A hunter aims directly at a target (on the same level) 85.0 away. If the bullet leaves the gun at a speed of 188 , by how much will it miss the target?

You need to provide the units of the bullet speed. Just the number "188" isn't enough.

The same goes for the distance of "88".

The importance of units (dimensions), and how to convert them, is one of the first things you should learn about physics

A hunter aims directly at a target (on the same level) 85.0 m away. If the bullet leaves the gun at a speed of 188 m/s, by how much will it miss the target?

Calculate the time it takes to travel 85 m. That is just 0.45 s. Then, calculate how much the bullet falls in that time.

Use Y = (g/2)t^2

That will be the miss distance.

To calculate how much the bullet will miss the target, we need to first calculate how long it takes for the bullet to reach the target. We can use the equation of motion:

distance = speed x time

In this case, the distance is 85.0 m and the speed is 188 m/s. We need to solve for time.

Rearranging the equation, we get:

time = distance / speed

Substituting the values, we have:

time = 85.0 m / 188 m/s
time ≈ 0.452 s

Now that we know the time it takes for the bullet to reach the target, we can calculate how much it will miss the target. Since the hunter aimed directly at the target, we can assume that the bullet traveled in a straight line.

The formula to calculate the horizontal distance covered by the bullet is:

horizontal distance = horizontal speed x time

Since the bullet doesn't experience any horizontal acceleration, its horizontal speed remains constant throughout its flight. Therefore, the horizontal speed is equal to the initial speed of the bullet, which is 188 m/s.

Substituting the values, we can calculate the horizontal distance covered by the bullet:

horizontal distance = 188 m/s x 0.452 s
horizontal distance ≈ 85.14 m

Therefore, the bullet will miss the target by approximately 85.14 meters.