Question 1:
For this case we have we have the following system of equations:
[tex]y = 3x-4\\x-4y = -28[/tex]
We substitute the first equation in the second one:
[tex]x-4 (3x-4) = - 28\\x-12x + 16 = -28\\-11x = -28-16\\-11x = -44\\x = \frac {-44} {- 11}\\x = 4[/tex]
We look for the value of "y":
[tex]y = 3x-4\\y = 3 (4) -4\\y = 12-4\\\y = 8[/tex]
Finally, the solution of the system is:
[tex](x, y) :( 4,8)[/tex]
ANswer:
[tex](x, y) :( 4,8)[/tex]
Question 2:
For this case we have we have the following system of equations:
[tex]2x-3y = 13x-4y\\-3x-2y = 0[/tex]
We manipulate the first equation:
[tex]-3y + 4y = 13x-2x\\y = 11x[/tex]
We substitute in the second equation:
[tex]-3x-2 (11x) = 0\\-3x-22x = 0\\-25x = 0\\x = 0[/tex]
We look for the value of "y":
[tex]y = 11 (0) = 0[/tex]
Finally, the solution of the system is:
[tex](x, y) :( 0,0)[/tex]
ANswer:
[tex](x, y) :( 0,0)[/tex]
Question 3:
For this case we have we have the following system of equations:
[tex]y = 4x-1\\y = -2x-7[/tex]
Equating the equations:
[tex]4x-1 = -2x-7\\4x + 2x = -7 + 1\\6x = -6\\x = \frac {-6} {6}\\x = -1[/tex]
We look for the value of "y":
[tex]y = 4x-1\\y = 4 (-1) -1\\y = -4-1\\y = -5[/tex]
Finally, the solution of the system is:
[tex](x, y): (- 1, -5)[/tex]
ANswer:
[tex](x, y): (- 1, -5)[/tex]
