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# What is the rule in this number sequence 3 6 12 24?

## What is the rule in this number sequence 3 6 12 24?

The nth time period of the sequence may also be solved using the system an=3⋅2n−1 a n = 3 ⋅ 2 n − 1 . To elaborate, the sequence 3, 6, 12, 24, is a…

### What is the next term in the geometric sequence beneath 3 6 12 24?

Answer: Value of tenth time period of the geometric sequence is 1536.

(*3*)

**What is the subsequent term of the sequence 6 12/24 Forty eight answer?**

2 Answers By Expert Tutors The pattern is to multiply a term by -2 to get the next time period. So the solution is 96 and -192.

**What type of sequence is 6 12 24?**

geometric sequence

This is a geometrical sequence since there is a not unusual ratio between each and every time period. In this case, multiplying the earlier time period in the sequence by way of 2 gives the next time period. In other phrases, an=a1⋅rn−1 a n = a 1 ⋅ r n – 1 . This is the type of a geometrical sequence.

## What is the commonplace ratio of the sequence 3 6 12 24?

Explanation: In a geometrical sequence commonplace ratio is the ratio between a time period and its preceding term and is at all times constant. 126=2 and 2412=2 . Hence not unusual ratio is 2 .

### What is the not unusual ratio of the geometric sequence 3 6 12 24?

**What is the common ratio in the geometric sequence 6 12 24 48?**

Without fixing, it can be seen that the quotient of 12 and 6, 24 and 12, and 48 and 24, is 2. Therefore the not unusual ratio is 2.

**What is the sequence of 3/6 12/24 an mathematics or not arithmetic?**

Answer and Explanation: No, 3, 6, 12, 24, . . . is not an mathematics sequence.

## What is the commonplace ratio of the sequence 6 12 24 48?

### What is the not unusual ratio?

The commonplace ratio is the amount between each number in a geometric sequence. It is known as the commonplace ratio because it is the same to each and every number, or not unusual, and it additionally is the ratio between two consecutive numbers in the sequence. For instance, what is the common ratio in the following sequence of numbers?

**What is the ratio in a geometrical sequence?**

A geometrical sequence is one in which any term divided by the earlier time period is a continuing. This constant is called the common ratio of the sequence. The commonplace ratio can also be discovered by way of dividing any time period in the sequence by means of the earlier time period.

**What is the next term of the geometric sequence 2 6 18?**

(*6*)

Geometric Sequence: 2,6,18,…,118098. Hence, 118098 is the 11thterm.

## What is the subsequent time period of 18 6 2 Brainly?

Step-by-step rationalization: You divide every number by means of 3 and the next time period will be 2/3.

### What is the common ratio of the sequence 6 12 24?

The common ratio of the terms is equivalent to at least one:2.

**What is the next time period of the geometric sequence 3 6 12?**

Determining the Next Term of the Geometric Sequence Now, to resolve the subsequent time period of the geometric sequence 3, 6, 12, 24, we need to to find their common ratio first by dividing the consecutive terms in the sequence. Therefore, the common ratio is 2. To to find the next phrases, we simply need to multiply the ultimate time period by way of 2.

**What is the commonplace ratio of the geometric sequence 6 12 24?**

## Is the sequence geometric 2?

A geometrical sequence (also known as a geometric development) is a sequence of numbers in which the ratio of consecutive phrases is all the time the same. For instance, in the geometric sequence 2, 6, 18, 54, 162, …, the ratio is all the time 3. This is known as the common ratio.