Find the next three terms in the sequen
1. 30, 22, 14, 6...
-3, -12, -21
-1, -8, -15
-1, -2, 3
-2, -10, -18****
4. Find the first four terms of the sequence represented by the expression.
4. 3n+5
5,8,11,14
8,11,14,17
3,6,9,12
0,8,11,14
(idk about this one)^^^^^^^^^
Find the next three terms in the sequence.
5. -1,9,19,29,...
38, 37,32
40,51,62
39,49,59 ****
38,47,56
7. A gas station charges $2.19 per gallon of gas. Use function notation to describe the relationship between the total cost C(g) and the number of gallons purchased g.
C (g)=-2.19g
g=2.19C(g)
C(g)=g+2.19
C(g)=2.19g****
Identify the sequence as arithmetric, geometric, or neither. Explain your answer.
1.6,0.8,0.4,0.2,
For number 1, I am subtracting 8
I don't get number four.
Nevermind I got a 100
what where they sorry new to this website
Can anyone help and give the answers? I am suffering!!!!!!
To find the next three terms in a sequence, you need to identify the pattern or rule that governs the sequence.
1. In the given sequence 30, 22, 14, 6..., we are subtracting 8 from each term to get the next term. So the next three terms would be: -2, -10, -18.
4. The expression 3n + 5 represents a linear sequence, where n is the position in the sequence and 3 is the common difference between consecutive terms. By substituting the values of n, we can find the first four terms: 3(1) + 5 = 8, 3(2) + 5 = 11, 3(3) + 5 = 14, 3(4) + 5 = 17.
5. The sequence -1, 9, 19, 29... follows a pattern of adding 10 to each term. So the next three terms would be: 39, 49, 59.
7. The relationship between the total cost C(g) and the number of gallons purchased g can be described using function notation as C(g) = 2.19g. This means that the total cost C is equal to 2.19 multiplied by the number of gallons purchased g.
Identifying the sequence as arithmetic, geometric, or neither:
The sequence 1.6, 0.8, 0.4, 0.2... is a geometric sequence. In a geometric sequence, each term is obtained by multiplying the previous term by a fixed ratio. In this case, the common ratio is 0.5 (1.6 * 0.5 = 0.8, 0.8 * 0.5 = 0.4, and so on).