The formula for the nth term of an arithmetic progression is a + (n - 1)d, where a is the first term and d is the common difference.

First, we need to find the common difference. We know the 4th term (a + 3d) is 7 and the 17th term (a + 16d) is 72.

Subtract the 4th term from the 17th term to get:

72 - 7 = (a + 16d) - (a + 3d)
65 = 13d
d = 65 / 13
d = 5

Now that we know the common difference, we can find the first term (a) by rearranging the formula for the 4th term:

7 = a + 3d
7 = a + 3*5
7 = a + 15
a = 7 - 15
a = -8

Now we can find the 10th term using the formula a + (n - 1)d:

10th term = a + (10 - 1)d
10th term = -8 + 9*5
10th term = -8 + 45
10th term = 37

So, the 10th term of the arithmetic progression is 37 (option d).

Question

The formula for the nth term of an arithmetic progression is a + (n - 1)d, where a is the first term and d is the common difference.

First, we need to find the common difference. We know the 4th term (a + 3d) is 7 and the 17th term (a + 16d) is 72.

Subtract the 4th term from the 17th term to get:

72 - 7 = (a + 16d) - (a + 3d)
65 = 13d
d = 65 / 13
d = 5

Now that we know the common difference, we can find the first term (a) by rearranging the formula for the 4th term:

7 = a + 3d
7 = a + 3*5
7 = a + 15
a = 7 - 15
a = -8

Now we can find the 10th term using the formula a + (n - 1)d:

10th term = a + (10 - 1)d
10th term = -8 + 9*5
10th term = -8 + 45
10th term = 37

So, the 10th term of the arithmetic progression is 37 (option d).

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