Asked by Joey
How many solutions does this equation have 5y = 10 + 6y
Answers
Answered by
hatsune miku
The key is to calculate Δ, required for the first part of Kramer's rule.
Δ=determinant of the left-hand side.
If Δ≠0, then there is a unique solution, including the trivial solution of x=0 and y=0 if the right-hand side is all zeroes.
If Δ=0, then the left-hand side of the equations are linearly dependent.
Two cases may arise:
1. If the equations are consistent, one single equation will result after reduction of the left-hand side.
This case has infinitely many solutions, one set for each value we assign to x (or y).
2. If the equations are not consistent, then after reduction, the equations will be identical on the left-hand side, but the right-hand sides will different.
This gives a total of 3 different cases.
Δ=determinant of the left-hand side.
If Δ≠0, then there is a unique solution, including the trivial solution of x=0 and y=0 if the right-hand side is all zeroes.
If Δ=0, then the left-hand side of the equations are linearly dependent.
Two cases may arise:
1. If the equations are consistent, one single equation will result after reduction of the left-hand side.
This case has infinitely many solutions, one set for each value we assign to x (or y).
2. If the equations are not consistent, then after reduction, the equations will be identical on the left-hand side, but the right-hand sides will different.
This gives a total of 3 different cases.
Answered by
oobleck
assuming we're not working with a system of equations, and thus do not need Cramer's Rule,
5y = 10 + 6y
has a single solution: y = -10
5y = 10 + 6y
has a single solution: y = -10
There are no AI answers yet. The ability to request AI answers is coming soon!
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.