To determine the values of b that satisfy the expression 32b = 32 = 36 = b = b = b = …, we need to analyze the expression carefully. It seems like there is a bit of misunderstanding in the question, as the expression does not clearly define a mathematical equation. However, based on the components given, we can interpret it as follows:
- **Understanding the Components**: The expression features a linear equation involving b and constants.
- **Finding a Relation**: We can assume that you are looking for the scenario where 32b is equal to some constant (either 32 or 36). It can be split into two equations:
1. 32b = 32
2. 32b = 36
- **Solving the First Equation**: From 32b = 32, we can solve for b:
b = 32 / 32 = 1
- **Solving the Second Equation**: Next, for 32b = 36, we rearrange:
b = 36 / 32 = 1.125
- Thus, we find two specific values for b based on these assumptions: b = 1 and b = 1.125.
In conclusion, if we consider the interpretation of the expression to involve solving equations, the values of b that satisfy the conditions derived from 32b equating to 32 or 36 are 1 and 1.125. If the question intended for a different analytical approach or a specific format, please provide more clarity for a more precise answer.