Answer :
Final answer:
The given sequence follows the pattern of dividing each term by 3. To continue the pattern, divide the last term by 3. Four terms of a different pattern can also be written by starting with a different initial term and dividing it by 3.
Explanation:
The given sequence follows the pattern of dividing each term by 3. To continue the pattern, we divide the last term, 9, by 3 to get the next term. 9 ÷ 3 = 3.
Therefore, the next term would be 3.
To write 4 terms of a different pattern that follows the same rule, we can start with a different initial term. Let's start with 81 and divide it by 3 to get the next term. 81 ÷ 3 = 27. Continuing this pattern, the next terms would be 9, 3, and 1.
Learn more about Continuing a pattern using the rule 'Divide by 3' here:
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The pattern involves dividing each number by 3 to get the next number. Continuing the original sequence, the next term is 3. A new pattern could be 81, 27, 9, 3, which also follows the divide by 3 rule.
The pattern given in the question is a sequence of numbers where each number is divided by 3 to get the next number. Continuing the pattern, we would divide each subsequent number by 3 to determine the following numbers.
For the sequence 729, 243, 81, 27, 9, dividing 9 by 3 gives us:
- 9 / 3 = 3
To create a new pattern following the same rule of divide by 3, we can simply start with a different number. For instance, if we start with 81:
- 81 / 3 = 27
- 27 / 3 = 9
- 9 / 3 = 3
- 3 / 3 = 1
Therefore, the first four terms of this new pattern are 81, 27, 9, and 3.