few Qs from 4unit s.k patel im having problems with.. (1 Viewer)

suneeta =) · Feb 28, 2010

Show that the equation of the normal to the ellipse x^2/a^2 + y^2/b^2 = 1 at P( acosX , bsinX ) is given by axsinX - bycosX = (a^2 - b^2)sinXcosX.
The normal at P meets the x-axis at M and N is the foot of the perpendicular PN to the axis. Prove that MN = (b^2.cosX)/a

Show that the tangent to the ellipse x^2/a^2 + y^2/b^2 = 1 at P(x1, y1) has the equation (x.x1)/a^2 + (y.y1)/b^2 = 1 . This tangent meets the x-axis at T. PN is perpendicular to the x-axis at G. Show that OT x NG = b^2, where O is the centre of the ellipse.

I get how to do the "show the equation of etc etc" but I'm having problems with the latter parts of the questions.

Any help would be appreciated

js992 · Feb 28, 2010

Find your coordinates of M and N
$N (acos\theta,0)$ $ M((a^2-b^2)\frac{cos\theta}{a},0)$
Your distance MN is ON -OM

$MN = acos\theta-(a^2-b^2)\frac{cos\theta}{a}$
$= acos\theta -\frac{a^2cos\theta - b^2cos\theta}{a}$
$= \frac{a^2cos\thetha-a^2cos\theta+b^2cos\theta}{a}$
$= \frac{b^2cos\theta}{a}$

js992 · Feb 28, 2010

suneeta =) said:
Show that the tangent to the ellipse x^2/a^2 + y^2/b^2 = 1 at P(x1, y1) has the equation (x.x1)/a^2 + (y.y1)/b^2 = 1 . This tangent meets the x-axis at T. PN is perpendicular to the x-axis at G. Show that OT x NG = b^2, where O is the centre of the ellipse.

Find Coordinates T, N and G

$T ( \frac{a^2}{x1},0)$ $$ $N ( x1, 0 )$ $G([a^2-b^2]\frac{x1}{a^2},0)$
$OT = \frac{a^2}{x1}$
$NG = ON - OG = x1 - [a^2-b^2]\frac{x1}{a^2}$
$NG = \frac{b^2x1}{a^2}$
$NG \cdot OT = \frac{b^2x1}{a^2}\cdot \frac{a^2}{x1}$
$=b^2$

suneeta =) · Feb 28, 2010

Thankyouuuu !

few Qs from 4unit s.k patel im having problems with.. (1 Viewer)

suneeta =)

ninja-esque.

js992

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js992

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suneeta =)

ninja-esque.

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