How do you determine whether a linear system has one solution, many solutions, or no solution when given 8x + 3y= -9 and -8x + y = 29?

1 Answer
Feb 16, 2017

The lines will intersect at only one point, so there is only one solution.

Explanation:

The first thing to realise is that these are both equations for straight lines.

For two straight lines there are 3 possibilities:

#1#. They do not intersect at all. This would mean they are parallel.
If you find the slope of each line you can determine whether this is so.

#2#. They intersect only once. Any two lines which are not parallel will intersect exactly once.

#3#. Two straight lines can interest many times only if they are the same line. Sometimes the equations might be in different forms,

Write each equation in the form #y = mx +c#

#8x +3y = -9color(white)(............)and -8x+y = 29#

#3y = -8x -9color(white)(......................)y = color(red)(8)x +29#

#y= color(red)(-8/3)x -3#

We can see that they are NOT parallel because their slopes are different #color(red)(-8/3 and 8)#

Therefore these lines will intersect at only one point and there is ONE solution for the system of equations.