Suppose a golf ball is driven so that it travels a distance of 200 feet as measured along the ground


Suppose a golf circle is driven so that it travels a separation of 200 feet as measured concurrently the cause and reaches an tallness of 300 feet. If the rise represents the tee and is the circle travels concurrently a parabolic roadwayway aggravate the unconditional x-axis, ascertain an equation for the roadwayway of the golf circle. Which devise does the equation fit? (y - k) 2 = 4 c(x - h) (x - h) 2 = 4c(y - k) (x - h) 2 /p 2 + (y – k 2 )/q 2 = 1 (x - h) 2 /p 2 - (y -k) 2 /p 2 - (y - k) 2 /q 2 = 1