To determine how far the ball travels before it hits the ground, we solve the equation:
\[ 0 = -\frac{1}{25}x(x - 45) \]
Setting the equation equal to zero, we can factor it:
\[ -\frac{1}{25}x(x - 45) = 0 \]
This gives us two solutions:
- \( x = 0 \) (the starting point)
- \( x - 45 = 0 \) or \( x = 45 \)
So the ball will hit the ground when it has traveled 45 yards.
Now, to find out how far it will roll to reach the hole, we subtract the distance traveled from the hole's distance:
\[ \text{Distance to the hole} = 55 \text{ yards} \] \[ \text{Rolling distance} = 55 \text{ days} - 45 \text{ yards} = 10 \text{ yards} \]
Thus, the golf ball will hit the ground after it has traveled 45 yards and will need to roll an additional 10 yards to reach the hole.
The correct response is:
The ball will hit the ground after it has traveled 45 yards. It will need to roll an additional 10 yards to reach the hole.
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