Chapter 2.6, Problem 51PS

Solution

To find: the dimensions of each ram.

The dimensions of the right ramp are

Length: $12$ feet

Height: $\frac{5}{3}$ feet

Width: $5$ feet

The dimensions of the left ramp are

Length: $24$ feet

Height: $\frac{5}{3}$ feet

Width: $5$ feet.

Given information: 

Right ramp is half as long as left ramp. If the two ramps are constructed using $150$ cubic feet of concrete.

  

Calculation:

The total length of the ramp, $\left(21x+6\right)$ units, has a gap of $3x$ units. Subtracting these

expressions results to

  $21x+6-3x=18x+6$

Thus, the total length of the ramp that is cemented is $\left(18x+6\right)$ units.

It is given that the left ramp is twice as long as the right ramp. Dividing the total length of the ramp that is cemented by $3$ results to

  $\frac{18x+6}{3}=6x+2$

Thus, the length of the right ramp is $\left(6x+2\right)$ units. Since the left ramp is twice as long, then the length of the left ramp is $\left(12x+4\right)$ units.

The volume of the left ramp is half the volume of a rectangular box (i.e., the ramp is triangular) with a length of $\left(12x+4\right)$ units, a width of $3x$ units, and a height of $x$ units. That is,

  $\begin{array}{c}{V}_{\text{left }}=\frac{lwh}{2}\\ =\frac{(12x+4)(3x)(x)}{2}\\ =\frac{(12x+4)\left(3x^2\right)}{2}\\ =\frac{36x^3+12x^2}{2}\\ =18x^3+6x^2\end{array}$

Thus, the volume of the left ramp is $\left(18x^3+6x^2\right)$ cubic feet.

The volume of the right ramp is half that of a box that is rectangular and measures $(6x+2)$ units, a width of $3x$ units, and a height of $x$ units. That is,

  $\begin{array}{c}{V}_{\text{right }}=\frac{lwh}{2}\\ =\frac{(6x+2)(3x)(x)}{2}\\ =\frac{(6x+2)\left(3x^2\right)}{2}\\ =\frac{18x^3+6x^2}{2}\\ =9x^3+3x^2\end{array}$

Thus, the volume of the right ramp is $\left(9x^3+3x^2\right)$ cubic feet.

Given that $150$ cubic feet of concrete were used, then

  $\begin{array}{c}{V}_{\text{left }}+V_{\text{right }}=150\\ \left(18x^3+6x^2\right)+\left(9x^3+3x^2\right)=150\\ 18x^3+6x^2+9x^3+3x^2=150\\ \left(18x^3+9x^3\right)+\left(6x^2+3x^2\right)=150\\ 27x^3+9x^2=150\\ \frac{27x^3+9x^2}{3}=\frac{150}{3}\\ 9x^3+3x^2=50\end{array}$

To solve the equation $9x^3+3x^2=50$ separate the left side and the right side of the equation and create the system

  $\left\{\begin{array}{l}y=9x^3+3x^2\hfill \\ y=50\hfill \end{array}.\right.$

The graph in red was created using graphing software and shows $y=9x^3+3x^2$ and the blue graph is the graph of $y=50$ .

  

The solution to the equation $9x^3+3x^2=50$ is the $x-$ value the location of the two graphs' intersection. Since the graphs intersect at $\left(\frac{5}{3},50\right)$ , then the solution to the given

equation is $x=\frac{5}{3}$ .

With $x=\frac{5}{3}$ , then the dimensions of the left ramp are

length: $12x+4\Rightarrow 24$ feet

height: $x\Rightarrow \frac{5}{3}$ feet

width: $3x\Rightarrow 5$ feet.

With $x=\frac{5}{3}$ , then the dimensions of the right ramp are

length: $6x+2\Rightarrow 12$ feet

height: $x\Rightarrow \frac{5}{3}$ feet

width: $3x\Rightarrow 5$ feet.