Final answer:
To determine if a tree frog can jump over a 2 feet high log, we need the specific parabolic equation of the frog's jump. The vertex of the parabola represents the maximum height of the jump, and if this value is more than 2 feet, the frog can clear the log. Without the specific equation, one could infer the ability based on the fact that some frogs can jump exceptionally high distances.
Step-by-step explanation:
To determine whether a tree frog can jump over a log that is 2 feet high, we need to analyze the equation provided for the parabolic path of the frog's jump. Unfortunately, the original equation wasn't included in the question, so we'll use the general form of the equation for a projectile's motion: y = ax^2 + bx + c, where y represents height, and x represents horizontal distance. The highest point the frog can reach, or the apex of the parabola, will determine if it can clear the log.
For a parabolic trajectory, the vertex form of the equation y = a(x-h)^2 + k can provide us the maximum height the frog can achieve, where (h, k) is the vertex of the parabola. If k is greater than 2 feet, the frog can jump over the log. Without the specific equation given, we can refer to the general fact that some frogs can jump up to 20 times their own body length, suggesting they may be capable of jumping over a 2 feet high obstacle, depending on the species.
To answer the student's question, we'd need the specific parabolic equation to perform the calculations and confirm the frog's ability to jump over the log.