Chapter 3.4, Problem 7CYU

(a)

To determine

a system of equations for the number of episodes of each type of show

Answer to Problem 7CYU

  $\begin{array}{l}s+d+t=7\\ d=2s\\ 0.3s+0.6d+0.6t=3.6\end{array}$

Explanation of Solution

Given information:

Sit com uses 0.3 gigabyte of memory, a drama uses 0.6 gigabyte, and a 0.6 gigabyte. And also downloaded 7 programs with a total memory of 3.6 gigabyte

Calculation:

The system of equations for the given problem is

  $\begin{array}{l}s+d+t=7\\ d=2s\\ 0.3s+0.6d+0.6t=3.6\end{array}$

Conclusion:

  $\begin{array}{l}s+d+t=7\\ d=2s\\ 0.3s+0.6d+0.6t=3.6\end{array}$

(b)

To determine

How many episodes of each show she watched

Answer to Problem 7CYU

7 episodes

Explanation of Solution

Given information:

Sit com uses 0.3 gigabyte of memory, a drama uses 0.6 gigabyte, and a 0.6 gigabyte. And also downloaded 7 programs with a total memory of 3.6 gigabyte

Calculation:

Multiply the primary equation by -6 and the other equation with 10 so the two equations would have to be 6d and -6d

  $\begin{array}{l}s+d+t=7\\ -6\left(s+d+t\right)=-6\left(7\right)\\ -6s-6d-6t=-42\end{array}$

Here the first equation is multiplied by -6 and simplified

  $\begin{array}{l}0.3s+0.6d+0.6t=36\\ 10\left(0.3s+0.6d+0.6t\right)=10\left(3.6\right)\\ 3s+6d+6t=36\end{array}$

The second equation is multiplied by 10 and simplified

Now both the equations are added in order to find any of the variables

And then the following equation is obtained

  $-3s=-6$

Both the sides are divided by -3 and thus

  $s=2$

Substituting the value of s in the equation value of d is obtained

  $\begin{array}{l}d=2s\\ d=2\left(2\right)\\ d=4\end{array}$

Now substitute the 2 known values to the original equation to find the last unknowing variable

  $\begin{array}{l}0.3s+0.6d+0.6t=3.6\\ 0.3\left(2\right)+0.6\left(4\right)+0.6t=3.6\\ 0.6+2.4+0.6t=3.6\\ 0.6t+3=3.6\\ 0.6t+3-3=3.6-3\\ 0.6t=0.6\\ t=1\end{array}$

Now all the values are substituted in the following equation

  $\begin{array}{l}s+d+t=7\\ 2+4+1=7\\ 7=7\end{array}$

Conclusion:

7 episodes