Chapter 5.6, Problem 4P

To determine

Todetermine:The equation an architect can enter to represent a second beamwhose graph will pass through the corner at $\left(0,10\right)$ and be parallel to the existing beam. To answer in slope intercept form.

Answer to Problem 4P

The architecture can enter the equation $y=mx+10$ to represent a second beamwhose graph passes through the corner at point $\left(0,10\right)$ .

Explanation of Solution

Given information:

The graph of second beampasses through the corner at $\left(0,10\right)$ and be parallel to the existing beam.

Formulaused:

The equation of line with slope m and that makes intercept of length $c$ on y-axis is given by

  $y=mx+c$ . The slopes of two or more parallel to lines are equal.

Calculations:

Let OA is the existing beam and CB the beam parallel to the existing beam but passing through corner $\left(0,10\right)$ as shown in Figure-1.

Suppose equation of existing beam (line) that makes angle $\theta$ with horizontal is $y=mx$ , where $m=\tan \theta$ is known as slope of bean or line OA.

Then equation of beam (line) CB that is parallel to beam OA is $y=mx+c$ , where $c=\text{OC}$ .

Therefore, equation of second beam that architect can enter is $y=mx+10$ .

In the graphs shown in Figure-1, $m=\tan \theta =\frac{20}{20}=1$.

Hence, for the structure shown in Figure-1, the architecture can enter the equation $y=x+10$ to represent a second beamwhose graph passes through the corner at point $\left(0,10\right)$ .

  

Conclusion:

For the structure shown in Figure-1, the architecture can enter the equation $y=x+10$ to represent a second beamwhose graph passes through the corner at point $\left(0,10\right)$ .