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What is the next sequence of cubes 1 8 27 64?
The next one is 125.
Which number is next in the sequence 1 8 27 64?
125 (the sequence is successive numbers cubed)
What is the nth term for sequence 3 12 27 64 75 108?
There is no pattern
What comes next- 1 8 27 64?
The sequence given consists of the cubes of consecutive integers: (1^3 = 1), (2^3 = 8), (3^3 = 27), and (4^3 = 64). Therefore, the next number in the sequence is (5^3 = 125).
What is the next number in the sequence 1-8-27-125-216?
Your sequence seems to be a cubed sequence, but you are missing 64 between 27 and 125.13 = 123 = 833 = 2743 = 6453 = 12563 = 216So, next would be 73, which equals 343.
What is the next sequence of cubes 1 8 27 64?
The next one is 125.
Which number is next in the sequence 1 8 27 64?
125 (the sequence is successive numbers cubed)
What are the next two terms to the sequence 1 8 27 64 125?
1 8 27 64 125 216 343
What is the nth term of the sequence of 1 8 27 64 125?
n3
The next number in the sequence 1-8-27?
64. It's the sequence f(n) = n^3
What is the next number in this sequence 1 8 27 64 125 216?
343.
What is the nth term for sequence 3 12 27 64 75 108?
There is no pattern
What comes next- 1 8 27 64?
The sequence given consists of the cubes of consecutive integers: (1^3 = 1), (2^3 = 8), (3^3 = 27), and (4^3 = 64). Therefore, the next number in the sequence is (5^3 = 125).
What is the next number in the sequence 1-8-27-125-216?
Your sequence seems to be a cubed sequence, but you are missing 64 between 27 and 125.13 = 123 = 833 = 2743 = 6453 = 12563 = 216So, next would be 73, which equals 343.
What is 1 8 27 64 of inductive reasoning?
The sequence 1, 8, 27, 64 consists of perfect cubes: (1^3), (2^3), (3^3), and (4^3). Using inductive reasoning, one might predict that the next number in the sequence will be (5^3), which is 125. This approach relies on identifying a pattern in the existing numbers and projecting that pattern forward. Thus, the next term in the sequence would be 125.
What is the conjecture of -1 -8 -27 -64?
The sequence -1, -8, -27, -64 consists of negative perfect cubes: specifically, -1 is (-1^3), -8 is (-2^3), -27 is (-3^3), and -64 is (-4^3). The conjecture suggests that the next term in the sequence would be (-125), which is (-5^3). Thus, the pattern follows the form of (-n^3) for (n = 1, 2, 3, 4, ...).
What comes after 1 8 27?
The pattern for the nth term is n3. Therefore, the fourth term in the sequence is equal to 43 = 64.
