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Geometric Sequences with Fractions
Geometric sequences with fractions, a pattern of fractions that are connected to code that is similar. Fractions are used which means that numbers divided by other numbers are used in a sequence that shows a similar code. The pattern can go up or down. It is a pattern between numbers. It is a pattern that follows a code and that code is present at each level. The geometric sequence starts from spot one and then it travels to other spots. How many times it travels forward or backward depends on how positions are in the sequence. Each position of a fraction is connected to each other. They are all connected by a code that binds them together. The code is usually the same in a geometric sequence, but sometimes the code adapts and changes based code within it. Some call it a code and others call it a math formula that connects the fractions. It shows the connection between the group of fractions standing next to each other.
An example of geometric sequence with fractions, would be 2/4 , 2/8, 2/16.This geometric sequence has a code that adapts as it moves to the next level. The code starts with a fraction that can be reduced to 1/2. Now as the fraction moves to the right, it multiplies the bottom denominator of the first reduced fraction which is 1/2. If you were to do the math, you would see the code multiplying the bottom number of each fraction by 2. It could be because the code started with 2 on the bottom and it wants to multiply the bottom by 2 to reach the next level. It does this every time. You will notice it if you look at the code long enough.
Every geometric sequence with a fraction has a code that binds them together. Sometimes the code is simple. Other times, the code is complicated and you might need a calculator to see it. But once you follow the code in the sequence, you will see where the equation is going. You will know if it is going up or down. You will know if it is going left or right. You will be able to see the geometric sequence’s future. You will be able to predict its next move.
Reference:
(2018). Geometric sequences with fractions. Retrieved from URL: http://www.emathematics.net/g5_fractions.php?def=geometric.
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