$\begin{array}{l}x^{2}+y^{2}=5 \\ y=-2 x\end{array}$
Answer
Both solutions are correct, so the final answer is \(\boxed{(1,-2)}\) and \(\boxed{(-1,2)}\)
Step 1 :The system of equations is: \(x^{2}+y^{2}=5\) and \(y=-2x\)
Step 2 :Substitute equation \(y=-2x\) into equation \(x^{2}+y^{2}=5\): \(x^{2}+(-2x)^{2}=5\)
Step 3 :Simplify: \(x^{2}+4x^{2}=5\)
Step 4 :Combine like terms: \(5x^{2}=5\)
Step 5 :Divide both sides by 5: \(x^{2}=1\)
Step 6 :Take the square root of both sides: \(x=\pm1\)
Step 7 :Substitute \(x=1\) into equation \(y=-2x\): \(y=-2(1)\), so \(y=-2\)
Step 8 :Substitute \(x=-1\) into equation \(y=-2x\): \(y=-2(-1)\), so \(y=2\)
Step 9 :So, the solutions to the system of equations are \((1,-2)\) and \((-1,2)\)
Step 10 :Check these solutions: For \((1,-2)\): \((1)^{2}+(-2)^{2}=5\), which simplifies to \(1+4=5\), so \(5=5\)
Step 11 :For \((-1,2)\): \((-1)^{2}+(2)^{2}=5\), which simplifies to \(1+4=5\), so \(5=5\)
Step 12 :Both solutions are correct, so the final answer is \(\boxed{(1,-2)}\) and \(\boxed{(-1,2)}\)
