A series of concentric ellipse E1,E2,E3,...

A series of concentric ellipse `E_1,E_2,E_3,…,E_n` is constructed as follows: Ellipse `E_n` touches the extremities of the major axis of `E_(n-1)` and have its focii at the extremities of the minor axis of `E_(n-1)` If equation of ellipse `E_1` is `x^(2)/9+y^(2)/16=1`, then equation pf ellipse `E_3` is

`x^(2)/9+y^(2)/16=1`

`x^(2)+y^(49)=1`

`x^(2)/25+y^(2)/41=1`

`x^(2)/16+y^(2)/25=1`

Text Solution

Verified by Experts

The correct Answer is:

A, B, D

Topper's Solved these Questions

ELLIPSE
ARIHANT MATHS|Exercise Example|5 Videos
ELLIPSE
ARIHANT MATHS|Exercise Exercise For Session 1|18 Videos
DY / DX AS A RATE MEASURER AND TANGENTS, NORMALS
ARIHANT MATHS|Exercise Exercise (Questions Asked In Previous 13 Years Exam)|7 Videos
ESSENTIAL MATHEMATICAL TOOLS
ARIHANT MATHS|Exercise Exercise (Single Integer Answer Type Questions)|3 Videos

Similar Questions

Explore conceptually related problems

A series of concentric ellipses E_1,E_2, E_3..., E_n are drawn such that E touches the extremities of the major axis of E_(n-1) , and the foci of E_n coincide with the extremities of minor axis of E_(n-1) If the eccentricity of the ellipses is independent of n, then the value of the eccentricity, is

If E_1 and E_2 are mutually exclusive, then write down the value of P(E_1capE_2) .

If e and e' are the eccentricities of the ellipse 5x^(2) + 9 y^(2) = 45 and the hyperbola 5x^(2) - 4y^(2) = 45 respectively , then ee' is equal to

If e and e_(1) , are the eccentricities of the hyperbolas xy=c^(2) and x^(2)-y^(2)=c^(2) , then e^(2)+e_(1)^(2) is equal to

If e_1 is eccentricity of the ellipse x^2/16+y^2/7=1 and e_2 is eccentricity of the hyperbola x^2/9-y^2/7=1 , then e_1+e_2 is equal to:

If e and e' be the eccentricities of a hyperbola and its conjugate, prove that 1/e^2+1/(e')^2=1 .

A point moves so that the sum of its distances from (a e ,0)a n d(-a e ,0) is 2a , prove that the equation to its locus is (x^2)/(a^2)+(y^2)/(b^2)=1 , where b^2=a^2(1-e^2)dot

ARIHANT MATHS-ELLIPSE-Exercise (Questions Asked In Previous 13 Years Exam)

A series of concentric ellipse E1,E2,E3,…,En is constructed as follows...
Text Solution
|
The minimum area of the triangle formed by the tangent to (x^2)/(a^2)+...
Text Solution
|
Find the 17^(th) term in the following sequence whose n^(th) term is a...
Text Solution
|
An ellipse has O B as the semi-minor axis, Fa n dF ' as its foci...
Text Solution
|
In an ellipse, the distances between its foci is 6 and minor axis is 8...
Text Solution
|
Find the 9^(th) term in the following sequence whose n^(th) term is an...
Text Solution
|
A focus of an ellipse is at the origin. The directrix is the line x =4...
Text Solution
|
The 5th, 8th, and 11th terms of a GP are p, q and s respectively. Find...
Text Solution
|
Is 309 a term of the AP 11, 17, 23….?
Text Solution
|
A triangle A B C with fixed base B C , the vertex A moves such that co...
Text Solution
|
The conic having parametric representation x=sqrt3(1-t^(2)/(1+t^(2))),...
Text Solution
|
The ellipse x^2+""4y^2=""4 is inscribed in a rectangle aligned with...
Text Solution
|
Tangents are drawn from the point P(3,4) to the ellipse x^(2)/9+y^(2)/...
Text Solution
|
Tangents are drawn from the point P(3,4) to the ellipse x^(2)/9+y^(2)/...
Text Solution
|
Tangents are drawn from the point P(3,4) to the ellipse x^(2)/9+y^(2)/...
Text Solution
|
Find the equation of an ellipse whose axes lie along the coordinate ...
Text Solution
|
The ellipse E1:(x^2)/9+(y^2)/4=1 is inscribed in a rectangle R whose s...
Text Solution
|
Statement 1: An equation of a common tangent to the parabola y^2=16s...
Text Solution
|
An ellipse is drawn by taking a diameter of the circle (x-1)^2+y^2=1 ...
Text Solution
|
the equation of the circle passing through the foci of the ellip...
Text Solution
|
A vertical line passing through the point (h, 0) intersects the ellips...
Text Solution
|