Let p be the greatest number of 4-digits which when divided by 21, 22, 24 and 28, the remainder in each case is 8. What is the sum of the digits of p ?

Given:

p is the greatest 4-digit number.

When p is divided by 21, 22, 24, and 28, the remainder in each case is 8.

Calculation:

Prime factorization of 21 = 3 × 7

Prime factorization of 22 = 2 × 11

Prime factorization of 24 = 2³ × 3

Prime factorization of 28 = 2² × 7

LCM(21, 22, 24, 28) = 2³ × 3 × 7 × 11

= 8 × 3 × 7 × 11 = 1848

Now, we need to find the greatest 4-digit number which is of the form 1848 k + 8.

The greatest 4-digit number is 9999.

We need to find the largest 'k' such that 1848k + 8 ≤ 9999

⇒ 1848k ≤ 9999 - 8

⇒ 1848k ≤ 9991

⇒ k ≤ 9991 / 1848

⇒ k ≤ 5.406...

Since k must be an integer, the greatest possible value for k is 5.

Now, substitute k = 5 into the expression for p:

p = 1848 × 5 + 8

⇒ p = 9240 + 8

⇒ p = 9248

Sum of digits of p = 9 + 2 + 4 + 8 = 23

∴ The correct answer is option 4.