Maths-
General
Easy
Question
Assertion (A): Three normals are drawn from the point ’ with slopes to the parabola If locus of ‘ ’ with is a part of the parabola itself then
Reason (R): If normals at and are concurrent then
- Both A and R are true and is the correct explanation of A
- Both A and R are true and is not the correct explanation of A
- A is true but R is false
- A is false but R is true
The correct answer is: Both A and R are true and is not the correct explanation of A
Related Questions to study
maths-
ABCD and EFGC are squares and the curve passes through the origin and the points and F The ratio is:
ABCD and EFGC are squares and the curve passes through the origin and the points and F The ratio is:
maths-General
maths-
Statement‐I :: With respect to a hyperbola pependicular are drawn from a point (5, 0) on the lines , then their feet lie on circle
Statement‐II :: If from any foci of a hyperbola perpendicular are drawn on the asymptotes of the hyperbola then their feet lie on auxiliary circle.
Statement‐I :: With respect to a hyperbola pependicular are drawn from a point (5, 0) on the lines , then their feet lie on circle
Statement‐II :: If from any foci of a hyperbola perpendicular are drawn on the asymptotes of the hyperbola then their feet lie on auxiliary circle.
maths-General
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A hyperbola, having the transverse axis of length , is confocal with the ellipse Then its equation is ‐
A hyperbola, having the transverse axis of length , is confocal with the ellipse Then its equation is ‐
maths-General
Maths-
The latus rectum of the hyperbola is‐
The latus rectum of the hyperbola is‐
Maths-General
maths-
Statement‐I :: If a point lies in the shaded region , show in the figure, then
Statement‐II :: lies outside the hyperbola , then
Statement‐I :: If a point lies in the shaded region , show in the figure, then
Statement‐II :: lies outside the hyperbola , then
maths-General
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Statement‐I The ellipse and are congruent.
Statement‐II The ellipse and have the same eccentricity.
For such questions, we should know properties of ellipse. We should know all the formulas related to ellipse. The axis which is larger is always the major axis.
Statement‐I The ellipse and are congruent.
Statement‐II The ellipse and have the same eccentricity.
Maths-General
For such questions, we should know properties of ellipse. We should know all the formulas related to ellipse. The axis which is larger is always the major axis.
Maths-
The minimum area of triangle formed by tangent to the ellipse and coordinate axes‐
The minimum area of triangle formed by tangent to the ellipse and coordinate axes‐
Maths-General
Maths-
An ellipse has OB as semi minor axis, and its focii and the angle FBF’ is a right angle Then the eccentricity of the ellipse is‐
Therefore, the eccentricity of the ellipse is
An ellipse has OB as semi minor axis, and its focii and the angle FBF’ is a right angle Then the eccentricity of the ellipse is‐
Maths-General
Therefore, the eccentricity of the ellipse is
Maths-
The number of values of such that the straight line y=4x+c touches the curve is‐
Therefore, there are two values of c.
The number of values of such that the straight line y=4x+c touches the curve is‐
Maths-General
Therefore, there are two values of c.
Maths-
Let P be any point on any directrix of an ellipse Then the chords of contact of point P with respect to the ellipse and its auxiliary circle intersect at
Let P be any point on any directrix of an ellipse Then the chords of contact of point P with respect to the ellipse and its auxiliary circle intersect at
Maths-General
maths-
An ellipse having foci at (3, 3) and (-4,4) and passing through the origin has eccentricity equal to‐
An ellipse having foci at (3, 3) and (-4,4) and passing through the origin has eccentricity equal to‐
maths-General
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Normals are drawn to parabola from the pointA (h, 0) If triangle ( being the origin) is equilateral, then possible value of h’ is
Normals are drawn to parabola from the pointA (h, 0) If triangle ( being the origin) is equilateral, then possible value of h’ is
maths-General
maths-
Given: A circle, and a parabola,
Statement‐I:: An equation of a common tangent to these curves is
Statement‐II:: If the line, is their common tangent, then satisfies
Given: A circle, and a parabola,
Statement‐I:: An equation of a common tangent to these curves is
Statement‐II:: If the line, is their common tangent, then satisfies
maths-General
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In any equilateral , three circles of radii one are touching to the sides given as in the figure then area of the is
In any equilateral , three circles of radii one are touching to the sides given as in the figure then area of the is
maths-General
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If the sides a, b, c of a triangle are such that a : b : c : : 1 : : 2, then the A : B : C is -
If the sides a, b, c of a triangle are such that a : b : c : : 1 : : 2, then the A : B : C is -
maths-General