Question
Find two solutions for equation: $2x + 5y = 0$
✓
Answer
Taking $x = 0,$ we get $5y = 0$, i.e., $y = 0$. So $(0, 0)$ is a solution of the given equation.
Now, if you take $y = 0,$ you again get $(0, 0)$ as a solution, which is the same as the earlier one.
To get another solution, take $x = 1$, say.
Then you can check that the corresponding value of $y$ is $-\frac{2}{5} \cdot \operatorname{So}\left(1,-\frac{2}{5}\right)$ is another solution of $2x + 5y = 0$
Now, if you take $y = 0,$ you again get $(0, 0)$ as a solution, which is the same as the earlier one.
To get another solution, take $x = 1$, say.
Then you can check that the corresponding value of $y$ is $-\frac{2}{5} \cdot \operatorname{So}\left(1,-\frac{2}{5}\right)$ is another solution of $2x + 5y = 0$
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