At Westonci.ca, we provide clear, reliable answers to all your questions. Join our vibrant community and get the solutions you need. Our platform connects you with professionals ready to provide precise answers to all your questions in various areas of expertise. Explore comprehensive solutions to your questions from a wide range of professionals on our user-friendly platform.

Trajectory of a toy missile The trajectory of a toy missile in (x, y) coordinates can be modeled as the parabola: where
y(x) = ₂x² + ₁x + ₀
use the following information:
₂ = - /2 / ₀²co²(theta₀)
₁ = (theta₀)
= y₀
the initial elevation, y₀ = 1.1m
The initial angle of the missile in radians is theta₀
the initial velocity, ₀ = 70 m/
the horizontal distance the missile flies is 360m
the missile hits a practice target at 1m above
the ground the missile will be launched on Venus where the acceleration due to gravity is 8.87 m/ .
Since the only unknown in equation [1] is the initial angle, theta0, rearrange equation [1] to be in the form of a function of theta₀ and plot it for 0° ≤ theta₀ ≤ 85°. Be sure to label the axes and turn on the grid ( see help on the grid function) . Remember x abel (' theta') will produce theta on the x axis. Even though theta₀ is in radians, the x axis should be in degrees.