Exercises: Distances, parallel and perpendicular lines

First determine the slope of the line $h$ perpendicular to $g(x):y=3x+2$ , where being perpendicular implies

$${\displaystyle m_2=-\frac{1}{m_1}}$$

Plug in the known values.

$${\displaystyle m_2=-\frac{1}{3}}$$

So the line we are looking for has a slope of $${\displaystyle -\frac{1}{3}}$$.

Now determine the $y$-axis intercept of the line $h$ through $P(3|5)$ by substituting the point $P$ into the general line equation.

$h(x_p):y_p=m_2{x}_p+b$

Plug in the values.

$5=-\frac{1}{3}\cdot 3+b|+1$

Simplify and add $1$.

$6=b\iff b=6$

So the line equation is $${\displaystyle h(x):y=-\frac{1}{3}x+6}$$.

First determine the slope of the line $h$ perpendicular to $g(x):y=0.5x+1$ , where being perpendicular implies

$$m_2={\displaystyle -\frac{1}{m_1}}$$

Plug in the known values.

$${\displaystyle m_2=-\frac{1}{0.5}=-\frac{1}{\frac{1}{2}}=-2}$$

So the line we are looking for has a slope of $-2$.

Now determine the $y$-axis intercept of the line $h$ through $P(1|2)$ by substituting the point $P$ into the general line equation.

$h(x_p):y_p=m_2{x}_p+b$

Plug in the values.

$2=-2\cdot 1+b$ $|+2$

Simplify and add 2.

$4=b\Rightarrow b=4$

So the line equation is $h(x):y=-2x+4$.

First determine the slope of the line $h$ perpendicular to $g(x):y=-5x+6$ , where being perpendicular implies

$${\displaystyle m_2=-\frac{1}{m_1}}$$

Plug in the known values.

$${\displaystyle m_2=-\frac{1}{-5}=0.2}$$

So the line we are looking for has a slope of $0.2$.

Now determine the $y$-axis intercept of the line $h$ through $P(-10|1)$ by substituting the point $P$ into the general line equation.

$h(x_p):y_p=m_2{x}_p+b$

Plug in the values.

$1=0.2\cdot (-10)+b$ $|+2$

Simplify and add 2.

$3=b\Rightarrow b=3$

So the line equation is $h(x):y=0.2x+3$.

First determine the slope of the line $h$ perpendicular to $g(x):y=4x+3$ , where being perpendicular implies

$${\displaystyle m_2=-\frac{1}{m_1}}$$

Plug in the known values.

$$m_2=-{\displaystyle \frac{1}{4}=-0.25}$$

So the line we are looking for has a slope of $-0.25$.

Now determine the $y$-axis intercept of the line $h$ through $P(2|-5)$ by substituting the point $P$ into the general line equation.

$h(x_p):y_p=m_2{x}_p+b$

Plug in the values.

$-5=-0.25\cdot 2+b$ $+0.5$

Simplify and add $0.5$.

$-4.5=b\Rightarrow b=-4.5$

So the line equation is $h(x):y=-0.25x-4.5$.

First determine the slope of the line $h$ perpendicular to $g(x):y=-\frac{2}{3}x+3$ , where being perpendicular implies

$${\displaystyle m_2=-\frac{1}{m_1}}$$

Plug in the known values.

$${\displaystyle m_2=-\frac{1}{-\frac{2}{3}}=\frac{3}{2}}$$

So the line we are looking for has a slope of $${\displaystyle \frac{3}{2}}$$.

Now determine the $y$-axis intercept of the line $h$ through $P(4|6)$ by substituting the point $P$ into the general line equation.

$h(x_p):y_p=m_2{x}_p+b$

Plug in the values.

$${\displaystyle 6=\frac{3}{2}\cdot 4+b}$$ $|-6$

Simplify and subtract 6.

$0=b\Rightarrow b=0$

So the line equation is $${\displaystyle h(x):y=\frac{3}{2}x}$$.

First determine the slope of the line $h$ perpendicular to $${\displaystyle g(x):y=\frac{1}{3}x-2}$$ , where being perpendicular implies

$$m_2={\displaystyle -\frac{1}{m_1}}$$

Plug in the known values.

$$m_2={\displaystyle -\frac{1}{\frac{1}{3}}=-3}$$

So the line we are looking for has a slope of $-3$.

Now determine the $y$-axis intercept of the line $h$ through $P(2|5)$ by substituting the point $P$ into the general line equation.

$h(x_p):y_p=m_2{x}_p+b$

Plug in the values.

$5=-3\cdot 2+b$ $|+6$

Simplify and add 6.

$11=b\Rightarrow b=11$

So the line equation is $h(x):y=-3x+11$.

$y=3x-2$ ; $P(1|0)$

For the line to be parallel to $h$, it must have the same slope.

The slope of a line is the variable $m$ of the general line equation.

$m=3$

Setting up the line equation

Plug $m=3$ and $P(1|0)$ into the the general line equation.

Plug $m$ and $t$ into the general line equation.

$\Rightarrow$Line equation:  $y=3x-3$

$y=x-4$ ; $P(1|2)$

For the line to be parallel to $h$, it must have the same slope.

The slope of a line is the variable $m$ of the general line equation.

$m=1$

Setting up the line equation

Plug $m=1$ and $P(1|2)$ into the the general line equation.

Plug $m$ and $t$ into the general line equation.

$\Rightarrow$ Line equation: $y=x+1$

$y=4x$ ; $P(5|18)$

For the line to be parallel to $h$, it must have the same slope.

The slope of a line is the variable $m$ of the general line equation.

$m=4$

Setting up the line equation

Plug $m=4$ and $P(5|18)$ into the the general line equation.

Plug $m$ and $t$ into the general line equation.

$\Rightarrow$ Line equation: $y=4x-2$

$y=-2x+1$ ; $P(-1|4)$

For the line to be parallel to $h$, it must have the same slope.

The slope of a line is the variable $m$ of the general line equation.

$m=-2$

Setting up the line equation

Plug $m=-2$ and $P(-1|4)$ into the the general line equation.

Plug $m$ and $t$ into the general line equation.

$\Rightarrow$ Line equation: $y=-2x+2$

Parallel to the $x$-axis, means that the slope is $m=0$.

Plug $m$ and $P$ into the general line equation.

Assemble to a line equation.

Parallel to the bisector of the 2nd quadrant means the line has the same slope as the bisector.

The slope of the bisector of the 2nd quadrant is -1

Plug $m$ into the straight line equation in order to calculate $t$.

Plug $m$ and $t$ into the general equation of a straight line.

Parallel to the $y$-axis means that there is no function equation, since an $x$-value is assigned an infinite number of $y$-values.

The straight line can therefore only be described as the $x$-value of $R$.

The line being parallel to the bisector of the 1st quadrant means it has the same slope.

The slope of the bisector of the 1st quadrant is $1$.

Substitute $m$ and $S$ into the general line equation and solve for $t$.

Substitute $m$ and $t$ into the general line equation.

Passing through the origin means, the $y$-axis intercept is $t=0$.

Being parallel to the straight line $\overline{\mathrm{AB}}$ means that the line has the same slope as $\overline{\mathrm{AB}}$.

Calculate the slope $m$ using the difference quotient .

Substitute $m$ and $t$ into the general line equation.

The shortest connection of any point on the line $g(x):y=m_1\cdot x+b$ to the origin is a second line $h(x):y=m_2\cdot x+b_2$ which passes through the origin and is perpendicular to $g$.

Passing through the origin means $h(0)=b_2=0$.

Being perpendicular means

$${\displaystyle m_2=-\frac{1}{m_1}}$$

Plug in the known value of $m_1$.

$${\displaystyle m_2=-\frac{1}{\frac{3}{4}}=-\frac{4}{3}}$$

So the perpendicular line has the line equation $${\displaystyle h(x):y=-\frac{4}{3}x}$$.

Now calculate the intersection point $A(x_s|y_s)$ of the two lines by setting equal their line equations.

Now substitute $x_s$ into one of the line equations to determine $y_s$.

$${\displaystyle h(x_s):y_s=-\frac{4}{3}{x}_s}$$

Plug in $x_s=2.4$ .

$${\displaystyle y_s=-\frac{4}{3}\cdot 2.4=-3.2}$$

The intersection of the lines $h$ and $g$ is therefore at $A(2.4|-3.2)$.

Now determine the distance of the origin to the calculated intersection point $A$, this is exactly the shortest distance of the line $g$ to the origin.

$${\displaystyle d=\sqrt{(x_s-x_0{)}^2+(y_s-y_0{)}^2}}$$

Plug in the values.

$${\displaystyle d=\sqrt{(2.4-0{)}^2+(-3.2-0{)}^2}}$$

Simplify.

$${\displaystyle =\sqrt{5.76+10.24}=\sqrt{16}=4}$$

The shortest distance of the line $g$ to the origin is therefore $4$.

The shortest connection of any point on the line $g(x):y=m_1\cdot x+b$ to the origin is a second line $h(x):y=m_2\cdot x+b_2$ which passes through the origin and is perpendicular to $g$.

Passing through the origin means $h(0)=b_2=0$.

Being perpendicular means

$${\displaystyle m_2=-\frac{1}{m_1}}$$

Plug in the known value of $m_1$.

$${\displaystyle m_2=-\frac{1}{-\frac{1}{2}}=2}$$

So the perpendicular line has the line equation $h(x):y=2x$.

Now calculate the intersection point $A(x_s|y_s)$ of the two lines by setting equal their line equations.

Now substitute $x_s$ into one of the line equations to determine $y_s$.

$h(x_s):y_s=2x_s$

Plug in $x_s=0.8$ .

$y_s=2\cdot 0.8=1.6$

The intersection of the lines $h$ and $g$ is therefore at $A(0.8|1.6)$.

Now determine the distance of the origin to the calculated intersection point $A$, this is exactly the shortest distance of the line $g$ to the origin.

$${\displaystyle d=\sqrt{(x_s-x_0{)}^2+(y_s-y_0{)}^2}}$$

Plug in the values.

$d=\sqrt{(0.8-0{)}^2+(1.6-0{)}^2}$

Simplify.

$=\sqrt{0.64+2.56}=\sqrt{3.2}\approx 1.79$

The shortest distance of the line $g$ to the origin is therefore approximately $1.79$.

Choose any point on the line, e.g. the $y$-axis-intercept $(0|1)$, and go two to the right and three upwards, which corresponds to a slope of $m=\frac{3}{2}$. Connect the two points to obtain a straight line.

You obtain the slope of the perpendicular (=normal) line by dividing -1 by the original slope.

Substitute $m$ and $t$ into the general line equation.

Choose any point on the line, e.g. the given point $P(3|2.25)$ and go, according to the gradient $m=-\frac{2}{3}$ , $3$ units to the left and $2$ units upwards. Connect the two points to obtain a straight line. (see sketch in subtask 1)

Calculating the $x$-coordinate

Set the straight line functions equal to obtain the point of intersection.

Calculating the $y$-coordinate



Plug $x$ into one of the line equations, e.g. that of the given line.

$\Rightarrow$ S$(1.5|3.25)$