Final answer:
The question asked for a function in point-slope form related to a laser's distance as a function of its bounces, but without specific details like a known point or slope, it's impossible to provide an exact function. Hypothetical information was used to demonstrate how a function might be constructed if such details were known.
Step-by-step explanation:
The question seems to need information to write a function in point-slope form that represents the relationship between a laser's distance traveled versus the number of bounces. To construct such a function, we need a known point (x1, y1) and the slope (m) of the relationship. The point-slope form equation is y - y1 = m(x - x1), where m is the slope and (x1, y1) is a point on the line.
However, given the context provided, additional details such as a known point on the graph or the slope of the laser's distance as a function of bounces are missing. Typically, the slope would be the rate at which the distance changes concerning the number of bounces, and a known point would be a specific instance where the number of bounces and the corresponding distance are known.
Without the necessary specifics, it is impossible to write an exact function. If more information were provided, say for example the laser bounces 5 times and travels a total of 50 cm after these bounces, and each bounce corresponds to an additional 10 cm traveled, we could use this to write the function. Then, if we hypothetically know that each bounce adds 10 cm, our slope (m) is 10, and let's use the 5 bounces and 50 cm as our known point (5, 50). The point-slope form of our function would be d - 50 = 10(b - 5), where d represents the total distance traveled and b represents the number of bounces.