If one end of a focal chord AB of the parabola is at then the equation of the tangent to it at B is :
Option: 1
Option: 2
Option: 3
Option: 4
D
View Full Answer(2)The length of the minor axis (along y-axis) of an ellipse in the standard form is If this ellipse touches the line, then its eccentricity is :
Option: 1
Option: 2
Option: 3
Option: 4
What is Ellipse? -
Ellipse
Standard Equation of Ellipse:
The standard form of the equation of an ellipse with center (0, 0) and major axis on the x-axis is
a > b
the length of the major axis is 2a
the coordinates of the vertices are (±a, 0)
the length of the minor axis is 2b
the coordinates of the co-vertices are (0, ±b)
Equation of Tangent of Ellipse in Parametric Form and Slope Form -
Slope Form:
-
Correct Option (2)
View Full Answer(1)If are the eccentricities of the ellipse, and the hyperbola, respectively and is a point on the ellipse, then is equal to :
Option: 1
Option: 2
Option: 3
Option: 4
What is Ellipse? -
Ellipse
a > b
the length of the major axis is 2a
the coordinates of the vertices are (±a, 0)
the length of the minor axis is 2b
the coordinates of the co-vertices are (0, ±b)
-
What is Hyperbola? -
Hyperbola:
Eccentricity of Hyperbola:
-
So, k= 16
View Full Answer(1)Let C the centroid of the triangle with vertices Let P be the point of intersection of the lines and Then the line passing through the points C and P also passes through the point:
Option: 1
Option: 2
Option: 3
Option: 4
Centroid -
Centroid
Centroid of a triangle is the point of intersection of the medians of the triangle. A centroid divides the median in the ratio 2:1.
Whereas, the median is the line joining the mid-points of the sides and the opposite vertices.
The coordinates of the centroid of a triangle (G) whose vertices are A (x1, y1), B (x2, y2) and C(x3, y3), is given by
If D (a1, b1), E (a2, b2) and F (a3, b3) are the mid point of ΔABC, then its centroid is given by
-
Point of intersection of two lines -
Point of intersection of two lines
Equation of two non-parallel line is
If P (x1, y1) is a point of intersection of L1 and L2 , then solving these two equations of the line by cross multiplication
We get,
-
Equation of Straight Line (Part 2) -
Equation of Straight Line
(c) Two-point form
The equation of a straight line passing through the two given points (x1,y1) and (x1,y1)is given by
.
-
The centroid of triangle ABC D(2,2)
Point of intersection P
equation of line DP is 8x – 11y + 6 = 0
Point (–9,–6) satisfies the equation
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If the image of the point P(1, −2, 3) in the plane, 2x+3y−4z+22=0 measured parallel to the line, is Q, then PQ is equal to :
Option: 1
Option: 5
Option: 9
Option: 13
Intersection of line and plane -
Let the line
plane
intersect at P
to find P assume general point on line as
now put it in plane to find ,
-
Distance formula -
The distance between two points is =
- wherein
= -
PQ=2PM
Now, for finding M
Putting in equation of plane,
So,
View Full Answer(1)
The line of intersection of the planes and , is:
Option: 1
Option: 2
Option: 3
Option: 4
As we have learned
Equation of line as intersection of two planes -
Let the two intersecting planes be
and
then the parallel vector of line formed their intersection can be obtained by
and points can be obtained by putting and solving
and
say
Now the equation will be
-
putting z = 0
3x-y = 1 and x + 4y = 2
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The tangent at the point (2, −2) to the curve, x2y2−2x=4(1−y) does not pass through the point :
Option: 1 (8,5)
Option: 2 (4,1/3)
Option: 3 (-2,-7)
Option: 4 (-4,-9)
As learnt in concept ABCD
Differentiate both sides wrt.x.
at (2,-2)
Equation of tangent is
It doesn't pass through (-2,-7)
Concept ABCD
Slope of curve at a given point
To find slope, we differentiate with respect to x and find
Eg in
View Full Answer(1)Let the normal at a point P on the curve intersect the y-axis at If m is the slope of the tangent at P to the curve, then is equal to
Option: 1 4
Option: 2 3
Option: 3 2
Option: 4 1
Equation of Straight Line (Part 1) -
Equation of Straight Line
(b) Point-Slope form
Let the equation of give line l with slope ‘m’ is
y = mx + c …..(i)
(x1,y1) lies on the line i
y1= mx1+c ……(ii)
From (i) and (ii) [(ii) - (i)]
y - y1 = m( x - x1)
The equation of a straight line whose slope is given as ‘m’ and passes through the point (x1,y1) is .
-
Equation of the normal
Normal intersect at (0,3/2)
View Full Answer(1)Let the line and the ellipse intersect at a point P in the first quadrant. If the normal to this ellipse at P meets the co-ordinate axes at and , then is equal to :
Option: 1
Option: 2
Option: 3
Option: 4
Equation of Normal in Point Form and Parametric Form -
Equation of Normal in Point Form and Parametric Form
Point form:
-
Correct option (4)
View Full Answer(1)The shortest distance between the lines and is :
Option: 1
Option: 2
Option: 3
Option: 4
Shortest Distance between Two Lines -
Distance between two skew lines
If L1 and L2 are two skew lines, then there is one and only one line perpendicular to each of lines L1 and L2 which is known as the line of shortest distance.
Vector form
If is the shortest distance vector between L1 and L2, then it being perpendicular to both and , therefore, the unit vector along would be
where "d" is the magnitude of the shortest distance vector. Let θ be the angle between and .
Then
Hence, the required shortest distance is
-
=
Correct Option (4)
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If are the eccentricities of the ellipse, <img alt="\frac{x^{2}}{18}+\frac{y^{2}}{4}=1" src
Let C the centroid of the triangle with vertices Let P be the point of intersection of t
Let the line and the ellipse intersect at a point P in the firs
The shortest distance between the lines and <img alt="\frac{x+3}{-3}=\