1 Answer

Marcelo De Zen · Answer 1 · 2020-02-23T18:28:55+0000

Answer:

A.

C.

Explanation:

Given:

The given line is
6x+18y=5

Express this in slope-intercept form
, where m is the slope and b is the y-intercept.

$6x+18y=5\\18y=-6x+5\\y=-(6)/(18)x+(5)/(18)\\y=-(1)/(3)x+(5)/(18)$

Therefore, the slope of the line is
.

Now, for perpendicular lines, the product of their slopes is equal to -1.

Let us find the slopes of each lines.

Option A:

y=3x-10

On comparing with the slope-intercept form, we get slope as
.

Now,
m* m_(A)=-(1)/(3)* 3=-1 . So, option A is perpendicular to the given line.

Option B:

For lines of the form
, where, a is a constant, the slope is undefined. So, option B is incorrect.

Option C:

On comparing with the slope-point form, we get slope as
.

Now,
m* m_(C)=-(1)/(3)* 3=-1 . So, option C is perpendicular to the given line.

Option D:

$3x+9y=8\\9y=-3x+8\\y=-(3)/(9)x+(8)/(9)\\y=-(1)/(3)x+(8)/(9)$

On comparing with the slope-intercept form, we get slope as
.

Now,
m* m_(D)=-(1)/(3)* -(1)/(3)=(1)/(9) . So, option D is not perpendicular to the given line.

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