Solution
Question: How many values of N exist, such that (N^2 + 24 N +21) has exactly 3 factors?N is a natural no.
Solution:
We know that any square of a prime number, that is, a number of the form, (p^2) will always have Exactly 3 divisors, and they are, 1, p and (p^2). Hence we have to find a prime number or prime numbers (if it exists), say, 'a', such that:
N^2 + 24N + 21 = a^2
or, N^2 + 24N + {21 - (a^2)} = 0
Treating the above equation as a quadratic equation in N, and using Shridhacharya's Formula we have:
N = [ - 24 +- square root {(24^2) - 4(1){21 - (a^2)}]/{(2)(1)} ------------- (1)
Note: Shridharacharya's Method for finding the roots of a Quadratic Equation of the form Ax^2 + Bx + C = 0, is:
x = [ - B +- square root {(B^2) - 4(A)(C)}/{(2)(A)}]
On Simplification of expression (1), we have:
N = [ - 24 +- 2{square root {(a^2) + 123}]/2
or, N = - 12 +- square root{(a^2) + 123} ------------- (2)
Since it is given that N is a Natural Number, that is, a Positive Integer, that is, a Real Number, the Discriminant of the expression (2), that is, {(a^2) + 123} must be a perfect square.
Now, it cannot be equal to zero, since in that case, we will get: a^2 = - 123 and we know that the square of any quantity cannot be negative. Hence it has to be a perfect square greater than zero.
Now, let us suppose that (a^2) + 123 = (b^2) for some integer b.
Then, we have: (b^2) - (a^2) = 123
or, (b + a)(b - a) = 123
Now, the left hand side is a product of two factors, so we express the right hand side too as a product of two factors in all possible ways.
(b + a)(b - a) = 123 x 1 ------------- (3)
(b + a)(b - a) = 41 x 3 ------------- (4)
(b + a)(b - a) = 3 x 41 ------------- (5)
(b + a)(b - a) = 1 x 123 ------------- (6)
Now, let us analyse equation (3) first in the following manner:
When b + a = 123, b - a = 1
So, on solving, we get: b = 62 and a = 61 and accordingly, if we substitute the value of 'a' in equation (2), we get the values of N as: -74 and 50, but since N is a Natural Number, N cannot be - 74. Hence N = 50.
Now, Similarly, we can solve for 'a' and 'b' from equations (4), (5) and (6) and obtain the values of 'a' and 'b' as:
From equation (4): a = 19, b = 22, and therefore, we get N = -34 and 10
From equation (5): a = - 19, b = 22, and therefore, we get N = -34 and 10
From equation (6): a = - 61, b = 62, and therefore, we get N = -74 and 50
From the above values of N, we reject the negative ones, since N is a Natural Number and we consider the positive ones, thus getting N = 10 and 50, for which the corresponding values of the expression (N^2 + 24N + 21) are: 361, which is equal to (19^2) and 3721, which is equal to (61^2) and each of these have exactly 3 factors.
Hence there are exactly "Two" values of N (10 and 50) for which the expression (N^2 + 24N + 21) has exactly 3 factors.
Thank You.
Ravi Raja