ChatterBank0 min ago
Length of tangents - circles and ellipses
7 Answers
Proper maths q coming up
The reader will know that plugging in the co ordinate (p,q)
into the eqn of a circle when (p,q) does NOT lie on the circle
will return the length of a tangent to the circle
ellipses - I recollect dimly - if you do the same for an ellipse, that is plug in a point that doesnt lie on an ellipse into the equation what if anything does the number represent ?
....
and if you put the point (p,q) in to the standard eqn of a tangent
x x1/ a2 + y y`/b2 ......what is the significance of the line that you get
I think these were called polar equations but I cant find anything on the internet
Thanks
The reader will know that plugging in the co ordinate (p,q)
into the eqn of a circle when (p,q) does NOT lie on the circle
will return the length of a tangent to the circle
ellipses - I recollect dimly - if you do the same for an ellipse, that is plug in a point that doesnt lie on an ellipse into the equation what if anything does the number represent ?
....
and if you put the point (p,q) in to the standard eqn of a tangent
x x1/ a2 + y y`/b2 ......what is the significance of the line that you get
I think these were called polar equations but I cant find anything on the internet
Thanks
Answers
Best Answer
No best answer has yet been selected by Peter Pedant. Once a best answer has been selected, it will be shown here.
For more on marking an answer as the "Best Answer", please visit our FAQ.I think there is some confusion here - by definition a tangent just touches a circle at a single point
I think what you mean is that it returns the distance from the point to the closest point on the circles perimeter i.e the length of the Normal rather than the tangent?
So take the circle with a radius 3 x²+y²=9
if we take the point (0,1) then it's 2 units from the circle's perimeter at (0,3)
put this in to the left hand side and subtract the *Square Root* of the figure on the right and you get 1-3 = -2 which is what you're looking for
Not sure about an elipse - probably different as the above is so because the formula gives you the radius from a central point which obviously isn't true for an elipse
A bit of manipulation might get you a similar formula
Check out these resources:
http://www.mathopenref.com/ellipse.html (simple)
http://mathworld.wolfram.com/Ellipse.html (more complex)
I think what you mean is that it returns the distance from the point to the closest point on the circles perimeter i.e the length of the Normal rather than the tangent?
So take the circle with a radius 3 x²+y²=9
if we take the point (0,1) then it's 2 units from the circle's perimeter at (0,3)
put this in to the left hand side and subtract the *Square Root* of the figure on the right and you get 1-3 = -2 which is what you're looking for
Not sure about an elipse - probably different as the above is so because the formula gives you the radius from a central point which obviously isn't true for an elipse
A bit of manipulation might get you a similar formula
Check out these resources:
http://www.mathopenref.com/ellipse.html (simple)
http://mathworld.wolfram.com/Ellipse.html (more complex)
I love helping with Maths problems on here but I couldn't help on this occasion as I didn't understand the bit about "length of a tangent" so I'm not sure what you want.
This page may be a useful starting point
http://en.wikipedia.o...247099830034543036653
This page may be a useful starting point
http://en.wikipedia.o...247099830034543036653
no I didnt
to takethe example - x2 + y2 = 9 or x2+y2 -9 = 0
which is a circle of radius 3 centred on the origin
take a point (5,0) - so it is 5 along the x axis
plug it in and take the sqrt
so it is root (25-9) or rt16 or 4
and this is the length of the tangent from (5,0) to the circle
(also a 3,4,5 triangle)
and I was asking if anyone can remember the same result for ellipses ?
to takethe example - x2 + y2 = 9 or x2+y2 -9 = 0
which is a circle of radius 3 centred on the origin
take a point (5,0) - so it is 5 along the x axis
plug it in and take the sqrt
so it is root (25-9) or rt16 or 4
and this is the length of the tangent from (5,0) to the circle
(also a 3,4,5 triangle)
and I was asking if anyone can remember the same result for ellipses ?
Hi Peter
The equation in your post:
x x1/ a^2 + y y1/b^2 is the equation of the tangent to the ellipse at the point P(x1,y1) ON the ellipse. If, on the other hand, the point P(x1,y1) lies outside the ellipse then this equation is the equation of the line which passes through the 2 points where the 2 tangents from P(x1,y1) touch the ellipse. This line is called the polar of the point P with respect to the given ellipse and the point P is called the pole of the line.
The same is true for the circle.
The equation in your post:
x x1/ a^2 + y y1/b^2 is the equation of the tangent to the ellipse at the point P(x1,y1) ON the ellipse. If, on the other hand, the point P(x1,y1) lies outside the ellipse then this equation is the equation of the line which passes through the 2 points where the 2 tangents from P(x1,y1) touch the ellipse. This line is called the polar of the point P with respect to the given ellipse and the point P is called the pole of the line.
The same is true for the circle.
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