Final answer:
To solve the simultaneous equations 4/p + 8/q = 44 and 8/p + 5/q = 66, algebraic techniques such as substitution or elimination can be used. Once one variable is found, it is substituted back into one of the original equations to find the other variable.
Step-by-step explanation:
The question involves solving a system of simultaneous equations, which is a mathematical process. Given the equations 4/p + 8/q = 44 and 8/p + 5/q = 66, we need to find the values of p and q. We can solve these equations using algebraic techniques such as substitution or elimination.
Although the provided reference information about demand and supply curve equations (Qd, Qs, P) and probability calculation for event F is interesting, it is not directly relevant to solving the problem at hand. Therefore, we will solely focus on the given simultaneous equations.
To solve the simultaneous equations, one approach could be to multiply the first equation by 8 and the second equation by 4, allowing us to eliminate one of the variables by subtracting one equation from the other. Another approach could be expressing p in terms of q or vice versa and then substituting into one of the equations. After finding one variable, we plug that value into one of the original equations to find the other variable.