Mathematics
Grade5
Easy
Question
Find the pattern's rule.
23, 29, 35, 41
- Subtract 6
- Add 6
- Subtract 5
- Add 4
Hint:
In mathematics, a number pattern is a series of integers that occur in a specific order. Patterns often describe the inverse relationship between numbers. Patterns can also be used to describe numerical sequences. Here we have given a series of 23, 29, 35, 41 and we have to find the rule used for this pattern.
The correct answer is: Add 6
So as we know that a pattern or sequence in a series of numbers is called a number pattern. Generally, this pattern builds a connection between all integers.
Some numerological pattern types are:
There are two typical patterns for number sequences:
- Arithmetic Sequences
- Geometric Sequences
The following are some examples of Number Patterns' unique sequences:
- Square Numbers
- Cubic Sequence
- Triangular Numbers
- Fibonacci Numbers
We have been given the series 23, 29, 35, 41. The rule used in this is:
23 + 6 = 29
29 + 6 = 35
35 + 6 = 41
The difference between each number is 6. The rule for this pattern is that 6 is added to each previous term.
Here we were given a series of numbers and we have to find the rule used in the series. There are numerous different sorts of number patterns. They could be a series of even or odd numbers, multiples of a specific number, ascending or descending, etc. So the rule for this pattern is that 6 is added to each previous term.