Would lines Y=-1/10x+6 and 10y+x=-100be perpendicular parallel or neither? I just need a brief explanation with the answer

Question

asked May 17, 2023 198k views

1 Answer

Denoteone · Answer 1 · 2023-05-21T11:54:08+0000

Given:

The given equations are,

$\begin{gathered} y=-(1)/(10)x+6\text{ . .. . . . . (1)} \\ 10y+x=100\text{ . . . . . .(2)} \end{gathered}$

The objective is to find whether these two lines are parallel, perpendicular or neither.

Step-by-step explanation:

The general eqauation of straight line is,

$y=mx+b_{}$

Here, m represents the slope of the straight line, b represents the y intercept.

For parallel lines, the slope value of both the lines will be equal.

For perpendicular lines, the slope value both the lines will be opposite and inverse.

To find slope of line 1 and line 2:

By comparing the general equation with the equation (1), the slope value of equation (1) will be,

The equation (2) can be solved as,

$\begin{gathered} 10y+x=100 \\ 10y=-x+100 \\ y=-(1)/(10)x+(100)/(10) \\ y=-(1)/(10)x+10 \end{gathered}$

Now, by comparing the above equation with the general equation, the slope value of line 2 will be,

Thus, the slope value of line 1 and line 2 are equal which is -(1/10).

Hence, these two lines are parallel lines.