Answer:
PREMISES
S=2, 4, 8, 16, 32, 64,…
An abbreviated sequence S shows a pattern from left to right where the terms grow by powers of 2
ALGORITHM
a(n)=2^n, where n=any nth ordinal term in the sequence and 2=a constant base
PATTERN
(1) 2^1=2
(2) 2^2=4
(3) 2^3=8
(4) 2^4=16
(5) 2^5=32
(6) 2^6=64
(7) 2^7=128
(8) 2^8=256
(9) 2^9=512
(10) 2^10=1024
(50) 2^50=1.125899907E +15 in scientific/engineering notation=1,125,899,907,000,000 (1 quadrillion, 125 trillion, 899 billion, 907 million)
and so on
C.H.
Copyright © 2024 EHUB.TIPS team's - All rights reserved.
Answers & Comments
Answer:
PREMISES
S=2, 4, 8, 16, 32, 64,…
An abbreviated sequence S shows a pattern from left to right where the terms grow by powers of 2
ALGORITHM
a(n)=2^n, where n=any nth ordinal term in the sequence and 2=a constant base
PATTERN
(1) 2^1=2
(2) 2^2=4
(3) 2^3=8
(4) 2^4=16
(5) 2^5=32
(6) 2^6=64
(7) 2^7=128
(8) 2^8=256
(9) 2^9=512
(10) 2^10=1024
(50) 2^50=1.125899907E +15 in scientific/engineering notation=1,125,899,907,000,000 (1 quadrillion, 125 trillion, 899 billion, 907 million)
and so on
C.H.