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, thenA. `2bc-3ad=0`B. `2bc+3ad=0`C. `2ad-3bc=0`D. `3bc+2ad=0`

Let a,b, c and d be non-zero numbers. If the point of intersection of

1.	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, thenA. `2bc-3ad=0`B. `2bc+3ad=0`C. `2ad-3bc=0`D. `3bc+2ad=0`
Answer» Let coordinate of the intersection point in fourth quadrant be `(alpha,-alpha)`. Since, `(alpha,-alpha)` lies on both lines `4ax+2ay+c=0` and `5bx+2by+d=0` `:. 4aa-2aa+c=0impliesalpha=(-c)/(2a)`……….`(i)` and `5balpha-2balpha+d=0impliesalpha=(-d)/(3b)`.........`(ii)` From Eqs. `(i)` and `(ii)`, we get `(-c)/(2a)=(-d)/(3b)implies3bc=2ad` `implies2ad-3bc=0`

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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, thenA. `2bc-3ad=0`B. `2bc+3ad=0`C. `2ad-3bc=0`D. `3bc+2ad=0`
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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, thenA. `2bc-3ad=0`B. `2bc+3ad=0`C. `2ad-3bc=0`D. `3bc+2ad=0`

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