Society & Culture1 min ago
Linear and Quadratic Equation
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I have a linear equation and a quadratic equation, how (analytically) do I find the points at which they cross?
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Suppose the equations are:
y= ax² +bx +c and
y= mx +d
The solution occurs when ax² +bx +c = mx +d
Rewrite this as a quadratic:
ax² + (b-m)x +c-d = 0
Then solve the quadratic to find the solution x
Let me know your equations if you need further help.
Will you be acknowledging any of my answers and outstanding requests for clarification regarding earlier threads?
Suppose the equations are:
y= ax² +bx +c and
y= mx +d
The solution occurs when ax² +bx +c = mx +d
Rewrite this as a quadratic:
ax² + (b-m)x +c-d = 0
Then solve the quadratic to find the solution x
Let me know your equations if you need further help.
Will you be acknowledging any of my answers and outstanding requests for clarification regarding earlier threads?
Please read what I said carefully!! I was not referring to the original quadratic, but the second quadratic ax^2+(b-m)x +c-d=0 in factor's original post. If the line and the ORIGINAL quadratic do not intersect when drawn on graph paper then the second quadratic WILL have complex roots. Try it and see.
Example 1
Quadratic is parabola y=x^2 (a=1 ,b=0, c=0)
Line is y=1 (line parallel to x axis)
This line cuts the parabola at the 2 points x=-1, y=1 and x=1, y=1
Using Factor's method m=0, d=1
So solve x^2-1=0 so x=1 and -1 as to be expected.
Example 2
Quadratic is parabola y=x^2 (a=1 ,b=0, c=0)
Line is y=-1 (line parallel to x axis)
This does not cut the parabola
Using Factor's method m=0, d=-1
So solve x^2+1=0 so x=i and -i (complex values) as expected when line does not intersect parabola
Quadratic is parabola y=x^2 (a=1 ,b=0, c=0)
Line is y=1 (line parallel to x axis)
This line cuts the parabola at the 2 points x=-1, y=1 and x=1, y=1
Using Factor's method m=0, d=1
So solve x^2-1=0 so x=1 and -1 as to be expected.
Example 2
Quadratic is parabola y=x^2 (a=1 ,b=0, c=0)
Line is y=-1 (line parallel to x axis)
This does not cut the parabola
Using Factor's method m=0, d=-1
So solve x^2+1=0 so x=i and -i (complex values) as expected when line does not intersect parabola
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