All GED Math Resources
Example Questions
Example Question #181 : Numbers
What is the next number in the following sequence?
Begin by considering how much the numbers change between each set of values. The following places the change in brackets:
You can guess that the next change will be by . Therefore, the next value in the sequence will be or .
Example Question #182 : Numbers
Fill in the missing value in the following sequence:
Cannot be determined based on the information provided
Start by filling in the changes that happen from number to number in the sequence. This is done below in brackets:
Now, you know that
Thus, you know that the sequence will continue after by subtracting . Thus, the missing value is .
Example Question #181 : Numbers
What number belongs in the question mark?
Notice that the numbers are increasing by 6 every time.
Add 6 to the end of the last number to obtain the number in the question mark.
The answer is:
Example Question #2042 : Ged Math
If the first and second terms of an arithmetic sequence are and , respectively, what is the fourth term of the sequence?
Recall that in an arithmetic sequence, the difference between terms is constant. From the given first and second terms, we see that the sequence is increasing by for each term. Thus, the third term must be , and the fourth term must be .
Example Question #12 : Patterns And Sequences
Give the next number in the sequence:
To generate the sequence, begin with 4, then alternately multiply by 3 and add 2:
The next entry:
,
the correct choice.
Example Question #182 : Numbers
Find the missing number in the sequence:
Find the missing number in the sequence:
We have a sequence where each term is a multiple of the previous term. This is known as a geometric series.
We need to find the common multiple, and then use it to find our second term. To find the common multiple, divide any term by its previous term.
ex)
So, our common multiple is 7. Use this to find our second term.
So, our answer is 49
Example Question #22 : Patterns And Sequences
Find the missing term in the following arithmetic series:
Find the missing term in the following arithmetic series:
An arithmetic series is one in which the next term is found by adding a constant number to the previous term. This is called the common difference.
First, we need to find the common difference. Do so by subtracting any term from its following term.
Note that it doesn't matter which pair of consecutive terms we choose, just so long as we subtract the smaller from the larger.
So, our common difference is 13. Thus, our answer can be found via the following:
So our answer is 44
Example Question #184 : Numbers
The first term of an arithmetic sequence is . If the second term is , and the third term is , what is the tenth term of the sequence?
Recall that in an arithmetic sequence, we will be adding or subtracting the same number to get each successive term.
We can tell that the terms are decreasing by each time. Thus, we can make a table to figure out the tenth term.
The tenth term is .
Example Question #182 : Numbers
If the first three terms of an arithmetic sequence are 5, 12, and 19, what is the fifth term of the sequence?
Recall that in an arithmetic sequence, you will be adding or subtracting by a certain number to get the subsequent values in the sequence.
From the given numbers, you should notice that the sequence is increasing by every time. Thus, the fourth number in the sequence should be . The fifth number in the sequence must be .
Example Question #183 : Numbers
Find the next number in the sequence:
1, -1, 3, -5, 11, -21, ...
The pattern of the sequence is .
Therefore,