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Three numeric series are given as follows. Series 1): 18, 73, 368, 2213, 15498 Series 2): 4, a, b, c, d Series 3): p, q, r, s, t If it is mentioned that all the above three series follow the same pattern and [(b/2) + 4] = q, then what will be the difference between “q” and “s”?

Three numeric series are given as follows. Series 1): 18, 73, 368, 2213, 15498 Series 2): 4, a, b, c, d Series 3): p, q, r, s, t If it is mentioned that all the above three series follow the same pattern and [(b/2) + 4] = q, then what will be the difference between “q” and “s”? Correct Answer 1415

Calculation:

Considering the given series 1

18, 73, 368, 2213, 15498

The logic of the given series can be explained as

(18 × 4) + 1 = 73

(73 × 5) + 3 = 368

(368 × 6) + 5 = 2213

(2213 × 7) + 7 = 15498

As given that all three series follow the same pattern, consider the given series 2

4, a, b, c, d

a = ?

(4 × 4) + 1 = 17

b = ?

(17 × 5) + 3 = 88

c = ?

(88 × 6) + 5 = 533

d = ?

(533 × 7) + 7 = 3738

Considering the given series 3

p, q, r, s, t

As given (b/2) + 4 = q

q = (88/2) + 4

⇒ 48

p, 48, r, s, t

r = ?

(48 × 5) + 3 = 243

s = ?

(243 × 6) + 5 = 1463

Now (s – q)

⇒ 1463 – 48

⇒ 1415

∴ Difference between “q” and “s” is 1415

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