Which of these is not true for the pair of Linear equation ? $x-2=0$ $y-11=0$
  • It has no solution
  • They are perpendicular to each other
  • Line x-2=0 is parallel to y-axis
  • Line y-11 is parallel to x-axis
Which of these are not true?
  • When two equation have one solution,Graphically they are represented by intersecting lines
  • When two equation have infinite solution ,Graphically they are represented by coincident lines
  • When two equation have no solution ,Graphically they are represented by two distinct parallel line
  • None of these
Solution of Linear equation $60-4x+y=0$ and $x-y+3=0$ is ?
  • ( 19,16)
  • (21,24)
  • (24,21)
  • (16,19)
For what value of k,do the equations $6x-2y+16=0$ and $12x-ky=-32$ represents coincident lines?
  • 4
  • -4
  • 1/4
  • -1/4
Two statement are made Statement A: The lines y=0 and y=12 do not have any solution Statement B: The lines x=0 and y=0 has one solution Which of the below is the correct option?
  • A is correct only
  • B is correct only
  • A and B both are correct
  • A and B both are incorrect
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