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23 votes
An astronaut on the moon throws a baseball upward. The astronaut is 6 ft, 6 in tall, and the initial velocity of the ball is 30 ft per sec. The height s of the ball in feet isgiven by the equation s= -2.7t^2 + 30t + 6.5, where t is the number of seconds after the ball was thrown. Complete parts a and b.a. After how many seconds is the ball 18 ft above the moon's surface?After ____ seconds the ball will be 18 ft above the moon's surface.(Round to the nearest hundredth as needed. Use a comma to separate answers as needed.)

User Reemo
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1 Answer

19 votes
19 votes

s=-2.7t^2+30t+6.5

In order to find when the ball will be 18 ft above the moon's surface, we need to equal the expression to 18


18=-2.7t^2+30t+6.5

then, solve the associated quadratic expression


\begin{gathered} 0=-2.7t^2+30t+6.5-18 \\ 0=-2.7t^2+30-11.5 \\ using\text{ }the\text{ }quadratic\text{ }formula \\ x=(-30\pm√((30)^2-4\ast(-2.7)\ast(-11.5)))/(2\ast(-2.7)) \\ x_1\cong0.40 \\ x_2\cong10.72 \end{gathered}

answer:

after 0.40 seconds the ball will be 18 ft above the surface

User Hojun
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