Answer and Explanation :
We have given that, The function shows the height H(t) [tex]H(t)=-16t^2+75t+25[/tex], in feet, of a projectile after t seconds.
A second object moves in the air along a path represented by [tex]g(t) = 5 + 5.2t[/tex], where g(t) is the height, in feet, of the object from the ground at time t seconds.
We have to find :
Part A - Create a table using integers 2 through 5 for the 2 functions. Between what 2 seconds is the solution to H(t) = g(t) located?
To create a table substitute the value of t from 2 to 5 in the equation H(t) and g(t) we get,
t [tex]H(t)=-16t^2+75t+25[/tex] [tex]g(t) = 5 + 5.2t[/tex]
2 [tex]-16(2)^2+75(2)+25=111[/tex] [tex]5 + 5.2(2)=15.4[/tex]
3 [tex]-16(3)^2+75(3)+25=106[/tex] [tex]5 + 5.2(3)=20.6[/tex]
4 [tex]-16(4)^2+75(4)+25=69[/tex] [tex]5 + 5.2(4)=25.8[/tex]
5 [tex]-16(5)^2+75(5)+25=0[/tex] [tex]5 + 5.2(5)=31[/tex]
Now, To find the the interval in which H(t)=g(t) we have to plot the equations and the points.
We have seen that the intersection point of both the equation is (4.632,29.088) and it lies between 4 to 5.
So, The solution to H(t) = g(t) located between t=4 and t=5.
Refer the attached figure below.
Part B - Explain what the solution from Part A means in the context of the problem.
Part A signifies that the projectile motion of the equations are same in the interval (4,5).
