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Linear and Quadratic Equation

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puzzleking123 | 20:12 Tue 22nd Mar 2011 | Science
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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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Please?

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?
Of course, once you find the solutions for x you substitute these into one of your equations to find the corresponding y values; this then gives you the coordinates of the points where the line and curve meet
Be careful because if the quadratic above has complex roots then this means that the line does not intersect the original quadratic.
Throw them in the air and note where they intersect
Lol, vascop- puzzleking123 is a complex character for sure but I'd be very surprised if he is working with complex numbers here
Now that's were I started to get lost at maths in school, Imaginary and complex numbers!
I was just thinking that if PK just chose a quadratic and line at random then he could easily find that they do not intersect.
vascop,
if a quadratic has complex roots, it merely means it does not meet or cross the x-axis.
It does not necessarily mean it will not cross the line given by the linear equation.
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.
Maybe PK123 will come on to thank us and clarify the issue around complex roots.
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
sorry, vascop.
my brain was temporarily disengaged there.
We'll probably never know. There seems to be a technical issue on AB which prevents puzzleking123 from accessing his threads after I have posted on them.
We should probably make a pact to ignore his/her posts unless he/she agrees to at least acknowledge answers
Maybe. I've gone through phases of not answering PK123 but I sometimes can't resist in case others want to know the answer.
PK123 sometimes does acknowledge answers - but not mine for some reason.
Well it's the last time I help this poster
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thanks for your help i've failed this module at school and will be doing resits at summer camp so I will be able to give you an answer then

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