Let a ,b,c and d be non-zero numbers. If the point of intersection of the lines 4ax+2ay+c = 0 and 5bx + 2by+ d = 0 lies in the fourth quadrant and is equidistant from the two axes, then

Question

Let a ,b,c and d be non-zero numbers. If the point of intersection of the lines 4ax+2ay+c = 0 and 5bx + 2by+ d = 0 lies in the fourth quadrant and is equidistant from the two axes, then (A) 2bc - 3ad = 0 (B) 2bc + 3ad = 0 (C)  3bc - 2ad= 0 (D) 3bc + 2ad = 0

Tardigrade Admin · Accepted Answer

Let coordinate of the intersection point in fourth quadrant be

(α, - α)

.
Since,

(α, - α)

lies on both lines

4 a x + 2 a y + c = 0

and

5 b x + 2 b y + d = 0

.

∴ 4 a α - 2 a α + c = 0 \Rightarrow α = \frac{- c}{2 a} ....

(i)
and

5 b α - 2 b α + d = 0 \Rightarrow α = \frac{- d}{3 b} ....

(ii)
From Eqs. (i) and (ii), we get

\frac{- c}{2 a} = \frac{- d}{3 b} \Rightarrow 3 b c = 2 a d

\Rightarrow 2 a d - 3 b c = 0

Q. Let $a, b, c$ and $d$ be non-zero numbers. If the point of intersection of the lines $4 a x + 2 a y + c = 0$ and $5 b x + 2 b y + d = 0$ lies in the fourth quadrant and is equidistant from the two axes, then

$2 b c - 3 a d = 0$

$2 b c + 3 a d = 0$

$3 b c - 2 a d = 0$

$3 b c + 2 a d = 0$

Q. Let a,b,c and d be non-zero numbers. If the point of intersection of the lines 4ax+2ay+c=0 and 5bx+2by+d=0 lies in the fourth quadrant and is equidistant from the two axes, then

2bc−3ad=0

2bc+3ad=0

3bc−2ad=0

3bc+2ad=0

Q. Let $a, b, c$ and $d$ be non-zero numbers. If the point of intersection of the lines $4 a x + 2 a y + c = 0$ and $5 b x + 2 b y + d = 0$ lies in the fourth quadrant and is equidistant from the two axes, then

$2 b c - 3 a d = 0$

$2 b c + 3 a d = 0$

$3 b c - 2 a d = 0$

$3 b c + 2 a d = 0$