Respuesta :
[tex]f(x)=-16( x^{2} -7x-8)[/tex]
is the functions that determines the height of the ball in Feet, after x seconds being thrown.
so for example to calculate how many feet above the ground in the ball 5 seconds after being thrown, we calculate f(5)
[tex]f(5)=-16( 5^{2} -7*5-8)=-16(25-35-8)=-16(-18)=288[/tex] feet
to solve our problem we need to find x such that f(x)=0
so we solve :
[tex]-16( x^{2} -7x-8)=0[/tex]
[tex]x^{2} -7x-8=0[/tex]
using the quadratic formula, le a=1, b=-7, c=-8
[tex] \sqrt{D} = \sqrt{ b^{2}-4ac}= \sqrt{ (-7)^{2}-4(1)(-8) }= \sqrt{49+32}= \sqrt{81}=9 [/tex]
so
[tex]x_1= \frac{-b+ \sqrt{D} }{2a}= \frac{7+9}{2}= \frac{16}{2}=8 [/tex]
[tex]x_1= \frac{-b- \sqrt{D} }{2a}= \frac{7-9}{2}= \frac{-2}{2}=-1 [/tex], which cannot be the solution to our problem.
Answer: 8 s
is the functions that determines the height of the ball in Feet, after x seconds being thrown.
so for example to calculate how many feet above the ground in the ball 5 seconds after being thrown, we calculate f(5)
[tex]f(5)=-16( 5^{2} -7*5-8)=-16(25-35-8)=-16(-18)=288[/tex] feet
to solve our problem we need to find x such that f(x)=0
so we solve :
[tex]-16( x^{2} -7x-8)=0[/tex]
[tex]x^{2} -7x-8=0[/tex]
using the quadratic formula, le a=1, b=-7, c=-8
[tex] \sqrt{D} = \sqrt{ b^{2}-4ac}= \sqrt{ (-7)^{2}-4(1)(-8) }= \sqrt{49+32}= \sqrt{81}=9 [/tex]
so
[tex]x_1= \frac{-b+ \sqrt{D} }{2a}= \frac{7+9}{2}= \frac{16}{2}=8 [/tex]
[tex]x_1= \frac{-b- \sqrt{D} }{2a}= \frac{7-9}{2}= \frac{-2}{2}=-1 [/tex], which cannot be the solution to our problem.
Answer: 8 s
