With a $200 budget, $50 per book for The Three-Body Problem and $100 per book for Galactic Empires, the optimal allocation for maximum utility (U = TG) is to buy 2 books of The Three-Body Problem and 1 book of Galactic Empires.
To maximize your utility function U = TG with a budget constraint, you want to allocate your budget in a way that maximizes the product of T and G.
Let's denote:
- x as the number of books of The Three-Body Problem (T)
- y as the number of books of Galactic Empires (G)
The total cost of books is given by the budget constraint:
![\[50x + 100y \leq 200\]](https://img.qammunity.org/2021/formulas/business/college/46vaujjj1yf0glt838ojtn6sw9yu03ow4o.png)
To maximize U = TG, you want to maximize the product xy.
Now, let's set up the problem:
Objective function: U = xy
Subject to the constraint:
To simplify, you can rewrite the constraint as:
![\[ x + 2y \leq 4 \]](https://img.qammunity.org/2021/formulas/business/college/l3zx1fz37nhyrk8x2xdulexjj1zvw4m9u1.png)
Now, you need to find the values of x and y that satisfy this constraint and maximize U.
Since your utility function is U = TG, you want to allocate your budget in a way that maximizes the product of the number of books from each series.
Given the constraint
, let's consider some possible solutions:
1. If you buy 2 books of The Three-Body Problem (x = 2), then
, and you can buy one book of Galactic Empires (y = 1).
2. If you buy 4 books of The Three-Body Problem (x = 4), then
, and you cannot buy any books of Galactic Empires.
So, it seems that the maximum utility is achieved when you buy 2 books of The Three-Body Problem and 1 book of Galactic Empires.
Therefore, you would consume 2 books of The Three-Body Problem.