fospathi · July 31, 2018 10:24
diff --git a/aimed_projectile_launch_angle.txt b/aimed_projectile_launch_angle.txt
 An expression for the launch angle of a parabolic projectile which coincides with a target position vector (x, y) at some 
 point in its trajectory.

 The parametric coordinates of a parabolic projectile launched from the origin are
  
    x = uct
    
    y = ust + at² / 2
    
 where 

    u is the initial velocity
    a is the acceleration
    t is the time since launch
    θ is the launch angle
    s = sin(θ)
    c = cos(θ)

 Eliminating t we get

    y = x tan(θ) + ax²/(2u²c²)
    
      = x tan(θ) + (tan²(θ) + 1)ax²/(2u²)
      
 Thus

    0 = (ax²/(2u²)) tan²(θ) + x tan(θ) + (ax²/(2u²)) - y

 This is a quadratic equation in tan(θ) which can be solved for tan(θ)

 Let 

    A = (ax²/(2u²))
    B = x
    C = A - y
    
 Then

    0 = A tan²(θ) + B tan(θ) + C
    
 and 

    θ = arctan( -B±√(B² - 4AC) )
              ( -------------- )
              (       2A       )
	An expression for the launch angle of a parabolic projectile which coincides with a target position vector (x, y) at some
	point in its trajectory.

	The parametric coordinates of a parabolic projectile launched from the origin are

	x = uct

	y = ust + at² / 2

	where

	u is the initial velocity
	a is the acceleration
	t is the time since launch
	θ is the launch angle
	s = sin(θ)
	c = cos(θ)

	Eliminating t we get

	y = x tan(θ) + ax²/(2u²c²)

	= x tan(θ) + (tan²(θ) + 1)ax²/(2u²)

	Thus

	0 = (ax²/(2u²)) tan²(θ) + x tan(θ) + (ax²/(2u²)) - y

	This is a quadratic equation in tan(θ) which can be solved for tan(θ)

	Let

	A = (ax²/(2u²))
	B = x
	C = A - y

	Then

	0 = A tan²(θ) + B tan(θ) + C

	and

	θ = arctan( -B±√(B² - 4AC) )
	( -------------- )
	( 2A )