321kumarsushant wrote:
Hey all,
my answer is different from all.
i ll go with E.
here is my explanation:
ax+by+c=0;
or, y= -(c+ax)/b; or, y= -(c^2+acx) / bc ; (on multiplying C )
statement 1 : BA <0 ;not applicable
statement 2 : AC >0 ; applicable;
in the eq, c^2 is +ve
ac is +ve
bc not known;
on comparing with standard (y=mx+c)
m = -ac/bc ; since bc is unknown, you cant predict the slope of line ,
hence you cant say, whether it will cut Y-Axis or not.
next;
ax+by+c=0;
or, y= -(c+ax)/b; or, y= -(bc+bax) / b^2 ; (on multiplying B )
statement 1 : BA <0 ; applicable
statement 2 : AC >0 ; not applicable;
in the eq, b^2 is +ve
ab is -ve
bc not known;
on comparing with standard (y=mx+c)
m = -ba/b^2 ; since b^2 is +ve, the slope of line is +ve .
constant (i.e c in standard eq) = bc; not known
since, bc is not known, whether it will be on +ve or -ve Y-axis.
so, you cant say that whether this line will cut the X-axis or not.
please make me correct if m wrong.
hence you cant say, whether it will cut Y-Axis or not.
Official answer is B, not E.
Does line Ax + By + C = 0 (A is not 0) intersect the x-axis on the negative side?\(ax+by+c=0\) is equation of a line. Note that the line won't have interception with x-axis when \(a=0\) (and \(c\neq{0}\)): in this case the line will be \(y=-\frac{c}{b}\) and will be parallel to x -axis.
Now, in other cases (when \(a\neq{0}\)) x-intercept of a line will be the value of \(x\) when \(y=0\), so the value of \(x=-\frac{c}{a}\). Question basically asks whether this value is negative, so question asks is \(-\frac{c}{a}<0\)? --> is \(\frac{c}{a}>0\)? --> do \(c\) and \(a\) have the same sign?
(1) BA < 0. Not sufficient as we can not answer whether \(c\) and \(a\) have the same sign.
(2) AC > 0 --> \(c\) and \(a\) have the same sign. Sufficient.
Answer: B.
Check more on this topic here:
math-coordinate-geometry-87652.htmlHope it helps.
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