for case 1 the eq have just one answer.
ex: x y=2;
2x 3y=6;
for case 2 the eq donot have any answer
x=2y;
once they utterly overlap (on this case there are infinite factors which might be widespread).
Generally.
Take the case of two linear equations.
If the equations are of the identical line, there are an infinite variety of intersections.
If the equations are of parallel traces, there are not any intersections.
If the equations have totally different slopes, there shall be precisely one intersection.
Reply 6
for case 1 the eq have just one answer.
ex: x y=2;
2x 3y=6;
for case 2 the eq donot have any answer
x=2y;
for case 1 the eq have just one answer.
ex: x y=2;
2x 3y=6;
for case 2 the eq donot have any answer
x=2y;
there are three circumstances:
for case 1 the eq have just one answer.
ex: x y=2;
2x 3y=6;
for case 2 the eq donot have any answer
x=2y;
x=2y 3;
for case 3 there are infinite solutions.
x=y 3;
2x-2y=12/2;
for case 1 the eq have just one answer.
ex: x y=2;
2x 3y=6;
for case 2 the eq donot have any answer
x=2y;
for case 1 the eq have just one answer.
ex: x y=2;
2x 3y=6;
for case 2 the eq donot have any answer
x=2y;
once they intersect at just one level.
there are three circumstances:
This post is last updated on hrtanswers.com at Date : 1st of September – 2022