Assertion (A): The system of given equations 2x + 3y = 6 and 4x – y = 3 is inconsistent.
Reason (R): If graph of equations a1x + b1y = c1 and a2x + b2y = c2 are parallel lines, then it has no
solution
Answers
Answer:
here's your answer dear
first one
Given system of linear equatiogns
ns4x+6y−9=0⇒a1=4,b1=6,c1=−9
ns4x+6y−9=0⇒a1=4,b1=6,c1=−92x+3y−6=0⇒a2=2,b2=3,c2=−6.
ns4x+6y−9=0⇒a1=4,b1=6,c1=−92x+3y−6=0⇒a2=2,b2=3,c2=−6.As we know a pair of linear equations is inconsistent (no solution) if
ns4x+6y−9=0⇒a1=4,b1=6,c1=−92x+3y−6=0⇒a2=2,b2=3,c2=−6.As we know a pair of linear equations is inconsistent (no solution) if a2a1=b2b1=c2c1
ns4x+6y−9=0⇒a1=4,b1=6,c1=−92x+3y−6=0⇒a2=2,b2=3,c2=−6.As we know a pair of linear equations is inconsistent (no solution) if a2a1=b2b1=c2c1We have 24=36=−6−9
ns4x+6y−9=0⇒a1=4,b1=6,c1=−92x+3y−6=0⇒a2=2,b2=3,c2=−6.As we know a pair of linear equations is inconsistent (no solution) if a2a1=b2b1=c2c1We have 24=36=−6−9Hence, no solution.
second one is I picture
hope it helps you from my side
- Assertion is false but Reason is true.