If the lines ax+y+1=0, x+by+1=0 and x+y+...

If the lines `ax+y+1=0`, `x+by+1=0` and `x+y+c=0`, (`a`,`b`,`c` being distinct and different from `1`) are concurrent, then `1/(1-a)+1/(1-b)+1/(1-c)=`
(A) `0` (B) `1` (C) `1/(a+b+c)` (D) None of these

A

0

B

1

C

`(1)/(a+b+c)`

D

`3 abc`

Text Solution

Verified by Experts

The correct Answer is:

B

Similar Questions

Explore conceptually related problems

If the lines a x+2y+1=0,b x+3y+1=0a n dc x+4y+1=0 are concurrent, then a ,b ,c are in

If |(a,1,1),(1,b,1),(1,1,c)|=0 then show that 1/(1-a)+1/(1-b)+1/(1-c)=1

If the line a x+b y+c=0 is a normal to the curve x y=1, then a >0,b >0 a >0,b >0 (d) a<0,b<0 none of these

The straight lines x+2y-9=0,3x+5y-5=0 , and a x+b y-1=0 are concurrent, if the straight line 35 x-22 y+1=0 passes through the point (a , b) (b) (b ,a) (-a ,-b) (d) none of these

if 1 / (ab') + 1 / (ba') = 0 , then lines x/ a + y / b =1 and x / (b') + y / (a') = 1 are

If x is the A.M. between a and b, y is the A.M. between b and c, while a, b, c are in G.P., then 1/x + 1/y =

If 1 / (a(b+c)) , 1 / (b(c+a)) , 1 / (c(a+b)) are in H.P., then a, b, c are in

The angle between the plane ax+by+cz+d=0 and the line (x-1)/(a)=(y-2)/(b)=(z-3 )/(c) is

If the lines `ax+y+1=0`, `x+by+1=0` and `x+y+c=0`, (`a`,`b`,`c` being distinct and different from `1`) are concurrent, then `1/(1-a)+1/(1-b)+1/(1-c)=` (A) `0` (B) `1` (C) `1/(a+b+c)` (D) None of these

Text Solution

Similar Questions

Recommended Questions

If the lines `ax+y+1=0`, `x+by+1=0` and `x+y+c=0`, (`a`,`b`,`c` being distinct and different from `1`) are concurrent, then `1/(1-a)+1/(1-b)+1/(1-c)=`
(A) `0` (B) `1` (C) `1/(a+b+c)` (D) None of these