1 Answer

Pete Davies · Answer 1 · 2021-12-29T21:42:15+0000

Answer:

It will take 0.72s for the football to hits the ground.

Explanation:

We have that the equaation for the height of the football is

H(t) = -16t^(2) + 6t + 4

The football will hit the ground when
H(t) = 0 .

H(t) = -16t^(2) + 6t + 4

-16t^(2) + 6t + 4 = 0

Multiplying by -1

16t^(2) - 6t - 4 = 0

To solve this equation, we need the bhaskara formula:

Given a second order polynomial expressed by the following equation:

$ax^(2) + bx + c, a\\eq0$ .

This polynomial has roots
x_(1), x_(2) such that
ax^(2) + bx + c = (x - x_(1))*(x - x_(2)) , given by the following formulas:

$x_(1) = (-b + √(\bigtriangleup))/(2*a)$

$x_(2) = (-b - √(\bigtriangleup))/(2*a)$

$\bigtriangleup = b^(2) - 4a$

In this problem, we have that:

16t^(2) - 6t - 4 = 0

So

a = 16, b = -6, c = -4

$\bigtriangleup = (-6)^(2) - 4*16*(-4) = 292$

t_(1) = (-(-6) + √(292))/(2*16) = 0.72

t_(2) = (-(-6) - √(292))/(2*16) = -0.35

It cannot take negative seconds for the ball to hit the ground.

So it will take 0.72s for the football to hits the ground.

Please log in or register to add a comment.