Write the condition for the pair of linear equations a1 x +b1 y +c1 = 0 and a2 x + b2 y + c2 = 0 to have infinitely many solutions.
Answers
Answer:
subscribe to technoblade
Step-by-step explanation:
subscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technobladesubscribe to technoblade