Points A and B lie on the parabola y = 2...

Points `A` and `B` lie on the parabola `y = 2x^2 + 4x - 2,` such that origin is the mid-point of the line segment `AB.` If `I` be the length of the line segment `AB,` then find the unit digit of `l^2.`

Text Solution

Verified by Experts

The correct Answer is:

8

Doubtnut Promotions Banner Desktop Dark

Doubtnut Promotions Banner Mobile Dark

|

Topper's Solved these Questions

PARABOLA
VIKAS GUPTA (BLACK BOOK)|Exercise Exercise-3 : Comprehension Type Problems|3 Videos
MATRICES
VIKAS GUPTA (BLACK BOOK)|Exercise Exercise-4 : Subjective Type Problems|5 Videos
PERMUTATION AND COMBINATIONS
VIKAS GUPTA (BLACK BOOK)|Exercise Exercise-5 : Subjective Type Problems|13 Videos

Similar Questions

Explore conceptually related problems

Points A and B lie on the parabola y=2x^(2)+4x-2, such that origin is the mid-point of the linesegment AB .If I be the length of the line segment AB, then find the unit digit of l^(2) .

In figure l||m and M is the mid-point of the line segment AB. Prove that M is also the mid-point of line segment CD.

Knowledge Check

The mid-point of the line-segment AB is P(0,4). If the coordinates of B are (-2, 3) then the co-ordinates of A are

A

(2,5)

B

3

C

`(13)/(2)`

D

`-(13)/(2)`

The mid-point of the line segment joining the points (- 2, 4) and (6, 10) is

A

(2, 5)

B

(2, 7)

C

(3, 7)

D

(3, 8)

In the figure P(3, 2) is the mid-point of the line segment AB. What are the co-ordinates of A and B respectively:

A

(4,0) and (6, 0)

B

(0,4) and (6,0)

C

(0,4) and (0,6)

D

(0,-4) and (-6, 0)

Similar Questions

Explore conceptually related problems

Will the lenghts of line segment AB and line segment BC make the length of line segment AC in Fig. 2.33 ?

Find mid point of a line segment of length 6.8 cm.

If P is point on the parabola y ^(2) =8x and A is the point (1,0), then the locus of the mid point of the line segment AP is

Find the mid-point of the line segment joining the points (2,-6) and (6,-4) .

The points A(3, 6) and B lie on the parabola y^(2)=4ax , such that the chord AB subtends 90^(@) at the origin, then the length of the chord AB is equal to

VIKAS GUPTA (BLACK BOOK)-PARABOLA-Exercise-5 : Subjective Type Problems

Points A and B lie on the parabola y = 2x^2 + 4x - 2, such that origin...
06:32
|
For the parabola y=-x^(2), let a lt 0 and b gt 0,P(a, -a^(2)) and Q(b,...
Text Solution
|
The chord AC of the parabola y^(2)=4ax subtends an angle of 90^(@) at ...
Text Solution
|