Answer:
38
Step-by-step explanation:
One is given the following information;
(p) and (q) are whole numbers
(p)*(q) = 37
One is asked to find the value of ((p) + (q))
A whole number is an integer greater than or equal to (0). In essence, this refers to the following set of numbers: (0, 1, 2, 3, 4, 5 ...).
The value (37) is prime, this means that its only whole factors are (1) and (37), as ((1) * (37) = (37)). Therefore (p = 1, or p = 37) and (q = 37 or q = 1).
Using this property, one can conclude the follwing statement;
p + q = 38
Since that equation would translate into the following numerical equation;
1 + 37 = 38
Alternatively,
37 + 1 = 38
