## What will come in place of question mark (?) In the following series 2 3 6 15 42?

Hence, “123” is the correct answer.

**How do you find the next two terms of an arithmetic sequence?**

The difference between each term is constant, thus the sequence is an arithmetic sequence. Simply find the difference between each term, and add it to the last term to find the next term.

**What comes next in patterns?**

In either case, the resulting image is the same, and five squares were added to the pattern. The same principles can be used to fill in the blanks if a term in a pattern is missing. Fill in the missing number x in the following pattern: 1 , 4 , 9 , x , 25 , 36 , … 1,4,9,x,25,36,\ldots 1,4,9,x,25,36,….

### What are the next three terms in the sequence 3 6 9?

3, 6, 9, 12, … =3*1, 3*2, 3*3, 3*4, … So the next three terms are 3*5=15, 3*6=18, 3*7=21. The general formula of this sequence is a_n=3*n, n=1, 2, 3 …

**What is the next number in the sequence after 15+3^(3)?**

The next number in the sequence is in the increasing order of the power of 3 as follows 15 + 3 ^ (3) = 15 + 27 = 42. Hence the answer is 42. Hope this helps. The difference between 2 and 3 is 1 i.e. 3 0. The difference between 3 and 6 is 3 i.e. 3 1. The difference between 6 and 15 is 9 i.e. 3 2.

**What is the difference between 3 and 6 and 15?**

The difference between 3 and 6 is 3 i.e. 3 1. The difference between 6 and 15 is 9 i.e. 3 2. Let the next number in the given sequence be some natural number x. Now, following the pattern, the difference between 15 and x has to be equal to 3 3 = 27. The next number in the sequence is 42. What does Google know about me?

## What is 15 + 3 ^(3) = 42?

15 + 3 ^ (3) = 15 + 27 = 42. Hence the answer is 42. Hope this helps. The difference between 2 and 3 is 1 i.e. 3 0. The difference between 3 and 6 is 3 i.e. 3 1. The difference between 6 and 15 is 9 i.e. 3 2. Let the next number in the given sequence be some natural number x.

**What is the difference between the consecutive terms of the sequence?**

Difference of consecutive terms are 1,3,9…, which is in Geometric Progression with common multiplier 3. Next term of this GP is 9×3=27. So the difference between next number and last number (15) of the original sequence is 27.