The pair of linear equations x=2 and x=5 has-
(1) No common solution (ii) Many solution
(iii) Unique solution (iv) None of these
Do all the parts-
0-2
Answers
Step-by-step explanation:
answer is option 1 no common solution
because in graph show both line are parral to each other
The pair of linear equations x = 2 and x = 5 has no solution in common. Hence, option (1) is correct.
• The equation x = 2 is a straight line passing perpendicularly through the x-axis, with the x-coordinate fixed as 2, while the y-coordinate varies from - ∞ to + ∞ .
• The equation x = 5 is also a straight perpendicular line passing through the x-axis, but it has its x-coordinate fixed as 5 and a y-coordinate varying from - ∞ to + ∞ .
• Both the lines are represented in the image attached below. Looking at the image below, we see that the lines are parallel to each other and do not intersect each other at any point.
• Therefore, the lines x = 2 and x = 5 have no common solution as their x-coordinates are fixed and different, making the lines parallel to each other.
