Parabola

In Cartesian geometry in two dimensions the ${\displaystyle parabola}$ is the locus of a point that moves so that it is always equidistant from a fixed point and a fixed line. The fixed point is called the ${\displaystyle focus}$ and the fixed line is called the ${\displaystyle directrix}$. Distance from ${\displaystyle focus}$ to ${\displaystyle directrix}$ is non-zero.

See Figure 1.

The focus is point ${\displaystyle F(0,q)}$ and the directrix is line ${\displaystyle D_1{D}_4}$${\displaystyle :y=-q.}$ The ${\displaystyle vertex}$, point ${\displaystyle V}$${\displaystyle :(0,0)}$, is half-way between focus and directrix. A ${\displaystyle chord}$ is the segment of a line joining any two distinct points of the parabola. The line segment ${\displaystyle P_{2}F{P}_4}$ is a chord. Because chord ${\displaystyle P_{2}F{P}_4}$ passes through the focus ${\displaystyle F}$, it is called a ${\displaystyle focalchord.}$

The focal chord parallel to the directrix is called the ${\displaystyle latusrectum.}$

The line through the focus and perpendicular to the directrix is the ${\displaystyle axis}$, sometimes called ${\displaystyle axisofsymmetry}$.

Let an arbitrary point on the curve be ${\displaystyle (x,y)}$.

By definition, ${\displaystyle \sqrt{(x-0{)}^2+(y-q{)}^2}=y+q}$. This expression expanded gives:

${\displaystyle x^2-4qy=0;y=\frac{x^2}{4q}}$.

If the equation of the curve is expressed as: ${\displaystyle y=K{x}^2}$, then ${\displaystyle K=\frac{1}{4q};4Kq=1;q=\frac{1}{4K}}$ where the ${\displaystyle focus}$ has coordinates ${\displaystyle (0,q),}$ and ${\displaystyle q}$ is the distance form vertex to focus.

If the directrix is parallel to the ${\displaystyle X}$ axis, then the parabola is the same as the familiar quadratic function.

The general parabola allows for a directrix anywhere with any orientation.

Let the directrix be ${\displaystyle ax+by+c=0}$ where at least one of ${\displaystyle a,b}$ is non-zero.

Let the focus be ${\displaystyle (p,q)}$.

Let ${\displaystyle (x,y)}$ be any point on the curve.

Distance from point ${\displaystyle (x,y)}$ to focus ${\displaystyle (p,q)}$ = ${\displaystyle \sqrt{(x-p{)}^2+(y-q{)}^2}}$.

Distance from point ${\displaystyle (x,y)}$ to directrix (${\displaystyle ax+by+c=0}$)

= ${\displaystyle \frac{ax+by+c}{\sqrt{R}}}$ where ${\displaystyle R=a^2+b^2}$.

By definition these two lengths are equal:

${\displaystyle \sqrt{(x-p{)}^2+(y-q{)}^2}=\frac{ax+by+c}{\sqrt{R}}}$.

${\displaystyle \therefore \sqrt{R}\sqrt{(x-p{)}^2+(y-q{)}^2}=ax+by+c}$.

Square both sides:

${\displaystyle R((x-p{)}^2+(y-q{)}^2)=(ax+by+c{)}^2}$.

${\displaystyle R((x-p{)}^2+(y-q{)}^2)-(ax+by+c{)}^2=0}$.

Expand and the result is:

${\displaystyle b^2{x}^2-2abxy+a^2{y}^2-2(ac+pR)x-2(bc+qR)y+R(p^2+q^2)-c^2=0\dots (1)}$.

${\displaystyle (1)}$ has the form of the equation of the conic section ${\displaystyle A{x}^2+Bxy+C{y}^2+Dx+Ey+F=0}$ where

${\displaystyle \begin{array}{cc}A& =b^2\\ B& =-2ab\\ C& =a^2\\ D& =-2(ac+pR)\\ E& =-2(bc+qR)\\ F& =R(p^2+q^2)-c^2\\ \\ B& {}^2-4AC=0\\ R& =a^2+b^2\end{array}}$

${\displaystyle B^2=4AC}$ because this curve is a parabola.

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See Figure 2.

${\displaystyle (a,b,c)=(3,-4,-5)}$

${\displaystyle (p,q)=(1,2)}$

The equation of the parabola is derived as follows:

${\displaystyle \begin{array}{cc}& A=b^2=(-4{)}^2=16\\ & B=-2ab=-2(3)(-4)=24\\ & C=a^2=(3{)}^2=9\\ & R=a^2+b^2=25\\ & D=-2(ac+pR)=-2((3)(-5)+(1)(25))=-2(-15+25)=-2(10)=-20\\ & E=-2(bc+qR)=-2((-4)(-5)+(2)(25))=-2(20+50)=-2(70)=-140\\ & F=R(p^2+q^2)-c^2=25(1+4)-25=100\end{array}}$

The equation of the parabola in Figure 2 is: ${\displaystyle 16x^2+24xy+9y^2-20x-140y+100=0.}$

Equation of directrix in normal form: ${\displaystyle \frac{3}{5}x-\frac{4}{5}y-1=0.}$

Distance from ${\displaystyle focus}$ to ${\displaystyle directrix=\frac{3}{5}(1)-\frac{4}{5}(2)-1=-2.}$

Distance from vertex to focus ${\displaystyle =1=\frac{1}{4K}}$.

Therefore, curve has shape of ${\displaystyle y=K{x}^2}$ where ${\displaystyle K=\frac{1}{4}}$. Template:RoundBoxTop Caution: An interesting situation occurs if the focus is on the directrix. Consider the directrix:

${\displaystyle 4x-3y+15=0}$ and the focus ${\displaystyle (3,9)}$ which is on the directrix.

${\displaystyle a=4,b=-3,c=15,p=3,q=9}$

In this case the "parabola" has equation: ${\displaystyle 9xx+24xy+16yy-270x-360y+2025=0}$.

This seems to be the equation of a parabola because ${\displaystyle B^2-4AC=0}$, but look closely.

${\displaystyle 9xx+24xy+16yy-270x-360y+2025=(3x+4y-45{)}^2}$.

The result is a line through the focus and normal to the directrix.

If you solve for ${\displaystyle p,q,c}$ using the algebraic solutions, you will produce the values ${\displaystyle 3,9,15}$ as above.

However, the distance between focus and directrix = ${\displaystyle \frac{4}{5}x+\frac{-3}{5}y+3}$

where ${\displaystyle x=p;y=q;}$ distance ${\displaystyle =\frac{4}{5}(3)+\frac{-3}{5}(9)+3=0.}$ Template:RoundBoxBottom Template:RoundBoxBottom

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Given a parabola in form ${\displaystyle A{x}^2+Bxy+C{y}^2+Dx+Ey+F=0}$ the aim is to produce the directrix and the focus.

We will solve the example shown in Figure 3: ${\displaystyle 9x^2-24xy+16y^2+70x-260y+1025=0}$,

where:

${\displaystyle \begin{array}{cc}A& =9\\ B& =-24\\ C& =16\\ D& =70\\ E& =-260\\ F& =1025\end{array}}$

${\displaystyle a=\sqrt{C}=4;b=\frac{-B}{2a}=\frac{-(-24)}{8}=3}$.

Template:RoundBoxTop Find two tangents that intersect at a right angle. The simplest to find are those that are parallel to the axes. Template:RoundBoxTop Put the equation of the parabola in the form of a quadratic in ${\displaystyle x}$.

${\displaystyle A{x}^2+Bxy+Dx+C{y}^2+Ey+F=0}$

${\displaystyle A{x}^2+(By+D)x+(C{y}^2+Ey+F)=0}$

At the tangent there is exactly one value of ${\displaystyle x}$. Therefore the discriminant must be ${\displaystyle 0}$.

${\displaystyle (By+D{)}^2-4(A)(C{y}^2+Ey+F)=0}$

${\displaystyle BByy+2BDy+DD-4ACyy-4AEy-4AF=0}$

${\displaystyle (BB-4AC)yy+(2BD-4AE)y+(DD-4AF)=0}$

In the general parabola ${\displaystyle B^2-4AC=0}$ therefore ${\displaystyle y=\frac{4AF-DD}{2BD-4AE}}$.

In this example ${\displaystyle y=\frac{16}{3};x=\frac{-(By+D)}{2A}=\frac{29}{9}}$.

Point ${\displaystyle B(x_1,y_1)}$ has coordinates ${\displaystyle (\frac{29}{9},\frac{16}{3})}$.

The line ${\displaystyle ABC}$ is tangent to the curve at ${\displaystyle B}$ and has equation: ${\displaystyle y=\frac{16}{3}}$. Template:RoundBoxBottom Template:RoundBoxTop Put the equation of the parabola in the form of a quadratic in ${\displaystyle y}$:

${\displaystyle C{y}^2+(Bx+E)y+(A{x}^2+Dx+F)=0}$.

By using calculations similar to the above, ${\displaystyle x=\frac{4CF-EE}{2BE-4CD}=-0.25}$ and ${\displaystyle y=\frac{-(Bx+E)}{2C}=7.9375}$.

Point ${\displaystyle D(x_2,y_2)}$ has coordinates ${\displaystyle (-0.25,7.9375)}$.

The line ${\displaystyle ADE}$ is tangent to the curve at ${\displaystyle D}$ and has equation: ${\displaystyle x=-0.25}$. Template:RoundBoxBottom Template:RoundBoxTop Point ${\displaystyle A}$ at the intersection of the two tangents has coordinates ${\displaystyle (x_2,y_1)=(-0.25,\frac{16}{3})}$, and point ${\displaystyle A}$ is on the directrix, the equation of which is: ${\displaystyle ax+by+c=0}$.

Put known values into the equation of the directrix: ${\displaystyle (4)(-0.25)+(3)\frac{16}{3}+c=0}$.

Therefore ${\displaystyle c=-15}$ and the equation of the directrix is: ${\displaystyle 4x+3y-15=0}$. Template:RoundBoxBottom Template:RoundBoxTop The coordinates of points ${\displaystyle B,D}$ are known. Therefore chord ${\displaystyle BD}$ is defined as: ${\displaystyle \frac{3}{5}x+\frac{4}{5}y-6.2=0}$.

Draw the line ${\displaystyle AG}$ perpendicular to ${\displaystyle BD}$. The line ${\displaystyle AG}$ is defined as: ${\displaystyle \frac{4}{5}x-\frac{3}{5}y+3.4=0}$.

Point ${\displaystyle F}$ at the intersection of lines ${\displaystyle BD,AG}$ is the focus with coordinates ${\displaystyle (1,7)}$. Template:RoundBoxBottom Template:RoundBoxBottom

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${\displaystyle \begin{array}{cc}A& =b^2\\ B& =-2ab\\ C& =a^2\\ D& =-2(ac+pR)\\ E& =-2(bc+qR)\\ F& =R(p^2+q^2)-c^2\\ \\ B& {}^2-4AC=0\\ R& =a^2+b^2\end{array}}$

After rearranging the above values, there are three equations to be solved for three unknowns: ${\displaystyle p,q,c}$:

${\displaystyle \begin{array}{c}D+2ac+2pR=0\\ E+2bc+2qR=0\\ F-Rpp-Rqq+cc=0\end{array}}$

The solutions are:

${\displaystyle c=\frac{4FR-(DD+EE)}{4Da+4Eb}}$

${\displaystyle p=\frac{-(D+2ac)}{2R}}$

${\displaystyle q=\frac{-(E+2bc)}{2R}}$

Template:RoundBoxTop If ${\displaystyle b}$ is ${\displaystyle 0,A=B=0,R=a^2=C,}$ the parabola becomes the quadratic: ${\displaystyle -Dx=C{y}^2+Ey+F}$ and:

${\displaystyle \begin{array}{cc}p& =\frac{E^2-D^2-4FC}{4CD}\\ q& =\frac{-E}{2C}\\ c& =\frac{4FC-(DD+EE)}{4Da}\end{array}}$

The directrix has equation: ${\displaystyle ax+c=0;ax=-c;x=\frac{DD+EE-4FC}{4CD}}$.

If ${\displaystyle D}$ is ${\displaystyle -1}$, then:

${\displaystyle \begin{array}{cc}x& =C{y}^2+Ey+F\\ p& =\frac{E^2-1-4FC}{4C(-1)}=\frac{1-(E^2-4CF)}{4C}\\ q& =\frac{-E}{2C}\end{array}}$

The directrix has equation: ${\displaystyle x=\frac{-1-(E^2-4CF)}{4C}}$. Template:RoundBoxBottom

Template:RoundBoxTop If ${\displaystyle a}$ is ${\displaystyle 0,B=C=0,R=b^2=A,}$ the parabola becomes the quadratic: ${\displaystyle -Ey=A{x}^2+Dx+F}$ and:

${\displaystyle \begin{array}{cc}p& =\frac{-D}{2A}\\ q& =\frac{D^2-E^2-4FA}{4EA}\\ c& =\frac{4FA-(DD+EE)}{4Eb}\end{array}}$

The directrix has equation: ${\displaystyle by+c=0;by=-c;y=\frac{DD+EE-4FA}{4EA}}$.

If ${\displaystyle E}$ is ${\displaystyle -1}$, then:

${\displaystyle \begin{array}{cc}y& =A{x}^2+Dx+F\\ p& =\frac{-D}{2A}\\ q& =\frac{D^2-1-4FA}{4(-1)A}=\frac{1-(D^2-4AF)}{4A}\end{array}}$

The directrix has equation: ${\displaystyle y=\frac{-1-(D^2-4AF)}{4A}}$.

These values agree with the corresponding values in the graph of ${\displaystyle y=x^2-2x-3}$ to the right. Template:RoundBoxBottom Template:RoundBoxBottom Template:RoundBoxBottom

Consider parabola ${\displaystyle A{x}^2+Bxy+C{y}^2+Dx+Ey+F=0}$ and line ${\displaystyle y=mx+c.}$

Let point ${\displaystyle (X,Y)}$ be any point on the line. Therefore ${\displaystyle Y=mX+c;c=Y-mX;y=mx+(Y-mX).}$

Let the line intersect the parabola. Substitute the above value of ${\displaystyle y}$ into the equation of the parabola and expand:

${\displaystyle \begin{array}{cc}(+A+Bm+Cmm)& xx+\\ (-BXm+BY-2CXmm+2CYm+D+Em)& x+\\ (+CXXmm-2CXYm+CYY-EXm+EY+F)& =0\end{array}}$

We want the line to be tangent to the curve. Therefore ${\displaystyle x}$ must have exactly one value and the discriminant is ${\displaystyle 0.}$

Discriminant =

${\displaystyle \begin{array}{cc}(-BXm+BY-2CXmm+2CYm+D+Em)(-BXm+BY-2CXmm+2CYm+D+Em)& \\ -4(+A+Bm+Cmm)(+CXXmm-2CXYm+CYY-EXm+EY+F)& =0\end{array}}$

The above discriminant is a quadratic in ${\displaystyle m}$:

${\displaystyle \begin{array}{cc}(-4ACXX+BBXX+2BEX-4CDX-4CF+EE)& mm+\\ (+8ACXY+4AEX-2BBXY-2BDX-2BEY-4BF+4CDY+2DE)& m+\\ (-4ACYY-4AEY-4AF+BBYY+2BDY+DD)& =0\end{array}}$

${\displaystyle m=\frac{-(+8ACXY+4AEX-2BBXY-2BDX-2BEY-4BF+4CDY+2DE)\pm \sqrt{R}}{2(-4ACXX+BBXX+2BEX-4CDX-4CF+EE)}}$

where:

${\displaystyle \begin{array}{cc}R=& 16(AXX+BXY+CYY+DX+EY+F)(-4ACF+AEE+BBF-BDE+CDD)\end{array}}$

If the point ${\displaystyle (X,Y)}$ is on the curve, then the line touches the curve at ${\displaystyle (X,Y)}$ and:

${\displaystyle \begin{array}{cc}(AX& X+BXY+CYY+DX+EY+F)=0;R=0\\ \\ m=& \frac{-(+8ACXY+4AEX-2BBXY-2BDX-2BEY-4BF+4CDY+2DE)}{2(-4ACXX+BBXX+2BEX-4CDX-4CF+EE)}\\ \\ =& \frac{2BBXY-8ACXY+2BDX-4AEX+2BEY-4CDY+4BF-2DE}{2(BBXX-4ACXX+2BEX-4CDX+EE-4CF)}\\ \\ =& \frac{(BB-4AC)XY+(BD-2AE)X+(BE-2CD)Y+2BF-DE}{(BB-4AC)XX+(2BE-4CD)X+EE-4CF}\\ \\ =& \frac{(BD-2AE)X+(BE-2CD)Y+2BF-DE}{(2BE-4CD)X+EE-4CF}\end{array}}$

because ${\displaystyle B^2-4AC=0}$ for a parabola.

When slope is displayed in this format, we see that slope is vertical if ${\displaystyle (2BE-4CD)X+EE-4CF=0.}$

The line ${\displaystyle x=\frac{4CF-EE}{2BE-4CD}}$ is tangent to the curve. Template:RoundBoxTop Let the equation of a line be: ${\displaystyle x=My+c}$ in which case ${\displaystyle M=\frac{1}{m}.}$

By using calculations similar to the above it can be shown that:

${\displaystyle M=\frac{(BD-2AE)X+(BE-2CD)Y+2BF-DE}{(2BD-4AE)Y+DD-4AF}}$.

${\displaystyle m=\frac{1}{M}}$ therefore:

${\displaystyle m=\frac{(2BD-4AE)Y+DD-4AF}{(BD-2AE)X+(BE-2CD)Y+2BF-DE}}$

When slope is displayed in this format, we see that slope is zero if ${\displaystyle (2BD-4AE)Y+DD-4AF=0}$.

The line ${\displaystyle y=\frac{4AF-DD}{2BD-4AE}}$ is tangent to the curve. Template:RoundBoxBottom Template:RoundBoxTop This examination of the parabola has produced two expressions for slope of the parabola:

${\displaystyle m=\frac{(2BD-4AE)y+DD-4AF}{(BD-2AE)x+(BE-2CD)y+2BF-DE}=\frac{(BD-2AE)x+(BE-2CD)y+2BF-DE}{(2BE-4CD)x+EE-4CF}}$.

where the point ${\displaystyle (x,y)}$ is any arbitrary point on the curve.

Therefore ${\displaystyle m=\pm \sqrt{\frac{(2BD-4AE)y+DD-4AF}{(2BE-4CD)x+EE-4CF}}}$. This formula for ${\displaystyle m}$ contains both tangents parallel to the axes and is derived without calculus. Template:RoundBoxBottom Template:RoundBoxTop

The formula from calculus below is simpler and unambiguous concerning sign.

${\displaystyle \begin{array}{c}A{x}^2+Bxy+C{y}^2+Dx+Ey+F=0\\ \\ \frac{d}{dx}(A{x}^2+Bxy+C{y}^2+Dx+Ey+F)=0\\ \\ A(2x)+B(x\frac{dy}{dx}+y\frac{dx}{dx})+C(2y\frac{dy}{dx})+D+E(\frac{dy}{dx})=0\\ \\ A(2x)+B(x\frac{dy}{dx}+y)+C(2y\frac{dy}{dx})+D+E(\frac{dy}{dx})=0\\ \\ 2Ax+Bx\frac{dy}{dx}+By+2Cy\frac{dy}{dx}+D+E\frac{dy}{dx}=0\\ \\ \frac{dy}{dx}(Bx+2Cy+E)=-(2Ax+By+D)\\ \\ m=\frac{dy}{dx}=\frac{-(2Ax+By+D)}{Bx+2Cy+E}\end{array}}$

Template:RoundBoxBottom Template:RoundBoxTop The slope of the parabola is ${\displaystyle 0}$ where ${\displaystyle (2BD-4AE)y+DD-4AF=0;2Ax+By+D=0;}$ or:

${\displaystyle y=\frac{4AF-DD}{2BD-4AE};x=\frac{-(By+D)}{2A}.}$

The slope of the parabola is vertical where ${\displaystyle (2BE-4CD)x+EE-4CF=0;Bx+2Cy+E=0;}$ or:

${\displaystyle x=\frac{4CF-EE}{2BE-4CD};y=\frac{-(Bx+E)}{2C}.}$ Template:RoundBoxBottom Template:RoundBoxTop Caution:

If the curve is ${\displaystyle y=K{x}^2}$, the slope can never be vertical.

If the curve is ${\displaystyle x=K{y}^2}$, the slope can never be ${\displaystyle 0}$. Template:RoundBoxBottom Template:RoundBoxTop If ${\displaystyle B=C=0}$ and ${\displaystyle E=-1}$, the equation of the parabola becomes: ${\displaystyle y=A{x}^2+Dx+F}$ and:

${\displaystyle \begin{array}{cc}m=& \frac{(2BD-4AE)y+DD-4AF}{(BD-2AE)x+(BE-2CD)y+2BF-DE}\\ \\ =& \frac{(-4A(-1))y+DD-4AF}{(-2A(-1))x-D(-1)}=\frac{4Ay+DD-4AF}{2Ax+D}\\ \\ =& \frac{4A(A{x}^2+Dx+F)+DD-4AF}{2Ax+D}=\frac{4A^2{x}^2+4ADx+4AF+DD-4AF}{2Ax+D}\\ \\ =& \frac{4A^2{x}^2+4ADx+DD}{2Ax+D}\\ \\ =& 2Ax+D\\ \\ m=& \frac{(BD-2AE)x+(BE-2CD)y+2BF-DE}{(2BE-4CD)x+EE-4CF}\\ \\ =& \frac{((0)D-2A(-1))x+((0)E-2(0)D)y+2(0)F-D(-1)}{(2(0)E-4(0)D)x+(-1)(-1)-4(0)F}\\ \\ =& \frac{(-2A(-1))x-D(-1)}{(-1)(-1)}\\ \\ =& 2Ax+D\\ \\ m=& \frac{-(2Ax+By+D)}{Bx+2Cy+E}\\ \\ =& \frac{-(2Ax+(0)y+D)}{(0)x+2(0)y+(-1)}\\ \\ =& 2Ax+D\end{array}}$

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Template:RoundBoxTop Given parabola defined by ${\displaystyle A,B,C,D,E,F}$ and slope ${\displaystyle m=\frac{yvalue}{xvalue}}$ where at least one of ${\displaystyle yvalue,xvalue}$ is non-zero, calculate point at which the slope is ${\displaystyle m.}$

Let ${\displaystyle m=\frac{-(2Ax+By+D)}{Bx+2Cy+E}=\frac{s}{t}=\frac{yvalue}{xvalue}}$

Then ${\displaystyle s(Bx+2Cy+E)+t(2Ax+By+D)=0.}$

Let ${\displaystyle G=(Bs+2At);H=(2Cs+Bt);I=(Es+Dt).}$

Then ${\displaystyle Gx+Hy+I=0\dots (1)}$

Substitute in the equation of the parabola and ${\displaystyle y=\frac{-(AII-DGI+FGG)}{(2AHI-BGI-DGH+EGG)}\dots (2)}$

As shown below, with a little manipulation of the data, the same formula can be used to calculate ${\displaystyle x.}$ Template:RoundBoxTop Equation ${\displaystyle (1)}$ above is the equation of a straight line with slope ${\displaystyle \frac{-G}{H}.}$

Substitute for ${\displaystyle G,H}$ and the slope of ${\displaystyle (1)}$ becomes ${\displaystyle \frac{b}{a}.}$

Equation ${\displaystyle (1)}$ is that of a line parallel to the axis of symmetry of the parabola.

It is possible for both both ${\displaystyle G,H}$ to equal ${\displaystyle 0}$ in which case the calculation of ${\displaystyle y,(2)}$ above fails as an attempt to divide by ${\displaystyle 0.}$ See caution under "Slope of the Parabola" above. Template:RoundBoxBottom Template:RoundBoxBottom

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# python code
def pointAtGivenSlope(parabola, tangent) :
    s,t = tangent
    if s == t == 0 :
        print ('pointAtGivenSlope(): both s,t can not be 0.')
      	return None
    def calculate_y (parabola, tangent)  :
        A,B,C,D,E,F = parabola
        s,t = tangent
      	G = B*s + 2*A*t	; H = 2*C*s + B*t ; I =	E*s + D*t
      	return -(A*I*I - D*G*I + F*G*G) / (2*A*H*I - B*G*I - D*G*H + E*G*G)
    y = calculate_y (parabola, tangent)
    A,B,C,D,E,F = parabola
    x = calculate_y ((C,B,A,E,D,F), (t,s))
    return x,y

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Template:RoundBoxTop A parabola is defined as ${\displaystyle 9x^2-24xy+16y^2+70x-260y+1025=0.}$

Template:RoundBoxTop Calculate coordinates of vertex.

At vertex tangent has same slope as directrix.

# python code
parabola = A, B, C, D, E, F = 9, -24, 16, 70, -260, 1025
a = C**.5
b = -B/(2*a)
tangent = -a,b
result = pointAtGivenSlope(parabola, tangent)
print (result)

(0.2, 6.4)

Template:RoundBoxBottom Template:RoundBoxTop Calculate point at which tangent is vertical.

# python code
parabola = A, B, C, D, E, F = 9, -24, 16, 70, -260, 1025
tangent = 1,0
result = pointAtGivenSlope(parabola, tangent)
print (result)

(-0.25, 7.9375)

Template:RoundBoxBottom Template:RoundBoxBottom

Refer to Figure 4.

The curve has equation: ${\displaystyle y=K{x}^2.}$

The chord ${\displaystyle IJ}$ has equation: ${\displaystyle y=mx+c}$.

Point ${\displaystyle L}$ has coordinates ${\displaystyle (0,c).}$

Line ${\displaystyle IN}$ is tangent to the curve at ${\displaystyle I.}$

Line ${\displaystyle JN}$ is tangent to the curve at ${\displaystyle J.}$

This section shows that point ${\displaystyle N}$ has coordinates ${\displaystyle (\frac{m}{2K},-c).}$

${\displaystyle \begin{array}{cc}y=& K{x}^2=mx+c\\ \\ K{x}^2& -mx-c=0\\ \\ x=& \frac{m\pm \sqrt{m^2+4Kc}}{2K}\\ \\ =& \frac{m\pm R}{2K}\end{array}}$

where ${\displaystyle R=\sqrt{m^2+4Kc}}$

Point ${\displaystyle I}$ has coordinates ${\displaystyle (x_1,y_1)}$ where:

${\displaystyle x_1=\frac{m-R}{2K}}$,

${\displaystyle y_1=K{x}_1^2=K(\frac{m-R}{2K})(\frac{m-R}{2K})=\frac{m^2-2mR+R^2}{4K}=\frac{m^2-mR+2Kc}{2K}}$,

and slope of tangent ${\displaystyle IN=s_1=2K{x}_1=m-R.}$

Point ${\displaystyle J}$ has coordinates ${\displaystyle (x_2,y_2)}$ where:

${\displaystyle x_2=\frac{m+R}{2K}}$,

${\displaystyle y_2=\frac{m^2+mR+2Kc}{2K}}$,

and slope of tangent ${\displaystyle JN=s_2=m+R.}$

Points ${\displaystyle D,E}$ have coordinates ${\displaystyle (x_1,0),(x_2,0).}$

Equation of tangent ${\displaystyle IN:}$

${\displaystyle \begin{array}{cc}y=& s_{1}x+c_1\\ c_1=& y_1-s_1{x}_1=\frac{m^2-mR+2Kc}{2K}-(m-R)(\frac{m-R}{2K})=\frac{-(m^2-mR+2Kc)}{2K}\\ y=& (m-R)x-\frac{m^2-mR+2Kc}{2K}\end{array}}$

Equation of tangent ${\displaystyle JN:}$

${\displaystyle \begin{array}{c}y=(m+R)x-\frac{m^2+mR+2Kc}{2K}\end{array}}$

At point of intersection ${\displaystyle N,(m+R)x-\frac{m^2+mR+2Kc}{2K}=(m-R)x-\frac{m^2-mR+2Kc}{2K};x=\frac{m}{2K}.}$

Review the ${\displaystyle X}$ coordinates of points ${\displaystyle D,E}$${\displaystyle :(\frac{m-R}{2K},\frac{m+R}{2K})}$.

The line ${\displaystyle NGH}$ with equation ${\displaystyle x=\frac{m}{2K}}$ bisects the line segment ${\displaystyle DE}$ and also the chord ${\displaystyle IJ}$ at point ${\displaystyle H}$.

Any chord parallel to ${\displaystyle IJ}$ has two tangents that intersect on the line ${\displaystyle x=\frac{m}{2K}}$.

Any chord parallel to ${\displaystyle IJ}$ is bisected by the line ${\displaystyle x=\frac{m}{2K}}$.

The ${\displaystyle Y}$ coordinate of point ${\displaystyle N:}$

${\displaystyle \begin{array}{cc}y=& s_1(\frac{m}{2K})+c_1\\ =& (m-R)(\frac{m}{2K})-\frac{m^2-mR+2Kc}{2K}\\ =& \frac{m^2-mR}{2K}-\frac{m^2-mR+2Kc}{2K}\\ =& \frac{-2Kc}{2K}\\ =& -c\end{array}}$

Any chord that passes through the point ${\displaystyle L(0,c)}$ has two tangents that intersect on the line ${\displaystyle y=-c}$.

Angle ${\displaystyle INJ}$ Template:RoundBoxTop Using:

${\displaystyle \begin{array}{cc}\tan (A-B)=& \frac{\tan (A)-\tan (B)}{1+\tan (A)\tan (B)}\\ \\ \tan (\mathrm{\angle }INJ)=& \frac{(m-R)-(m+R)}{1+(m-R)(m+R)}\\ \\ =& \frac{-2R}{1+(m^2-R^2)}\\ \\ =& \frac{-2R}{1+m^2-(m^2+4Kc)}\\ \\ =& \frac{-2R}{1-4Kc}\\ \\ =& \frac{2\sqrt{m^2+4Kc}}{4Kc-1}\end{array}}$

If ${\displaystyle 4Kc>1}$, point ${\displaystyle L}$ is above the ${\displaystyle focus,\tan (\mathrm{\angle }INJ)}$ is positive and ${\displaystyle 0}$° ${\displaystyle <\mathrm{\angle }INJ<90}$°.

${\displaystyle \mathrm{\angle }INJ}$ is acute and, as ${\displaystyle m}$ increases, ${\displaystyle \mathrm{\angle }INJ}$ increases, approaching ${\displaystyle 90}$°.

If ${\displaystyle 4Kc==1}$, point ${\displaystyle L}$ is on the ${\displaystyle focus,\tan (\mathrm{\angle }INJ)=\frac{2\sqrt{m^2+1}}{0},\mathrm{\angle }INJ=90}$° and the line ${\displaystyle y=-c}$ is the ${\displaystyle directrix}$.

If ${\displaystyle 4Kc<1}$, point ${\displaystyle L}$ is below the ${\displaystyle focus,\tan (\mathrm{\angle }INJ)}$ is negative and ${\displaystyle 90}$° ${\displaystyle <\mathrm{\angle }INJ<180}$°.

${\displaystyle \mathrm{\angle }INJ}$ is obtuse and, as ${\displaystyle m}$ increases, ${\displaystyle \mathrm{\angle }INJ}$ decreases, approaching ${\displaystyle 90}$°. Template:RoundBoxBottom

Refer to Figure 5.

The curve has equation: ${\displaystyle y=K{x}^2.}$

Point ${\displaystyle N}$ with coordinates ${\displaystyle (h,-c)}$ is any point on the line ${\displaystyle y=-c.}$

Line ${\displaystyle NI}$ is tangent to the curve at point ${\displaystyle I(x_1,y_1)}$.

Line ${\displaystyle NJ}$ is tangent to the curve at point ${\displaystyle J(x_2,y_2)}$.

This section shows that the chord ${\displaystyle IJ}$ passes through the point ${\displaystyle (0,c).}$