Final Answer:
In this case, the fifth term in the sequence has 197 dots. To find this, the dots from each term must be counted, starting from the first. The first term has 5 dots, the second has 10, the third has 15, the fourth has 20, and the fifth has 197. Therefore, the fifth term in the sequence has 197 dots.
Explanation:
A sequence is an ordered list of numbers, symbols, or objects. A sequence is usually denoted by a variable such as n, and each term in the sequence is given by a formula which tells how to calculate the next term from the previous one. When a sequence is given with specific numbers, it is possible to determine which term has the number of dots specified. This is done by counting the dots in each term of the sequence, starting with the first term and working towards the last one.
In this case, the fifth term in the sequence has 197 dots. To find this, the dots from each term must be counted, starting from the first. The first term has 5 dots, the second has 10, the third has 15, the fourth has 20, and the fifth has 197. Therefore, the fifth term in the sequence has 197 dots.
It is important to note that the number of dots in each term of the sequence is determined by the formula given for the sequence. In this case, the formula is a simple linear function, where the number of dots increases by 5 with each term. This formula can be used to calculate the exact number of dots for any term in the sequence.