Solving a System of Equations
Внимание!! Математические вычисления могут быть не точны!
Your advice is to solve the given equations by setting them equal to each other and solving for x. This will give you the x-coordinate(s) of the point(s) where the two equations intersect.
In this case, the equations are y=x²+1 and y=0. Setting them equal to each other, we get x²+1=0. Solving for x, we find that x=±i (sqrt(-1)). This means that there are no real solutions for x and the two equations do not intersect. Therefore, there is no point of intersection and this system of equations has no solution.
If the equations were y=x²+1 and x=-1, we would have to plug x=-1 into the first equation to find the y-coordinate of the point of intersection. In this case, y=(-1)²+1=2. So the point of intersection is (-1,2).
If the equations were y=x²+1 and x=2, we would plug x=2 into the first equation to find the y-coordinate of the point of intersection. In this case, y=(2)²+1=5. So the point of intersection is (2,5).
Внимание! Используйте решение от нейросети аккуратно, т.к они могут быть не точными. Обязательно проверьте ответы самостоятельно! Особенно это касается математических вычислений
