under what circumstances does the system of equation Ax + y = B and y = Lx + m have no solution
Answers
Step-by-step explanation:
a1/a2=b1/b2is not equal to c1/c2
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Answer:
If the constant terms are not the same, then the system of equations has no solution.
Step-by-step explanation:
From the above question,
The gadget of equations Ax + y = B and y = Lx + m has no answer when the two equations are now not consistent, which means that the equations can't be solved simultaneously for the equal values of x and y.
This takes place when the coefficient of x in the two equations is now not the same, or when the consistent phrases in the two equations are now not the same.
Determine the coefficients of x in each equation:
The coefficient of x in the first equation is A, and the coefficient of x in the second equation is L.
Determine the constant terms in each equation:
The constant term in the first equation is B, and the constant term in the second equation is m.
Check to see if the coefficients of x are the same in both equations:
If the coefficients of x are not the same, then the system of equations has no solution.
Check to see if the constant terms are the same in both equations:
If the constant terms are not the same, then the system of equations has no solution.
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