) = a (a + 4d) (a + 3d)
Using (1)
P = (2 – 5d) (2 – d) (2 – 2d)
-> = (2 – 5d) (2 –d) (– 2) + (2 – 5d) (2 – 2d) (– 1) + (– 5) (2 – d) (2 – 2d)
= –2 [ (d – 2) (5d – 2) + (d – 1) (5d – 2) + (d – 1) (5d – 2) + 5 (d – 1) (d – 2)]
= –2 [15d2 – 34d + 16]
at
-> d = 1.6
a, ar, ar2, ….ar63
a+ar+ar2 +….+ar63 = 7 [a + ar2 + ar4 +.+ar62]
1 + r = 7
r = 6
S20 = [2a + 19d] = 790
2a + 19d = 79 . (1)
2a + 9d = 29 . (2)
from (1) and (2) a = –8, d = 5
= 405 – 10
= 395
3, 7, 11, 15, 19, 23, 27, . 403 = AP1
2, 5, 8, 11, 14, 17, 20, 23, . 401 = AP2
so common terms A.P.
11, 23, 35, ., 395
->395 = 11 + (n – 1) 12
->395 – 11 = 12 (n – 1)
32 = n – 1
n = 33
Sum =
=
= 6699
3, a, b, c are in A.P.
a – 3 = b – a (common diff.)
2a = b + 3
and 3, a – 1, b + 1 are in G.P.
a2 + 1 – 2a = 3b + 3
a2 – 8a + 7 = 0 &n
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