Question
a horse trainer has 42 horse treats she needs five treats per horse which equation shows the numver of horses H that she can train is the solution viable or nonviable 5h = 42 so h = 8.4 which is viable or 5h = 42 so h = 8.4 which is not viable
Answers
GPT-4o mini
The equation \(5h = 42\) represents the total number of treats used per horse. To find the number of horses \(h\) that can be trained with 42 treats, you solve for \(h\):
\[
h = \frac{42}{5} = 8.4
\]
Since \(h\) represents the number of horses, it must be a whole number because you cannot train a fraction of a horse. Therefore, having \(h = 8.4\) is not a viable solution in this context.
In conclusion, the equation \(5h = 42\) shows that the maximum number of complete horses that can be trained is 8, which is viable, but 8.4 is not. Thus, the solution is nonviable because you cannot train a fraction of a horse.
\[
h = \frac{42}{5} = 8.4
\]
Since \(h\) represents the number of horses, it must be a whole number because you cannot train a fraction of a horse. Therefore, having \(h = 8.4\) is not a viable solution in this context.
In conclusion, the equation \(5h = 42\) shows that the maximum number of complete horses that can be trained is 8, which is viable, but 8.4 is not. Thus, the solution is nonviable because you cannot train a fraction of a horse.