QuestionA golf ball is hit at 130 ft/s at . Find the distance to max height using .
Studdy Solution
STEP 1
Assumptions1. The initial velocity of the golf ball is130 feet per second.
. The inclination of the hit is to the horizontal.
3. The height of the golf ball is given by the function .
4. We need to find the distance the ball travels before it reaches a maximum height.
STEP 2
The maximum height is achieved when the derivative of the height function is zero, because the derivative represents the rate of change of the height. When the height is at a maximum, the rate of change is zero (the height is not increasing or decreasing at that point). So, we need to find the derivative of the height function.
STEP 3
To differentiate the function, we apply the power rule, which states that the derivative of is .
STEP 4
Differentiate each term separately.
STEP 5
Set the derivative equal to zero and solve for to find the distance the ball travels before it reaches a maximum height.
STEP 6
Rearrange the equation to isolate .
STEP 7
Multiply both sides by .
STEP 8
Multiply both sides by .
STEP 9
Divide both sides by64 to solve for .
STEP 10
Calculate the value of .
The ball travels approximately263 feet (rounded to the nearest whole number) before it reaches a maximum height.
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