Class 12th

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New answer posted

10 months ago

0 Follower 2 Views

P
Payal Gupta

Contributor-Level 10

Information missing. The question was droppedby NTA.

 y=||x1|2|

Area bounded region = 12*4*2=4

New answer posted

10 months ago

0 Follower 3 Views

P
Payal Gupta

Contributor-Level 10

R = { (P, Q) |P and Q are at the same distance from the origin}.

at  (1, 1), x2+y2= (1)2+ (1)2=1+1=2

New answer posted

10 months ago

0 Follower 4 Views

P
Payal Gupta

Contributor-Level 10

P 1 : 3 x + 1 5 + 2 1 z = 9           

P2 : x – 3y – z = 5

P3 : 2x + 10y + 14z = 5

Ratio of the direction cosines of P1 and P2

3 2 = 1 5 1 0 = 2 1 1 4

Hence, P1 and P3 are parallel.

New answer posted

10 months ago

0 Follower 11 Views

P
Payal Gupta

Contributor-Level 10

 a*(a*b)=(a.b)a|a|2b=0|a|2b(asa.b=0given)

a*(a*(a*b))=|a|2a*b

a*(a*(a*(a*b)))=|a|2a*(a*b)=|a|2(|a|2b)=|a|4b

New answer posted

10 months ago

0 Follower 4 Views

P
Payal Gupta

Contributor-Level 10

Let n be the number of times.

p=12, q=12

According to question,

nC7=nC9n7=9n=16

p (x=2)=16C2 (12)2. (12)14=15213

New answer posted

10 months ago

0 Follower 4 Views

P
Payal Gupta

Contributor-Level 10

 dvdtVdvdt=λV10001200dvv=λ02dtλ=12ln65

10002000dvv=12ln (65)0TdtT=2ln2ln (65)k=2ln2

New answer posted

10 months ago

0 Follower 5 Views

P
Payal Gupta

Contributor-Level 10

A= [pqrs] is symmetric. So, q = r.

AA=A2= [pqrs] [pqrs]= [p2+qrpq+qsrp+rsrq+s2]

Sum of diagonal elements =

p2+qr+rq+s2=1p2+2r2+s2=1, (asq=r), p=0, r=0ands=±1orr=0, s=0andp=±1

Total number of matrices = 4.

New answer posted

10 months ago

0 Follower 6 Views

P
Payal Gupta

Contributor-Level 10

All the points A (1, 5, 35), B (7, 5,5),  C (1, λ, 7), D (2λ, 1, 2) are coplanar. Hence

AB*AC.AD=|60300λ5282λ1433|=0

5λ244λ+95=0

sumofroots=445

New question posted

10 months ago

0 Follower 2 Views

New answer posted

10 months ago

0 Follower 5 Views

P
Payal Gupta

Contributor-Level 10

|f (x)f (y)|| (xy)2|

|f (x)f (y)xy|xy

Taking the limit y x on both sides

Ltyx|f (x)f (y)xy|Ltyx (xy)

|f' (x)|0

Hence, modulus cannot be zero. Hence f' (x) = 0. Integrating, we get f (x) = c

at x = 0, f (0) = c = 1

f (x)=1>0, xR

Hence, option (A) is correct option.

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