Sum of first 7 terms of an A.P., S₇ = 63.

And sum of next 7 terms is 161.

So, the sum of first 14 terms, S₁₄ = Sum of first 7 terms + Sum of next 7 terms

S₁₄ = 63 + 161 = 224

By using the formula of the sum of n terms of an A.P.

S_n = n[2a + (n − 1)d] / 2.

So, S₇ = 7(2a + (7 − 1)d) / 2

=> 7(2a + 6d) / 2 = 63

=> 2a + 6d = 18 . . . . (1)

Also, S₁₄ = 14(2a + (14 − 1)d) / 2

=> 14(2a+13d)/2 = 224

=> 2a+13d = 32  . . . . (2)

Now, subtracting eq(1) from eq(2), we get

=> 13d – 6d = 32 – 18

=> 7d = 14

=> d = 2

On putting d = 2 in eq(1), we get,

=> 2a + 6(2) = 18

=> 2a = 18 – 12

=> a = 3

Thus, a₂₈ = a + (28 – 1)d = 3 + 27 (2) = 3 + 54 = 57

Hence, the 28th term is 57.