Finding the Nth Term Arithmetic Sequence

To find the 5th term of the arithmetic sequence, use the formula: a_n = a_1 + (n-1)d. Here, a_1 = 7, d = 4, and n = 5. Thus, a_5 = 7 + (5-1)4 = 7 + 16 = 23. The correct answer is 23.

In the sequence, the nth term can be found using the formula: a_n = 1 + (n-1) * 4. Setting a_n = 41, we solve: 41 = 1 + (n-1) * 4, leading to n = 11. Thus, the 11th term is 41.

The sequence decreases by 4 each time. Starting from 4: 4 (1st), 0 (2nd), -4 (3rd), -8 (4th), and -12 (5th). Thus, the 5th term is -12.

The common difference in the sequence is 0.6 (7.2 - 6.6). To find the 5th term, add 0.6 four times to the first term: 6.6 + 4(0.6) = 6.6 + 2.4 = 9. Thus, the 5th term is 9.

The sequence increases by 5 each time. Starting from 14, the 6th term is 14 + 5*5 = 39. Thus, the correct answer is 39.

The sequence decreases by 7 each time. Starting from -15, the 6th term is calculated as -15 + 5*(-7) = -15 - 35 = -50. Thus, the 6th term is -50.

In an arithmetic sequence, the nth term is given by the formula: a_n = a_1 + (n-1)d. Here, a_5 = a_1 + 4(3) = -1. Solving for a_1 gives a_1 = -1 - 12 = -13. Thus, the first term is -13.

In an arithmetic sequence, the nth term is given by a_n = a + (n-1)d. We have a_5 = a + 4d = -1 and a_10 = a + 9d = 14. Solving these equations, we find a = -13. Thus, the first term is -13.

In an arithmetic sequence, the nth term is given by a_n = a + (n-1)d. Here, a_5 = a + 4d = 16 and a_7 = a + 6d = 20. Subtracting these gives 2d = 4, so d = 2. Substituting d back, a + 8 = 16, thus a = 8.

In an arithmetic sequence, the nth term can be expressed as a_n = a_1 + (n-1)d. Given a_8 = -27 and a_15 = -55, we can find d. Solving gives d = -4. Thus, a_11 = a_8 + 3d = -27 + 3(-4) = -39.