Answer:
The maximum height of the rocket is 3600
Explanation:
The vertex of the quadratic equation y = ax² + bx + c is (h, k), where
- h =
- The vertex (h, k) is a minimum point if a is positive
- The vertex (h, k) is a maximum point if a is negative
The height of the rocket calculated using the equation y = -16x² + 480x, where y is the height and x is the time
To find the maximum height, do that
- Find the x-coordinate of the vertex of the equation ⇒ h
- Substitute the value of x in the equation by h to find the y-coordinate of the equation ⇒ k
- The maximum height equal the value of k
Let us do that
∵ y = -16x² + 480x
∴ a = -16 ⇒ the vertex is a maximum point
∴ b = 480
→ Use the rule above to find h
∵ h =
∴ h =
=
∴ h = 15
∵ k = y at x = h
→ Substitute x by 15 in the equatuion and y by k to find x
∵ k = -16(15)² + 480(15)
∴ k = -3600 + 7200
∴ k = 3600
∵ The maximum height equal the value of k
∴ The maximum height of the rocket is 3600