Chapter 3.2, Problem 13CYU

To determine

To find: the solution of the given system of equation using elimination.

Answer to Problem 13CYU

No solution.

Explanation of Solution

Given:

The given system of equation is $\begin{array}{l}5a+15b=-24\\ -2a-6b=28\end{array}$.

Concept used:

Guidelines for solving system of equation using elimination:

1. First one of expression of the first equation is equivalent to the same expression of the second equation by multiplying.
2. Subtract or add both the equation.

Calculation:

As the given system of equation is $\begin{array}{l}5a+15b=-24\\ -2a-6b=28\end{array}$.

Since none of the expressions is same on both the equation, therefore multiply by 2 in 1st equation and multiply by 5 in 2nd equation then equate:

  $\begin{array}{l}2\left(5a+15b\right)=-24\times 2\\ 10a+30b=-48\\ 5\left(-2a-6b\right)=28\times 5\\ -10a-30b=140\end{array}$

Now, add the equation:

  $\begin{array}{l}\underset{\_}{\begin{array}{l}10a+30b=-48\\ -10a-30b=140\\ +++\end{array}}\\ 0a+0b=90\end{array}$

In this case when the coefficient of both expression is zero, then there is no solution.

Hence, the value of given system of equation is not solution.