An elephant standing at the junction of two straight roads represented by the equations x−y+2=0 and y−1=0wants to reach another road
whose equation is x−y−3=0 If the elephant can move in any direction and wants to cover the shortest distance to its destination road, then the
equation of the path that the elephant should follow is:
1:x+y=0x+y=0
2:−x+y=0−x+y=0
3:x−y+1=0x−y+1=0
4:2x−y=0
Answers
Answer:
An elephant standing at the junction of two straight roads represented by the equations x−y+2=0 and y−1=0wants to reach another road
whose equation is x−y−3=0 If the elephant can move in any direction and wants to cover the shortest distance to its destination road, then the
equation of the path that the elephant should follow is:
1:x+y=0x+y=0
2:−x+y=0−x+y=0
3:x−y+1=0x−y+1=0
4:2x−y=0
Step-by-step explanation:
An elephant standing at the junction of two straight roads represented by the equations x−y+2=0 and y−1=0wants to reach another road
whose equation is x−y−3=0 If the elephant can move in any direction and wants to cover the shortest distance to its destination road, then the
equation of the path that the elephant should follow is:
1:x+y=0x+y=0
2:−x+y=0−x+y=0
3:x−y+1=0x−y+1=0
4:2x−y=0
Answer:
x+y=0
Step-by-step explanation: