Question
A horse trainer has 42 horse treats. She needs five treats per horse. Which equation shows the number of horses, h, that she can train, and is the solution viable or nonviable?(1 point)
Responses
5h=42, so h=8.4 horses, which is nonviable.
5 h equals 42 , so h equals 8.4 horses, which is nonviable.
5h=42, so h=8.4 horses, which is viable.
5 h equals 42 , so h equals 8.4 horses, which is viable.
h−5=42, so h=47, which is not viable.
h minus 5 equals 42 , so h equals 47 , which is not viable.
h5=42, so h=210, which is nonviable.
Start Fraction h over 5 End Fraction equals 42 , so h equals 210 , which is nonviable.
Responses
5h=42, so h=8.4 horses, which is nonviable.
5 h equals 42 , so h equals 8.4 horses, which is nonviable.
5h=42, so h=8.4 horses, which is viable.
5 h equals 42 , so h equals 8.4 horses, which is viable.
h−5=42, so h=47, which is not viable.
h minus 5 equals 42 , so h equals 47 , which is not viable.
h5=42, so h=210, which is nonviable.
Start Fraction h over 5 End Fraction equals 42 , so h equals 210 , which is nonviable.
Answers
GPT-4o mini
The correct equation to express the relationship between the number of horses, \( h \), and the number of treats is:
\[ 5h = 42 \]
From this equation, to find \( h \):
\[
h = \frac{42}{5} = 8.4
\]
Since the trainer cannot train a fraction of a horse, \( h = 8.4 \) horses is indeed nonviable.
Therefore, the appropriate response would be:
**5h=42, so h=8.4 horses, which is nonviable.**
\[ 5h = 42 \]
From this equation, to find \( h \):
\[
h = \frac{42}{5} = 8.4
\]
Since the trainer cannot train a fraction of a horse, \( h = 8.4 \) horses is indeed nonviable.
Therefore, the appropriate response would be:
**5h=42, so h=8.4 horses, which is nonviable.**