SOLUTION: The graphs of the two lines 4x= 3y + 23 and 4y + 3x= -19 are? A. do not intersect B. intersect at (-2,5) C. are Identical D. are perpendicular

Algebra ->  Linear-equations -> SOLUTION: The graphs of the two lines 4x= 3y + 23 and 4y + 3x= -19 are? A. do not intersect B. intersect at (-2,5) C. are Identical D. are perpendicular      Log On


   

Question 398405: The graphs of the two lines 4x= 3y + 23 and 4y + 3x= -19 are?
A. do not intersect
B. intersect at (-2,5)
C. are Identical
D. are perpendicular
Answer by Alan3354(69443) About Me  (Show Source):
You can put this solution on YOUR website!
The graphs of the two lines 4x= 3y + 23 and 4y + 3x= -19 are?
A. do not intersect
B. intersect at (-2,5)
C. are Identical
D. are perpendicular
----------------------
B is out since (-2,5) is not on the 1st line.
C is out
----------
4x= 3y + 23 has a slope of 4/3
4y + 3x= -19 has a slope of -4/3
so D is out
--------------
They're not parallel, they intersect somewhere, so A is out.
--------
None of those.