Ellipses |
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An ellipse is the locus of a point that moves in the plane in such a way that the ratio of its distance from a fixed point in the same plane to its distance from a fixed straight line is always constant and is always less than unity.
The constant ratio is denoted by e and is known as the eccentricity of the ellipse.
If S is the focus, ZZ1 is the directrix and P is any point on the ellipse, then the definition
SP/PM = e |
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Example 1 |
Find the equation of the ellipse whose focus is (1, 0) and directrix is x + y + 1 = 0. |
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Let S(1, 0) be the focus, ZZ1 be the directrix and the point P(x,y) be any point on the ellipse.
PM = perpendicular from P onto the directrix then
SP/PM = e |
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Try these questions |
- Find the equation of the ellipse where
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a. |
Focus is (-1, 1) Directrix x - 2y + 3= 0 and e = 1/3 |
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Focus is (-2, 3) Directrix is 2x + 3y + 4 = 0, e = 4/5 |
c. |
Focus is (1, 2) Directrix is 3x + 4y - 5 = 0, e = 1/2 |
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Answers |
a. |
Solution |
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b.
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Solution |
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Given that the focus S = (-2,3)
Directrix is 2x + 3y + 4= 0
e = 4/5
If P(x,y) is a point on the ellipse
PM = perpendicular from P onto the directrix
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Cross-multiplying |
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c.
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Solution |
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Focus = (1, 2) = S
Directrix is 3x + 4y - 5 = 0
Eccentricity e = 1/2
If P(x,y) be a point on the ellipse
PM = perpendicular from P onto the directrix |
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