Let l1 and l2 be the lines vec r1= gamma...

Let `l_1` and `l_2` be the lines `vec r_1= gamma (hati+ hatj +hat k )` and `vecr_2 = (hatj -hat k) +mu(hati+hat k )`, respectively. Let X be the set of all the planes H that contain the line `l_1` .For a plan H ,let d (H) denote the smallest possible distance between the points of `l_2` and H . Let `H_0` be a plane in X for which `d(H_0) ` is the maximum value of d H( ) as H varies over all planes in X .

Match each entry in List-I to the correct entries in List-II.

The correct option is:

`(P)rarr(2) (Q) rarr(4) (R)rarr (5) (S)rarr (1)`

`(P)rarr(5) (Q) rarr(4) (R)rarr (3) (S)rarr (1)`

`(P)rarr(2) (Q) rarr(1) (R)rarr (3) (S)rarr (2)`

`(P)rarr(5) (Q) rarr(1) (R)rarr (4) (S)rarr (2)`

Text Solution

Verified by Experts

Topper's Solved these Questions

JEE ADVANCED 2022
JEE ADVANCED PREVIOUS YEAR|Exercise MATHEMATICS (SECTION -3)|4 Videos
MOCK TEST 2022
JEE ADVANCED PREVIOUS YEAR|Exercise Question|18 Videos

Similar Questions

Explore conceptually related problems

Let L_(1) be the line vecr_(1)=2hati+hatj-hatk+lamda(hati+2hatk) and let L_(2) be the line vecr_(2)=3hati+hatj-hatk+mu(hati+hatj+hatk) . Let pi be the plane which contains the line L_(1) and is parallel to L_(2) . The distance of the plane pi from the origin is

Let L_1 be the line vec r_1=2 hat i+ hat j- hat k+lambda(i+2 hat k) and let L_2 be the line vec r_2=3 hat i+ hat j+mu(i+ hat j- hat k) . Let pi be the plane which contains the line L_1 and is parallel to L_2dot The distance of the plane pi from the origin is a. sqrt(6) b. 1//7 c. sqrt(2//7) d. none of these

If vec a = hati + 2 hatj + 2 hat k and vec b = 3 hati + 6 hatj + 2 hat k then the vector in the direction of vec a and having mgnitude as |vec b| is

Let L_1 be the line r_1=2hat(i)+hat(j)-hat(k)+lambda(hat(i)+2hat(k)) and let L_2 be the another line r_2=3hat(i)+hat(j)+mu(hat(i)+hat(j)-hat(k)) . Let phi be the plane which contains the line L_1 and is parallel to the L_2 . The distance of the plane phi from the origin is

Find whether the lines : vec(r) = (hat(i) - hat(j) - hat(k)) + lambda(2 hat(i) + hat(j)) vecr=(2hati-hatj)+mu(hati+hatj-hatk) intersect or not. If intersecting, Find their point of intersection.

Let L be the set of all straight lines in the Euclidean plane. Two line l_(1) and l_(2) are said to be related by the relation R of l_(1) is parallel to l_(2) , Then R is

Let vec a=hati -2 hatj + 3 hatk, vec b = 3 hati + 3 hatj -hat k and vec c=d hati + hatj + (2d-1) hat k ." If " vec c is parallel to the plane of the vectors veca and vec b, " then " 11 d =

JEE ADVANCED PREVIOUS YEAR-JEE ADVANCED 2023-Question

Let alpha,beta and gamma be real numbers. Consider the following syst...
Text Solution
|
Consider the given data with frequency distribution {(xi,3,8,11,10,5...
Text Solution
|
Let l1 and l2 be the lines vec r1= gamma (hati+ hatj +hat k ) and vecr...
Text Solution
|
Let z be a complex number satisfying |z|^3 +2z^2 +4barz -8 =0 , where ...
Text Solution
|
Let f:[1,oo) to RR be a differentiable function such that f(1)=1/3 and...
Text Solution
|
Consider an experiment of tossing a coin repeatedly until the outcomes...
Text Solution
|
For any y in RR , let cot^-1(y) in (0,pi) and tan^-1(y) in (-pi/2,pi/2...
Text Solution
|
Let the position vectors of the points P ,Q, R and S be veca=hati +2ha...
Text Solution
|
Let M = (a(ij)) , i , j in {1,2,3}, be the 3 xx 3 matrix such that a(i...
Text Solution
|
Let f:(0,1) to RR be the function defined as f(x)=[4x](x-1/4)^2(x-1/2)...
Text Solution
|
Let S be the set of all twice differentiable functions f from RR to RR...
Text Solution
|
For x in RR let tan^-1(x) in (-pi/2 ,pi/2). Then the minimum value of ...
Text Solution
|
For x in RR, let y(x) be a solution of the differential equation (x^2...
Text Solution
|
Let X be the set of all five digit numbers formed using 1,2,2,2,4,4,0....
Text Solution
|
Let A1, A2, A3, . . . ,A8 be the vertices of a regular octagon that li...
Text Solution
|
Let R={((a,3,b),(c,2,d),(0,5,0)):a,b,c,d in {0,3,5,7,11,13,17,19}}. Th...
Text Solution
|
Let C1 be the circle of radius 1 with center at the origin. Let C2 be ...
Text Solution
|
Consider an obtuse angled triangle ABC in which the difference between...
Text Solution
|
Consider an obtuse angled triangle ABC in which the difference between...
Text Solution
|
Consider the 6 xx 6 square in the figure. Let A1,A2, . . .,A(49) be th...
Text Solution
|